\input texinfo @c -*-texinfo-*- @c %**start of header @setfilename gmp.info @include version.texi @settitle GNU MP @value{VERSION} @synindex tp fn @iftex @afourpaper @end iftex @comment %**end of header @ifinfo @format START-INFO-DIR-ENTRY * gmp: (gmp.info). GNU Multiple Precision Arithmetic Library. END-INFO-DIR-ENTRY @end format @end ifinfo @c smallbook @iftex @finalout @end iftex @c Note: the edition number is listed in *three* places; please update @c all three. Also, update the month and year where appropriate. @c ==> Update edition number for settitle and subtitle, and in the @c ==> following paragraph; update date, too. @ifinfo This file documents GNU MP, a library for arbitrary-precision arithmetic. Copyright (C) 1991, 1993, 1994, 1995, 1996, 1997, 1998, 1999, 2000 Free Software Foundation, Inc. Permission is granted to make and distribute verbatim copies of this manual provided the copyright notice and this permission notice are preserved on all copies. @ignore Permission is granted to process this file through TeX and print the results, provided the printed document carries copying permission notice identical to this one except for the removal of this paragraph (this paragraph not being relevant to the printed manual). @end ignore Permission is granted to copy and distribute modified versions of this manual under the conditions for verbatim copying, provided that the entire resulting derived work is distributed under the terms of a permission notice identical to this one. Permission is granted to copy and distribute translations of this manual into another language, under the above conditions for modified versions, except that this permission notice may be stated in a translation approved by the Foundation. @end ifinfo @setchapternewpage on @titlepage @c use the new format for titles @title GNU MP @subtitle The GNU Multiple Precision Arithmetic Library @subtitle Edition @value{EDITION} @subtitle @value{UPDATED} @author by Torbj@"orn Granlund, Swox AB @email{tege@@swox.com} @c Include the Distribution inside the titlepage so @c that headings are turned off. @tex \global\parindent=0pt \global\parskip=8pt \global\baselineskip=13pt @end tex @page @vskip 0pt plus 1filll Copyright @copyright{} 1991, 1993, 1994, 1995, 1996, 1997, 1998, 1999, 2000 Free Software Foundation, Inc. @sp 2 Published by the Free Software Foundation @* 59 Temple Place - Suite 330 @* Boston, MA 02111-1307, USA @* Permission is granted to make and distribute verbatim copies of this manual provided the copyright notice and this permission notice are preserved on all copies. Permission is granted to copy and distribute modified versions of this manual under the conditions for verbatim copying, provided that the entire resulting derived work is distributed under the terms of a permission notice identical to this one. Permission is granted to copy and distribute translations of this manual into another language, under the above conditions for modified versions, except that this permission notice may be stated in a translation approved by the Foundation. @end titlepage @headings double @ifnottex @node Top, Copying, (dir), (dir) @top GNU MP This manual documents how to install and use the GNU multiple precision arithmetic library, version @value{VERSION}. @end ifnottex @menu * Copying:: GMP Copying Conditions (LGPL). * Introduction to GMP:: Brief introduction to GNU MP. * Installing GMP:: How to configure and compile the GMP library. * GMP Basics:: What every GMP user should now. * Reporting Bugs:: How to usefully report bugs. * Integer Functions:: Functions for arithmetic on signed integers. * Rational Number Functions:: Functions for arithmetic on rational numbers. * Floating-point Functions:: Functions for arithmetic on floats. * Low-level Functions:: Fast functions for natural numbers. * Random Number Functions:: Functions for generating random numbers. * BSD Compatible Functions:: All functions found in BSD MP. * Custom Allocation:: How to customize the internal allocation. * Contributors:: Who brings your this library? * References:: Some useful papers and books to read. * Concept Index:: * Function Index:: @end menu @node Copying, Introduction to GMP, Top, Top @comment node-name, next, previous, up @unnumbered GNU MP Copying Conditions @cindex Copying conditions @cindex Conditions for copying GNU MP This library is @dfn{free}; this means that everyone is free to use it and free to redistribute it on a free basis. The library is not in the public domain; it is copyrighted and there are restrictions on its distribution, but these restrictions are designed to permit everything that a good cooperating citizen would want to do. What is not allowed is to try to prevent others from further sharing any version of this library that they might get from you.@refill Specifically, we want to make sure that you have the right to give away copies of the library, that you receive source code or else can get it if you want it, that you can change this library or use pieces of it in new free programs, and that you know you can do these things.@refill To make sure that everyone has such rights, we have to forbid you to deprive anyone else of these rights. For example, if you distribute copies of the GNU MP library, you must give the recipients all the rights that you have. You must make sure that they, too, receive or can get the source code. And you must tell them their rights.@refill Also, for our own protection, we must make certain that everyone finds out that there is no warranty for the GNU MP library. If it is modified by someone else and passed on, we want their recipients to know that what they have is not what we distributed, so that any problems introduced by others will not reflect on our reputation.@refill The precise conditions of the license for the GNU MP library are found in the Library General Public License that accompany the source code.@refill @node Introduction to GMP, Installing GMP, Copying, Top @comment node-name, next, previous, up @chapter Introduction to GNU MP GNU MP is a portable library written in C for arbitrary precision arithmetic on integers, rational numbers, and floating-point numbers. It aims to provide the fastest possible arithmetic for all applications that need higher precision than is directly supported by the basic C types. Many applications use just a few hundred bits of precision; but some applications may need thousands or even millions of bits. GMP is designed to give good performance for both, by choosing algorithms based on the sizes of the operands, and by carefully keeping the overhead at a minimum. The speed of GMP is achieved by using fullwords as the basic arithmetic type, by using sophisticated algorithms, by including carefully optimized assembly code for the most common inner loops for many different CPUs, and by a general emphasis on speed (as opposed to simplicity or elegance). There is carefully optimized assembly code for these CPUs: ARM, DEC Alpha 21064, 21164, and 21264, AMD 29000, K6 and Athlon, Hitachi SH and SH2, HPPA 1.0, 1.1 and 2.0, Intel Pentium, Pentium Pro/Pentium II, generic x86, Intel i960, Motorola MC68000, MC68020, MC88100, and MC88110, Motorola/IBM PowerPC 32 and 64, National NS32000, IBM POWER, MIPS R3000, R4000, SPARCv7, SuperSPARC, generic SPARCv8, UltraSPARC, DEC VAX, and Zilog Z8000. Some optimizations also for Clipper, IBM ROMP (RT), and Pyramid AP/XP. There is a mailing list for GMP users. To join it, send a mail to @email{gmp-request@@swox.com} with the word @samp{subscribe} in the message @strong{body} (not in the subject line). For up-to-date information on GMP, please see the GMP Home Pages at @uref{http://www.swox.com/gmp/}. @section How to use this Manual Everyone should read @ref{GMP Basics}. If you need to install the library yourself, you need to read @ref{Installing GMP}, too. The rest of the manual can be used for later reference, although it is probably a good idea to glance through it. @node Installing GMP, GMP Basics, Introduction to GMP, Top @comment node-name, next, previous, up @chapter Installing GMP @cindex Installation GMP has an autoconf/automake/libtool based configuration system. On a Unix-like system a basic build can be done with @example ./configure make @end example Some self-tests can be run with @example make check @end example And you can install (under @file{/usr/local} by default) with @example make install @end example If you experience problems, please report them to @email{bug-gmp@@gnu.org}. (@xref{Reporting Bugs}, for information on what to include in useful bug reports.) @section Build Options All the usual autoconf configure options are available, run @samp{./configure --help} for a summary. @table @asis @item Non-Unix Systems @samp{configure} needs various Unix-like tools installed. On an MS-DOS system cygwin or djgpp should work. It might be possible to build without the help of @samp{configure}, certainly all the code is there, but you'll be on your own. @item Object Directory To compile in a separate object directory, @command{cd} to that directory, and prefix the configure command with the path to the GMP source directory. Not all @samp{make} programs have the necessary features (@code{VPATH}) to support this. In particular, SunOS and Slowaris @command{make} have bugs that make them unable to build from a separate object directory. Use GNU @command{make} instead. @item @option{--disable-shared}, @option{--disable-static} By default both shared and static libraries are built (where possible), but one or other can be disabled. Shared libraries are very slightly slower, having a small cost on each function call, but result in smaller executables and permit code sharing between separate running processes. @item @option{--target=CPU-VENDOR-OS} The build target can be specified in the usual way, for either native or cross compilation. If @option{--target} isn't given, @samp{./configure} builds for the host system. On some systems @samp{./configure} can't distinguish between different CPUs in a family, and you should check its guess (run @samp{./config.guess} to see it). In general, if you want a library that runs as fast as possible, you should configure GMP for the exact CPU type your system uses. However, this may mean the binaries won't run on older members of the family, and might run slower on other members, older or newer. The best idea is always to build GMP for the exact machine type you intend to run it on. If you need to create binaries that will run on several processors in a family, GMP should be configured for the lowest common denominator among them, something with which all the desired processors are upwardly compatible. The following CPUs have specific assembly code support. See @file{configure.in} for which @file{mpn} subdirectories get used by each. @itemize @bullet @c Leave this formatting, it's easy to read and it can be grepped to @c automatically test that targets listed get through ./config.sub @item Alpha: @samp{alpha}, @samp{alphaev5}, @samp{alphaev6} @item Cray: @samp{cray2}, @samp{xmp}, @samp{ymp} @item Fujitsu: @samp{f301} @item Hitachi: @samp{sh}, @samp{sh2} @item HPPA: @samp{hppa1.0}, @samp{hppa1.1}, @samp{hppa2.0} @item MIPS: @samp{mips}, @samp{mips3}, @item Motorola: @samp{m68000}, @samp{m68k}, @samp{m88k}, @samp{m88110} @item POWER: @samp{power}, @samp{rs6000}, @samp{powerpc}, @samp{powerpc64} @item Sparc: @samp{sparc}, @samp{sparcv8}, @samp{microsparc}, @samp{supersparc}, @samp{sparcv9}, @samp{ultrasparc}, @samp{sparc64} @item 80x86 family: @samp{i386}, @samp{i486}, @samp{i586}, @samp{pentium}, @samp{pentiummmx}, @samp{pentiumpro}, @samp{pentium2}, @samp{pentium3}, @samp{k6}, @samp{k62}, @samp{k63}, @samp{athlon} @item Other: @samp{a29k}, @samp{arm}, @samp{clipper}, @samp{i960}, @samp{ns32k}, @samp{pyramid}, @samp{vax}, @samp{z8k} @end itemize CPUs not listed use generic C code. If some of the assembly code causes problems, the generic C code can be selected with CPU @samp{none}. @item @option{CC}, @option{CFLAGS} The C compiler used is chosen from among some likely candidates, with GCC normally preferred if it's present. The usual @samp{CC=whatever} can be passed to @samp{./configure} to choose something different. For some configurations specific compiler flags are set based on the target CPU and compiler, for others @samp{CFLAGS="-whatever"} can be used to choose the best flags. @item @option{--disable-alloca} By default, GMP allocates temporary workspace using @code{alloca} if that function is available, or @code{malloc} if not. If you're working with large numbers and @code{alloca} overflows the available stack space, you can build with @option{--disable-alloca} to use @code{malloc} instead. @code{malloc} will probably be slightly slower than @code{alloca}. When not using @code{alloca}, it's actually the allocation function selected with @code{mp_set_memory_functions} that's used, this being @code{malloc} by default. @xref{Custom Allocation}. Depending on your system, the only indication of stack overflow might be a segmentation violation. @command{limit}, @command{ulimit} or @code{setrlimit} might be able to increase the stack space available to programs. @item @option{--enable-mpbsd} The Berkeley MP compatibility library (@file{libmp.a}) and header file (@file{mp.h}) are built and installed only if @option{--enable-mpbsd} is used. @xref{BSD Compatible Functions}. @item Demonstration Programs The @file{demos} subdirectory has some sample programs using GMP. These aren't built or installed, but there's a @file{Makefile} with rules for them. For instance, @samp{make pexpr} and then @samp{./pexpr 68^975+10}. @item Documentation The document you're now reading is @file{gmp.texi}. The usual automake targets are available to make @file{gmp.ps} and/or @file{gmp.dvi}. @end table @need 2000 @section Notes for Particular Systems @table @asis @item AIX Targets @samp{*-*-aix*} have shared libraries disabled since they seem to fail on AIX 4.3. @item AIX with PowerPC 64 Currently only a 64-bit version of the GMP library is built, and when linking your application you need to pass @option{-maix64} to @command{gcc} or @option{-q64} to @command{xlc}. We hope this will change in a future version of GMP. @item HPPA The GMP assembly code for HPPA is not currently position-independent, so shared libraries are disabled for targets @samp{hppa*-*-*}. @item Sparc Using @samp{sparcv8} or @samp{supersparc} for the target CPU will give a significant performance increase on relevant systems. @item x86 Pentium and PentiumPro The Intel Pentium P5 code is good for its intended P5, but quite slow when run on Intel P6 class chips (PPro, P-II, P-III)@. @samp{i386} is a better choice if you're making binaries that must run on both. @item x86 MMX and old GAS Old versions of GAS don't support MMX instructions, in particular version 1.92.3 that comes with FreeBSD 2.2.8 doesn't (and unfortunately there's no newer assembler for that system). If the target CPU has MMX code but the assembler doesn't support it, a warning is given and non-MMX code is used instead. This will be an inferior build, since the MMX code that's present is there because it's faster than the corresponding plain integer code. @end table @section Known Build Problems You might find more up-to-date information at @uref{http://www.swox.com/gmp/}. @table @asis @item NeXT prior to 3.3 The system compiler on old versions of NeXT was a massacred and old GCC, even if the compiler called itself @file{cc}. This compiler cannot be used to build GMP, you need to get a real GCC, and install that before you compile GMP. (NeXT may have fixed this in release 3.3 of their system.) @item POWER and PowerPC Bugs in GCC 2.7.2 (and 2.6.3) mean it can't be used to compile GMP on POWER or PowerPC. If you want to use GCC for these machines, get GCC 2.7.2.1 (or later). @item Sequent Symmetry Use the GNU assembler instead of the system assembler, since the latter has serious bugs. @item SunOS 4 The system C compiler has a bug that makes it miscompile @file{mpq/get_d.c} and @file{mpf/get_d.c}, and causes two corresponding tests to fail. (You can @command{cd} to the @file{mpz} directory to run @samp{make check} there to test the rest of the build.) Use GCC instead if you plan to use the function @code{mpq_get_d}. @command{/usr/bin/m4} lacks features needed to process @file{.asm} files. Either the SysV @command{/usr/5bin/m4} or GNU @command{m4} should be used instead. On the @samp{./configure} command line use @samp{M4=/usr/5bin/m4}, or the equivalent for wherever GNU @command{m4} is installed. The setting for @code{GSYM_PREFIX} in @file{config.m4} may be incorrectly determined when using the native @command{grep}, leading at link-time to undefined symbols like @code{___gmpn_add_n}. To fix this, after running @samp{./configure}, change the relevant line in @file{config.m4} to @samp{define(, <_>)}. The @command{ranlib} command will need to be run manually when building a static library with the native @command{ar}. After @samp{make}, run @samp{ranlib .libs/libgmp.a}, and when using @option{--enable-mpbsd} run @samp{ranlib .libs/libmp.a} too. @item VAX running Ultrix You need to build and install the GNU assembler before you compile GMP. The VAX assembly in GMP uses an instruction (@code{jsobgtr}) that cannot be assembled by the Ultrix assembler. @end table @node GMP Basics, Reporting Bugs, Installing GMP, Top @comment node-name, next, previous, up @chapter GMP Basics @cindex @file{gmp.h} All declarations needed to use GMP are collected in the include file @file{gmp.h}. It is designed to work with both C and C++ compilers. @strong{Using functions, macros, data types, etc.@: not documented in this manual is strongly discouraged. If you do so your application is guaranteed to be incompatible with future versions of GMP.} @menu * Nomenclature and Types:: Which data types are there? * Function Classes:: How the functions are organized. * GMP Variable Conventions:: Some rules and hints about variables. * GMP and reentrancy:: What about reentrancy? * Useful Macros and Constants:: Convenient helpers. * Compatibility with older versions:: Compatibility issues. * Getting the Latest Version of GMP:: How to get the software. @end menu @node Nomenclature and Types, Function Classes, GMP Basics, GMP Basics @section Nomenclature and Types @cindex Integer @tindex @code{mpz_t} @noindent In this manual, @dfn{integer} usually means a multiple precision integer, as defined by the GMP library. The C data type for such integers is @code{mpz_t}. Here are some examples of how to declare such integers: @example mpz_t sum; struct foo @{ mpz_t x, y; @}; mpz_t vec[20]; @end example @cindex Rational number @tindex @code{mpq_t} @noindent @dfn{Rational number} means a multiple precision fraction. The C data type for these fractions is @code{mpq_t}. For example: @example mpq_t quotient; @end example @cindex Floating-point number @tindex @code{mpf_t} @noindent @dfn{Floating point number} or @dfn{Float} for short, is an arbitrary precision mantissa with a limited precision exponent. The C data type for such objects is @code{mpf_t}. @cindex Limb @tindex @code{mp_limb_t} @noindent A @dfn{limb} means the part of a multi-precision number that fits in a single word. (We chose this word because a limb of the human body is analogous to a digit, only larger, and containing several digits.) Normally a limb contains 32 or 64 bits. The C data type for a limb is @code{mp_limb_t}. @node Function Classes, GMP Variable Conventions, Nomenclature and Types, GMP Basics @section Function Classes There are six classes of functions in the GMP library: @enumerate @item Functions for signed integer arithmetic, with names beginning with @code{mpz_}. The associated type is @code{mpz_t}. There are about 100 functions in this class. @item Functions for rational number arithmetic, with names beginning with @code{mpq_}. The associated type is @code{mpq_t}. There are about 20 functions in this class, but the functions in the previous class can be used for performing arithmetic on the numerator and denominator separately. @item Functions for floating-point arithmetic, with names beginning with @code{mpf_}. The associated type is @code{mpf_t}. There are about 50 functions is this class. @item Functions compatible with Berkeley GMP, such as @code{itom}, @code{madd}, and @code{mult}. The associated type is @code{MINT}. @item Fast low-level functions that operate on natural numbers. These are used by the functions in the preceding groups, and you can also call them directly from very time-critical user programs. These functions' names begin with @code{mpn_}. There are about 30 (hard-to-use) functions in this class. The associated type is array of @code{mp_limb_t}. @item Miscellaneous functions. Functions for setting up custom allocation and functions for generating random numbers. @end enumerate @node GMP Variable Conventions, GMP and reentrancy, Function Classes, GMP Basics @section GMP Variable Conventions As a general rule, all GMP functions expect output arguments before input arguments. This notation is based on an analogy with the assignment operator. (The BSD MP compatibility functions disobey this rule, having the output argument(s) last.) GMP allows you to use the same variable for both input and output in the same expression. For example, the main function for integer multiplication, @code{mpz_mul}, can be used like this: @code{mpz_mul (x, x, x)}. This computes the square of @var{x} and puts the result back in @var{x}. Before you can assign to an GMP variable, you need to initialize it by calling one of the special initialization functions. When you're done with a variable, you need to clear it out, using one of the functions for that purpose. Which function to use depends on the type of variable. See the chapters on integer functions, rational number functions, and floating-point functions for details. A variable should only be initialized once, or at least cleared out between each initialization. After a variable has been initialized, it may be assigned to any number of times. For efficiency reasons, avoid initializing and clearing out an GMP variable in a loop. Instead, initialize it before entering the loop, and clear it out after the loop has exited Once you have initialized an GMP variable, you don't need to worry about space allocation for that variable. All functions in GMP automatically allocate additional space when a variable does not already have enough space. They do not, however, reduce the space when a smaller number is stored in the object. Most of the time, this policy is best, since it avoids frequent re-allocation. @node GMP and reentrancy, Useful Macros and Constants, GMP Variable Conventions, GMP Basics @section GMP and reentrancy The GMP code is reentrant and thread-safe, with some exceptions: @itemize @bullet @item The function @code{mpf_set_default_prec} saves the selected precision in a global variable. @item The function @code{mp_set_memory_functions} uses several global variables for storing the selected memory allocation functions. @item The memory allocation functions, @code{malloc} and friends, that GMP uses unless directed to use custom allocation, may not be reentrant. @item The old random number functions (@code{mpz_random}, etc) use an underlying random number generator from the C library, typically @code{mrand48} or @code{random}. These routines are not reentrant, since they rely on global state. (The newer random number functions that accept a @code{gmp_randstate_t} parameter are however reentrant.) @end itemize If the memory allocation functions (@code{malloc} and friends, or whatever functions set by a call to @code{mp_set_memory_functions}), are not reentrant, GMP will not be reentrant either. @node Useful Macros and Constants, Compatibility with older versions, GMP and reentrancy, GMP Basics @section Useful Macros and Constants @deftypevr {Global Constant} {const int} mp_bits_per_limb The number of bits per limb. @end deftypevr @defmac __GNU_MP_VERSION @defmacx __GNU_MP_VERSION_MINOR @defmacx __GNU_MP_VERSION_PATCHLEVEL The major and minor GMP version, and patch level, respectively, as integers. For GMP i.j, these numbers will be i, j, and 0, respectively. For GMP i.j.k, these numbers will be i, j, and k, respectively. @end defmac @node Compatibility with older versions, Getting the Latest Version of GMP, Useful Macros and Constants, GMP Basics @section Compatibility with older versions @menu * Compatibility with Version 1.x:: * Compatibility with Version 2.0.x:: @end menu @node Compatibility with Version 1.x, Compatibility with Version 2.0.x, Compatibility with older versions, Compatibility with older versions @subsection Compatibility with Version 1.x This version of GMP is upward compatible with previous versions of GMP, with a few exceptions. @enumerate @item Integer division functions round the result differently. The obsolete functions (@code{mpz_div}, @code{mpz_divmod}, @code{mpz_mdiv}, @code{mpz_mdivmod}, etc) now all use floor rounding (i.e., they round the quotient towards @ifinfo @minus{}infinity). @end ifinfo @iftex @tex $-\infty$ @end tex @end iftex There are a lot of functions for integer division, giving the user better control over the rounding. @item The function @code{mpz_mod} now compute the true @strong{mod} function. @item The functions @code{mpz_powm} and @code{mpz_powm_ui} now use @strong{mod} for reduction. @item The assignment functions for rational numbers do no longer canonicalize their results. In the case a non-canonical result could arise from an assignment, the user need to insert an explicit call to @code{mpq_canonicalize}. This change was made for efficiency. @item Output generated by @code{mpz_out_raw} in this release cannot be read by @code{mpz_inp_raw} in previous releases. This change was made for making the file format truly portable between machines with different word sizes. @item Several @code{mpn} functions have changed. But they were intentionally undocumented in previous releases. @item The functions @code{mpz_cmp_ui}, @code{mpz_cmp_si}, and @code{mpq_cmp_ui} are now implemented as macros, and thereby sometimes evaluate their arguments multiple times. @item The functions @code{mpz_pow_ui} and @code{mpz_ui_pow_ui} now yield 1 for 0^0. (In version 1, they yielded 0.) @end enumerate @node Compatibility with Version 2.0.x, , Compatibility with Version 1.x, Compatibility with older versions @subsection Compatibility with Version 2.0.x This version of GMP is upward compatible with version 2.0, 2.0.1, and 2.0.2 at the source level, with the exception of @code{mpn_gcd} which has had its source arguments swapped. @node Getting the Latest Version of GMP, , Compatibility with older versions, GMP Basics @section Getting the Latest Version of GMP The latest version of the GMP library is available by at @samp{ftp://ftp.gnu.org/pub/gnu/gmp}. Many sites around the world mirror @samp{ftp.gnu.org}; please use a mirror site near you. @node Reporting Bugs, Integer Functions, GMP Basics, Top @comment node-name, next, previous, up @chapter Reporting Bugs @cindex Reporting bugs If you think you have found a bug in the GMP library, please investigate it and report it. We have made this library available to you, and it is not too much to ask you to report the bugs that you find. Before you report a bug, you may want to check @uref{http://www.swox.com/gmp/} for patches for this release. There are a few things you should think about when you put your bug report together. You have to send us a test case that makes it possible for us to reproduce the bug. Include instructions on how to run the test case. You also have to explain what is wrong; if you get a crash, or if the results printed are incorrect and in that case, in what way. It is not uncommon that an observed problem is actually due to a bug in the compiler used when building GMP; the GMP code tends to explore interesting corners in compilers. Therefore, please include compiler version information in your bug report. This can be extracted using @samp{what `which cc`}, or, if you're using gcc, @samp{gcc -v}. Also, include the output from @samp{uname -a}. If the bug is related to @samp{configure}, please include the file @file{config.log} in the bug report. If your bug report is good, we will do our best to help you to get a corrected version of the library; if the bug report is poor, we won't do anything about it (apart from chiding you to send better bug reports). Send your bug report to: @email{bug-gmp@@gnu.org}. If you think something in this manual is unclear, or downright incorrect, or if the language needs to be improved, please send a note to the same address. @node Integer Functions, Rational Number Functions, Reporting Bugs, Top @comment node-name, next, previous, up @chapter Integer Functions @cindex Integer functions This chapter describes the GMP functions for performing integer arithmetic. These functions start with the prefix @code{mpz_}. GMP integers are stored in objects of type @code{mpz_t}. @menu * Initializing Integers:: * Assigning Integers:: * Simultaneous Integer Init & Assign:: * Converting Integers:: * Integer Arithmetic:: * Comparison Functions:: * Integer Logic and Bit Fiddling:: * I/O of Integers:: * Miscellaneous Integer Functions:: @end menu @node Initializing Integers, Assigning Integers, , Integer Functions @comment node-name, next, previous, up @section Initialization and Assignment Functions The functions for integer arithmetic assume that all integer objects are initialized. You do that by calling the function @code{mpz_init}. @deftypefun void mpz_init (mpz_t @var{integer}) Initialize @var{integer} with limb space and set the initial numeric value to 0. Each variable should normally only be initialized once, or at least cleared out (using @code{mpz_clear}) between each initialization. @end deftypefun Here is an example of using @code{mpz_init}: @example @{ mpz_t integ; mpz_init (integ); @dots{} mpz_add (integ, @dots{}); @dots{} mpz_sub (integ, @dots{}); /* Unless the program is about to exit, do ... */ mpz_clear (integ); @} @end example @noindent As you can see, you can store new values any number of times, once an object is initialized. @deftypefun void mpz_clear (mpz_t @var{integer}) Free the limb space occupied by @var{integer}. Make sure to call this function for all @code{mpz_t} variables when you are done with them. @end deftypefun @deftypefun {void *} _mpz_realloc (mpz_t @var{integer}, mp_size_t @var{new_alloc}) Change the limb space allocation to @var{new_alloc} limbs. This function is not normally called from user code, but it can be used to give memory back to the heap, or to increase the space of a variable to avoid repeated automatic re-allocation. @end deftypefun @deftypefun void mpz_array_init (mpz_t @var{integer_array}[], size_t @var{array_size}, mp_size_t @var{fixed_num_bits}) Allocate @strong{fixed} limb space for all @var{array_size} integers in @var{integer_array}. The fixed allocation for each integer in the array is enough to store @var{fixed_num_bits}. If the fixed space will be insufficient for storing the result of a subsequent calculation, the result is unpredictable. This function is useful for decreasing the working set for some algorithms that use large integer arrays. There is no way to de-allocate the storage allocated by this function. Don't call @code{mpz_clear}! @end deftypefun @node Assigning Integers, Simultaneous Integer Init & Assign, Initializing Integers, Integer Functions @comment node-name, next, previous, up @subsection Assignment Functions @cindex Integer assignment functions These functions assign new values to already initialized integers (@pxref{Initializing Integers}). @deftypefun void mpz_set (mpz_t @var{rop}, mpz_t @var{op}) @deftypefunx void mpz_set_ui (mpz_t @var{rop}, unsigned long int @var{op}) @deftypefunx void mpz_set_si (mpz_t @var{rop}, signed long int @var{op}) @deftypefunx void mpz_set_d (mpz_t @var{rop}, double @var{op}) @deftypefunx void mpz_set_q (mpz_t @var{rop}, mpq_t @var{op}) @deftypefunx void mpz_set_f (mpz_t @var{rop}, mpf_t @var{op}) Set the value of @var{rop} from @var{op}. @end deftypefun @deftypefun int mpz_set_str (mpz_t @var{rop}, char *@var{str}, int @var{base}) Set the value of @var{rop} from @var{str}, a '\0'-terminated C string in base @var{base}. White space is allowed in the string, and is simply ignored. The base may vary from 2 to 36. If @var{base} is 0, the actual base is determined from the leading characters: if the first two characters are `0x' or `0X', hexadecimal is assumed, otherwise if the first character is `0', octal is assumed, otherwise decimal is assumed. This function returns 0 if the entire string up to the '\0' is a valid number in base @var{base}. Otherwise it returns @minus{}1. @end deftypefun @deftypefun void mpz_swap (mpz_t @var{rop1}, mpz_t @var{rop2}) Swap the values @var{rop1} and @var{rop2} efficiently. @end deftypefun @node Simultaneous Integer Init & Assign, Converting Integers, Assigning Integers, Integer Functions @comment node-name, next, previous, up @subsection Combined Initialization and Assignment Functions @cindex Initialization and assignment functions For convenience, GMP provides a parallel series of initialize-and-set functions which initialize the output and then store the value there. These functions' names have the form @code{mpz_init_set@dots{}} Here is an example of using one: @example @{ mpz_t pie; mpz_init_set_str (pie, "3141592653589793238462643383279502884", 10); @dots{} mpz_sub (pie, @dots{}); @dots{} mpz_clear (pie); @} @end example @noindent Once the integer has been initialized by any of the @code{mpz_init_set@dots{}} functions, it can be used as the source or destination operand for the ordinary integer functions. Don't use an initialize-and-set function on a variable already initialized! @deftypefun void mpz_init_set (mpz_t @var{rop}, mpz_t @var{op}) @deftypefunx void mpz_init_set_ui (mpz_t @var{rop}, unsigned long int @var{op}) @deftypefunx void mpz_init_set_si (mpz_t @var{rop}, signed long int @var{op}) @deftypefunx void mpz_init_set_d (mpz_t @var{rop}, double @var{op}) Initialize @var{rop} with limb space and set the initial numeric value from @var{op}. @end deftypefun @deftypefun int mpz_init_set_str (mpz_t @var{rop}, char *@var{str}, int @var{base}) Initialize @var{rop} and set its value like @code{mpz_set_str} (see its documentation above for details). If the string is a correct base @var{base} number, the function returns 0; if an error occurs it returns @minus{}1. @var{rop} is initialized even if an error occurs. (I.e., you have to call @code{mpz_clear} for it.) @end deftypefun @node Converting Integers, Integer Arithmetic, Simultaneous Integer Init & Assign, Integer Functions @comment node-name, next, previous, up @section Conversion Functions @cindex Integer conversion functions @cindex Conversion functions This section describes functions for converting GMP integers to standard C types. Functions for converting @emph{to} GMP integers are described in @ref{Assigning Integers} and @ref{I/O of Integers}. @deftypefun mp_limb_t mpz_getlimbn (mpz_t @var{op}, mp_size_t @var{n}) Return limb #@var{n} from @var{op}. This function allows for very efficient decomposition of a number in its limbs. The function @code{mpz_size} can be used to determine the useful range for @var{n}. @end deftypefun @deftypefun {unsigned long int} mpz_get_ui (mpz_t @var{op}) Return the least significant part from @var{op}. This function combined with @* @code{mpz_tdiv_q_2exp(@dots{}, @var{op}, CHAR_BIT*sizeof(unsigned long int))} can be used to decompose an integer into unsigned longs. @end deftypefun @deftypefun {signed long int} mpz_get_si (mpz_t @var{op}) If @var{op} fits into a @code{signed long int} return the value of @var{op}. Otherwise return the least significant part of @var{op}, with the same sign as @var{op}. If @var{op} is too large to fit in a @code{signed long int}, the returned result is probably not very useful. To find out if the value will fit, use the function @code{mpz_fits_slong_p}. @end deftypefun @deftypefun double mpz_get_d (mpz_t @var{op}) Convert @var{op} to a double. @end deftypefun @deftypefun {char *} mpz_get_str (char *@var{str}, int @var{base}, mpz_t @var{op}) Convert @var{op} to a string of digits in base @var{base}. The base may vary from 2 to 36. If @var{str} is NULL, space for the result string is allocated using the default allocation function. If @var{str} is not NULL, it should point to a block of storage enough large for the result. To find out the right amount of space to provide for @var{str}, use @code{mpz_sizeinbase (@var{op}, @var{base}) + 2}. The two extra bytes are for a possible minus sign, and for the terminating null character. A pointer to the result string is returned. This pointer will will either equal @var{str}, or if that is NULL, will point to the allocated storage. @end deftypefun @need 2000 @node Integer Arithmetic, Comparison Functions, Converting Integers, Integer Functions @comment node-name, next, previous, up @section Arithmetic Functions @cindex Integer arithmetic functions @cindex Arithmetic functions @deftypefun void mpz_add (mpz_t @var{rop}, mpz_t @var{op1}, mpz_t @var{op2}) @deftypefunx void mpz_add_ui (mpz_t @var{rop}, mpz_t @var{op1}, unsigned long int @var{op2}) @ifinfo Set @var{rop} to @var{op1} + @var{op2}. @end ifinfo @iftex @tex Set @var{rop} to $@var{op1} + @var{op2}$. @end tex @end iftex @end deftypefun @deftypefun void mpz_sub (mpz_t @var{rop}, mpz_t @var{op1}, mpz_t @var{op2}) @deftypefunx void mpz_sub_ui (mpz_t @var{rop}, mpz_t @var{op1}, unsigned long int @var{op2}) Set @var{rop} to @var{op1} @minus{} @var{op2}. @end deftypefun @deftypefun void mpz_mul (mpz_t @var{rop}, mpz_t @var{op1}, mpz_t @var{op2}) @deftypefunx void mpz_mul_ui (mpz_t @var{rop}, mpz_t @var{op1}, unsigned long int @var{op2}) @ifinfo Set @var{rop} to @var{op1} times @var{op2}. @end ifinfo @iftex @tex Set @var{rop} to $@var{op1} \times @var{op2}$. @end tex @end iftex @end deftypefun @deftypefun void mpz_addmul_ui (mpz_t @var{rop}, mpz_t @var{op1}, unsigned long int @var{op2}) @ifinfo Add @var{op1} times @var{op2} to @var{rop}. @end ifinfo @iftex @tex Set @var{rop} to $@var{rop} + @var{op1} \times @var{op2}$. @end tex @end iftex @end deftypefun @deftypefun void mpz_mul_2exp (mpz_t @var{rop}, mpz_t @var{op1}, unsigned long int @var{op2}) @ifinfo Set @var{rop} to @var{op1} times 2 raised to @var{op2}. This operation can also be defined as a left shift, @var{op2} steps. @end ifinfo @iftex @tex Set @var{rop} to $@var{op1} \times 2^{op2}$. This operation can also be defined as a left shift, @var{op2} steps. @end tex @end iftex @end deftypefun @deftypefun void mpz_neg (mpz_t @var{rop}, mpz_t @var{op}) Set @var{rop} to @minus{}@var{op}. @end deftypefun @deftypefun void mpz_abs (mpz_t @var{rop}, mpz_t @var{op}) Set @var{rop} to the absolute value of @var{op}. @end deftypefun @subsection Division and mod functions Division is undefined if the divisor is zero, and passing a zero divisor to the divide or modulo functions, as well passing a zero mod argument to the @code{mpz_powm} and @code{mpz_powm_ui} functions, will make these functions intentionally divide by zero. This lets the user handle arithmetic exceptions in these functions in the same manner as other arithmetic exceptions. There are three main groups of division functions: @itemize @bullet @item Functions that truncate the quotient towards 0. The names of these functions start with @code{mpz_tdiv}. The @samp{t} in the name is short for @samp{truncate}. @item Functions that round the quotient towards @ifinfo @minus{}infinity). @end ifinfo @iftex @tex $-\infty$ @end tex @end iftex The names of these routines start with @code{mpz_fdiv}. The @samp{f} in the name is short for @samp{floor}. @item Functions that round the quotient towards @ifinfo +infinity. @end ifinfo @iftex @tex $+\infty$ @end tex @end iftex The names of these routines start with @code{mpz_cdiv}. The @samp{c} in the name is short for @samp{ceil}. @end itemize For each rounding mode, there are a couple of variants. Here @samp{q} means that the quotient is computed, while @samp{r} means that the remainder is computed. Functions that compute both the quotient and remainder have @samp{qr} in the name. @deftypefun void mpz_tdiv_q (mpz_t @var{q}, mpz_t @var{n}, mpz_t @var{d}) @deftypefunx {unsigned long int} mpz_tdiv_q_ui (mpz_t @var{q}, mpz_t @var{n}, unsigned long int @var{d}) Set @var{q} to [@var{n}/@var{d}], truncated towards 0. The function @code{mpz_tdiv_q_ui} returns the absolute value of the true remainder. @end deftypefun @deftypefun void mpz_tdiv_r (mpz_t @var{r}, mpz_t @var{n}, mpz_t @var{d}) @deftypefunx {unsigned long int} mpz_tdiv_r_ui (mpz_t @var{r}, mpz_t @var{n}, unsigned long int @var{d}) @ifinfo Set @var{r} to (@var{n} - [@var{n}/@var{d}] * @var{d}), where the quotient is truncated towards 0. Unless @var{r} becomes zero, it will get the same sign as @var{n}. @end ifinfo @iftex @tex Set @var{r} to $(@var{n} - [@var{n}/@var{d}] \times @var{d})$, where the quotient is truncated towards 0. Unless @var{r} becomes zero, it will get the same sign as @var{n}. @end tex @end iftex The function @code{mpz_tdiv_r_ui} returns the absolute value of the remainder. @end deftypefun @deftypefun void mpz_tdiv_qr (mpz_t @var{q}, mpz_t @var{r}, mpz_t @var{n}, mpz_t @var{d}) @deftypefunx {unsigned long int} mpz_tdiv_qr_ui (mpz_t @var{q}, mpz_t @var{r}, mpz_t @var{n}, unsigned long int @var{d}) @ifinfo Set @var{q} to [@var{n}/@var{d}], truncated towards 0. Set @var{r} to (@var{n} - [@var{n}/@var{d}] * @var{d}). Unless @var{r} becomes zero, it will get the same sign as @var{n}. If @var{q} and @var{r} are the same variable, the results are undefined. @end ifinfo @iftex @tex Set @var{q} to [@var{n}/@var{d}], truncated towards 0. Set @var{r} to $(@var{n} - [@var{n}/@var{d}] \times @var{d})$. Unless @var{r} becomes zero, it will get the same sign as @var{n}. If @var{q} and @var{r} are the same variable, the results are undefined. @end tex @end iftex The function @code{mpz_tdiv_qr_ui} returns the absolute value of the remainder. @end deftypefun @deftypefun {unsigned long int} mpz_tdiv_ui (mpz_t @var{n}, unsigned long int @var{d}) Like @code{mpz_tdiv_r_ui}, but the remainder is not stored anywhere; its absolute value is just returned. @end deftypefun @deftypefun void mpz_fdiv_q (mpz_t @var{q}, mpz_t @var{n}, mpz_t @var{d}) @deftypefunx {unsigned long int} mpz_fdiv_q_ui (mpz_t @var{q}, mpz_t @var{n}, unsigned long int @var{d}) @ifinfo Set @var{q} to @var{n}/@var{d}, rounded towards @minus{}infinity. @end ifinfo @iftex @tex Set @var{q} to $\lfloor@var{n}/@var{d}\rfloor$. @end tex @end iftex The function @code{mpz_fdiv_q_ui} returns the remainder. @end deftypefun @deftypefun void mpz_fdiv_r (mpz_t @var{r}, mpz_t @var{n}, mpz_t @var{d}) @deftypefunx {unsigned long int} mpz_fdiv_r_ui (mpz_t @var{r}, mpz_t @var{n}, unsigned long int @var{d}) @ifinfo Set @var{r} to (@var{n} - @var{n}/@var{d} * @var{d}), where the quotient is rounded towards @minus{}infinity. Unless @var{r} becomes zero, it will get the same sign as @var{d}. @end ifinfo @iftex @tex Set @var{r} to $(@var{n} - \lfloor@var{n}/@var{d}\rfloor \times @var{d})$. Unless @var{r} becomes zero, it will get the same sign as @var{d}. @end tex @end iftex The function @code{mpz_fdiv_r_ui} returns the remainder. @end deftypefun @deftypefun void mpz_fdiv_qr (mpz_t @var{q}, mpz_t @var{r}, mpz_t @var{n}, mpz_t @var{d}) @deftypefunx {unsigned long int} mpz_fdiv_qr_ui (mpz_t @var{q}, mpz_t @var{r}, mpz_t @var{n}, unsigned long int @var{d}) @ifinfo Set @var{q} to @var{n}/@var{d}, rounded towards @minus{}infinity. Set @var{r} to (@var{n} - @var{n}/@var{d} * @var{d}). Unless @var{r} becomes zero, it will get the same sign as @var{d}. If @var{q} and @var{r} are the same variable, the results are undefined. @end ifinfo @iftex @tex Set @var{q} to $\lfloor@var{n}/@var{d}\rfloor$. Set @var{r} to $(@var{n} - \lfloor@var{n}/@var{d}\rfloor \times @var{d})$. Unless @var{r} becomes zero, it will get the same sign as @var{d}. If @var{q} and @var{r} are the same variable, the results are undefined. @end tex @end iftex The function @code{mpz_fdiv_qr_ui} returns the remainder. @end deftypefun @deftypefun {unsigned long int} mpz_fdiv_ui (mpz_t @var{n}, unsigned long int @var{d}) Like @code{mpz_fdiv_r_ui}, but the remainder is not stored anywhere; it is just returned. @end deftypefun @deftypefun void mpz_cdiv_q (mpz_t @var{q}, mpz_t @var{n}, mpz_t @var{d}) @deftypefunx {unsigned long int} mpz_cdiv_q_ui (mpz_t @var{q}, mpz_t @var{n}, unsigned long int @var{d}) @ifinfo Set @var{q} to @var{n}/@var{d}, rounded towards +infinity. @end ifinfo @iftex @tex Set @var{q} to $\lceil@var{n}/@var{d}\rceil$. @end tex @end iftex The function @code{mpz_cdiv_q_ui} returns the negated remainder. @end deftypefun @deftypefun void mpz_cdiv_r (mpz_t @var{r}, mpz_t @var{n}, mpz_t @var{d}) @deftypefunx {unsigned long int} mpz_cdiv_r_ui (mpz_t @var{r}, mpz_t @var{n}, unsigned long int @var{d}) @ifinfo Set @var{r} to (@var{n} - @var{n}/@var{d} * @var{d}), where the quotient is rounded towards +infinity. Unless @var{r} becomes zero, it will get the opposite sign as @var{d}. @end ifinfo @iftex @tex Set @var{r} to $(@var{n} - \lceil@var{n}/@var{d}\rceil \times @var{d})$. Unless @var{r} becomes zero, it will get the opposite sign as @var{d}. @end tex @end iftex The function @code{mpz_cdiv_r_ui} returns the negated remainder. @end deftypefun @deftypefun void mpz_cdiv_qr (mpz_t @var{q}, mpz_t @var{r}, mpz_t @var{n}, mpz_t @var{d}) @deftypefunx {unsigned long int} mpz_cdiv_qr_ui (mpz_t @var{q}, mpz_t @var{r}, mpz_t @var{n}, unsigned long int @var{d}) @ifinfo Set @var{q} to @var{n}/@var{d}, rounded towards +infinity. Set @var{r} to (@var{n} - @var{n}/@var{d} * @var{d}). Unless @var{r} becomes zero, it will get the opposite sign as @var{d}. If @var{q} and @var{r} are the same variable, the results are undefined. @end ifinfo @iftex @tex Set @var{q} to $\lceil@var{n}/@var{d}\rceil$. Set @var{r} to $(@var{n} - \lceil@var{n}/@var{d}\rceil \times @var{d})$. Unless @var{r} becomes zero, it will get the opposite sign as @var{d}. If @var{q} and @var{r} are the same variable, the results are undefined. @end tex @end iftex The function @code{mpz_cdiv_qr_ui} returns the negated remainder. @end deftypefun @deftypefun {unsigned long int} mpz_cdiv_ui (mpz_t @var{n}, unsigned long int @var{d}) Like @code{mpz_tdiv_r_ui}, but the remainder is not stored anywhere; its negated value is just returned. @end deftypefun @deftypefun void mpz_mod (mpz_t @var{r}, mpz_t @var{n}, mpz_t @var{d}) @deftypefunx {unsigned long int} mpz_mod_ui (mpz_t @var{r}, mpz_t @var{n}, unsigned long int @var{d}) Set @var{r} to @var{n} @code{mod} @var{d}. The sign of the divisor is ignored; the result is always non-negative. The function @code{mpz_mod_ui} returns the remainder. @end deftypefun @deftypefun void mpz_divexact (mpz_t @var{q}, mpz_t @var{n}, mpz_t @var{d}) Set @var{q} to @var{n}/@var{d}. This function produces correct results only when it is known in advance that @var{d} divides @var{n}. Since mpz_divexact is much faster than any of the other routines that produce the quotient (@pxref{References} Jebelean), it is the best choice for instances in which exact division is known to occur, such as reducing a rational to lowest terms. @end deftypefun @deftypefun void mpz_tdiv_q_2exp (mpz_t @var{q}, mpz_t @var{n}, unsigned long int @var{d}) @ifinfo Set @var{q} to @var{n} divided by 2 raised to @var{d}. The quotient is truncated towards 0. @end ifinfo @iftex @tex Set @var{q} to $@var{n}/2^{d}$. The quotient is truncated towards 0. @end tex @end iftex @end deftypefun @deftypefun void mpz_tdiv_r_2exp (mpz_t @var{r}, mpz_t @var{n}, unsigned long int @var{d}) @ifinfo Divide @var{n} by (2 raised to @var{d}) and put the remainder in @var{r}. Unless it is zero, @var{r} will have the same sign as @var{n}. @end ifinfo @iftex @tex Divide @var{n} by $2^{d}$ and put the remainder in @var{r}. Unless it is zero, @var{r} will have the same sign as @var{n}. @end tex @end iftex @end deftypefun @deftypefun void mpz_fdiv_q_2exp (mpz_t @var{q}, mpz_t @var{n}, unsigned long int @var{d}) @ifinfo Set @var{q} to @var{n} divided by 2 raised to @var{d}, rounded towards @minus{}infinity. @end ifinfo @iftex @tex Set @var{q} to $\lfloor@var{n}/2^{d}\rfloor$. @end tex @end iftex @end deftypefun @deftypefun void mpz_fdiv_r_2exp (mpz_t @var{r}, mpz_t @var{n}, unsigned long int @var{d}) @ifinfo Divide @var{n} by (2 raised to @var{d}) and put the remainder in @var{r}. The sign of @var{r} will always be positive. @end ifinfo @iftex @tex Divide @var{n} by $2^{d}$ and put the remainder in @var{r}. The sign of @var{r} will always be positive. @end tex @end iftex This operation can also be defined as masking of the @var{d} least significant bits. @end deftypefun @subsection Exponentiation Functions @deftypefun void mpz_powm (mpz_t @var{rop}, mpz_t @var{base}, mpz_t @var{exp}, mpz_t @var{mod}) @deftypefunx void mpz_powm_ui (mpz_t @var{rop}, mpz_t @var{base}, unsigned long int @var{exp}, mpz_t @var{mod}) Set @var{rop} to (@var{base} raised to @var{exp}) @code{mod} @var{mod}. If @var{exp} is negative, the result is undefined. @end deftypefun @deftypefun void mpz_pow_ui (mpz_t @var{rop}, mpz_t @var{base}, unsigned long int @var{exp}) @deftypefunx void mpz_ui_pow_ui (mpz_t @var{rop}, unsigned long int @var{base}, unsigned long int @var{exp}) Set @var{rop} to @var{base} raised to @var{exp}. @ifinfo The case of 0^0 yields 1. @end ifinfo @iftex @tex The case of $0^0$ yields 1. @end tex @end iftex @end deftypefun @subsection Root Functions @deftypefun int mpz_root (mpz_t @var{rop}, mpz_t @var{op}, unsigned long int @var{n}) @ifinfo Set @var{rop} to the truncated integer part of the @var{n}th root of @var{op}. @end ifinfo @iftex @tex Set @var{rop} to $\lfloor\root n \of {op}\rfloor$, the truncated integer part of the @var{n}th root of @var{op}. @end tex @end iftex Return non-zero if the computation was exact, i.e., if @var{op} is @var{rop} to the @var{n}th power. @end deftypefun @deftypefun void mpz_sqrt (mpz_t @var{rop}, mpz_t @var{op}) @ifinfo Set @var{rop} to the truncated integer part of the square root of @var{op}. @end ifinfo @iftex @tex Set @var{rop} to $\lfloor\sqrt{@var{op}}\rfloor$, the truncated integer part of the square root of @var{op}. @end tex @end iftex @end deftypefun @deftypefun void mpz_sqrtrem (mpz_t @var{rop1}, mpz_t @var{rop2}, mpz_t @var{op}) @ifinfo Set @var{rop1} to the truncated integer part of the square root of @var{op}, like @code{mpz_sqrt}. Set @var{rop2} to @var{op}@minus{}@var{rop1}*@var{rop1}, @end ifinfo @iftex @tex Set @var{rop1} to $\lfloor\sqrt{@var{op}}\rfloor$, like @code{mpz_sqrt}. Set @var{rop2} to $(@var{op} - @var{rop1}^2)$, @end tex @end iftex (i.e., zero if @var{op} is a perfect square). If @var{rop1} and @var{rop2} are the same variable, the results are undefined. @end deftypefun @deftypefun int mpz_perfect_power_p (mpz_t @var{op}) @ifinfo Return non-zero if @var{op} is a perfect power, i.e., if there exist integers @var{a} and @var{b}, with @var{b} > 1, such that @var{op} equals a raised to b. Return zero otherwise. @end ifinfo @iftex @tex Return non-zero if @var{op} is a perfect power, i.e., if there exist integers $a$ and $b$, with $b>1$, such that $@var{op}=a^b$. Return zero otherwise. @end tex @end iftex @end deftypefun @deftypefun int mpz_perfect_square_p (mpz_t @var{op}) Return non-zero if @var{op} is a perfect square, i.e., if the square root of @var{op} is an integer. Return zero otherwise. @end deftypefun @subsection Number Theoretic Functions @deftypefun int mpz_probab_prime_p (mpz_t @var{n}, int @var{reps}) If this function returns 0, @var{n} is definitely not prime. If it returns 1, then @var{n} is `probably' prime. If it returns 2, then @var{n} is surely prime. Reasonable values of reps vary from 5 to 10; a higher value lowers the probability for a non-prime to pass as a `probable' prime. The function uses Miller-Rabin's probabilistic test. @end deftypefun @deftypefun int mpz_nextprime (mpz_t @var{rop}, mpz_t @var{op}) Set @var{rop} to the next prime greater than @var{op}. This function uses a probabilistic algorithm to identify primes, but for for practical purposes it's adequate, since the chance of a composite passing will be extremely small. @end deftypefun @c mpz_prime_p not implemented as of gmp 3.0. @c @deftypefun int mpz_prime_p (mpz_t @var{n}) @c Return non-zero if @var{n} is prime and zero if @var{n} is a non-prime. @c This function is far slower than @code{mpz_probab_prime_p}, but then it @c never returns non-zero for composite numbers. @c (For practical purposes, using @code{mpz_probab_prime_p} is adequate. @c The likelihood of a programming error or hardware malfunction is orders @c of magnitudes greater than the likelihood for a composite to pass as a @c prime, if the @var{reps} argument is in the suggested range.) @c @end deftypefun @deftypefun void mpz_gcd (mpz_t @var{rop}, mpz_t @var{op1}, mpz_t @var{op2}) Set @var{rop} to the greatest common divisor of @var{op1} and @var{op2}. The result is always positive even if either of or both input operands are negative. @end deftypefun @deftypefun {unsigned long int} mpz_gcd_ui (mpz_t @var{rop}, mpz_t @var{op1}, unsigned long int @var{op2}) Compute the greatest common divisor of @var{op1} and @var{op2}. If @var{rop} is not NULL, store the result there. If the result is small enough to fit in an @code{unsigned long int}, it is returned. If the result does not fit, 0 is returned, and the result is equal to the argument @var{op1}. Note that the result will always fit if @var{op2} is non-zero. @end deftypefun @deftypefun void mpz_gcdext (mpz_t @var{g}, mpz_t @var{s}, mpz_t @var{t}, mpz_t @var{a}, mpz_t @var{b}) Compute @var{g}, @var{s}, and @var{t}, such that @var{a}@var{s} + @var{b}@var{t} = @var{g} = @code{gcd}(@var{a}, @var{b}). If @var{t} is NULL, that argument is not computed. @end deftypefun @deftypefun void mpz_lcm (mpz_t @var{rop}, mpz_t @var{op1}, mpz_t @var{op2}) Set @var{rop} to the least common multiple of @var{op1} and @var{op2}. @end deftypefun @deftypefun int mpz_invert (mpz_t @var{rop}, mpz_t @var{op1}, mpz_t @var{op2}) Compute the inverse of @var{op1} modulo @var{op2} and put the result in @var{rop}. Return non-zero if an inverse exist, zero otherwise. When the function returns zero, @var{rop} is undefined. @end deftypefun @deftypefun int mpz_jacobi (mpz_t @var{op1}, mpz_t @var{op2}) @deftypefunx int mpz_legendre (mpz_t @var{op1}, mpz_t @var{op2}) Compute the Jacobi and Legendre symbols, respectively. @end deftypefun @deftypefun {unsigned long int} mpz_remove (mpz_t @var{rop}, mpz_t @var{op}, mpz_t @var{f}) Remove all occurrences of the factor @var{f} from @var{op} and store the result in @var{rop}. Return the multiplicity of @var{f} in @var{op}. @end deftypefun @deftypefun void mpz_fac_ui (mpz_t @var{rop}, unsigned long int @var{op}) Set @var{rop} to @var{op}!, the factorial of @var{op}. @end deftypefun @deftypefun void mpz_bin_ui (mpz_t @var{rop}, mpz_t @var{n}, unsigned long int @var{k}) @deftypefunx void mpz_bin_uiui (mpz_t @var{rop}, unsigned long int @var{n}, unsigned long int @var{k}) @ifinfo Compute the binomial coefficient @var{n} over @var{k} and store the result in @end ifinfo @iftex @tex Compute the binomial coefficient $\left({n}\atop{k}\right)$ and store the result in @end tex @end iftex @var{rop}. @end deftypefun @deftypefun void mpz_fib_ui (mpz_t @var{rop}, unsigned long int @var{n}) Compute the @var{n}th Fibonacci number and store the result in @var{rop}. @end deftypefun @node Comparison Functions, Integer Logic and Bit Fiddling, Integer Arithmetic, Integer Functions @comment node-name, next, previous, up @section Comparison Functions @deftypefun int mpz_cmp (mpz_t @var{op1}, mpz_t @var{op2}) @ifinfo Compare @var{op1} and @var{op2}. Return a positive value if @var{op1} > @var{op2}, zero if @var{op1} = @var{op2}, and a negative value if @var{op1} < @var{op2}. @end ifinfo @iftex @tex Compare @var{op1} and @var{op2}. Return a positive value if $@var{op1} > @var{op2}$, zero if $@var{op1} = @var{op2}$, and a negative value if $@var{op1} < @var{op2}$. @end tex @end iftex @end deftypefun @deftypefn Macro int mpz_cmp_ui (mpz_t @var{op1}, unsigned long int @var{op2}) @deftypefnx Macro int mpz_cmp_si (mpz_t @var{op1}, signed long int @var{op2}) @ifinfo Compare @var{op1} and @var{op2}. Return a positive value if @var{op1} > @var{op2}, zero if @var{op1} = @var{op2}, and a negative value if @var{op1} < @var{op2}. @end ifinfo @iftex @tex Compare @var{op1} and @var{op2}. Return a positive value if $@var{op1} > @var{op2}$, zero if $@var{op1} = @var{op2}$, and a negative value if $@var{op1} < @var{op2}$. @end tex @end iftex These functions are actually implemented as macros. They evaluate their arguments multiple times. @end deftypefn @deftypefun int mpz_cmpabs (mpz_t @var{op1}, mpz_t @var{op2}) @deftypefunx int mpz_cmpabs_ui (mpz_t @var{op1}, unsigned long int @var{op2}) @ifinfo Compare the absolute values of @var{op1} and @var{op2}. Return a positive value if @var{op1} > @var{op2}, zero if @var{op1} = @var{op2}, and a negative value if @var{op1} < @var{op2}. @end ifinfo @iftex @tex Compare the absolute values of @var{op1} and @var{op2}. Return a positive value if $|@var{op1}| > |@var{op2}|$, zero if $|@var{op1}| = |@var{op2}|$, and a negative value if $|@var{op1}| < |@var{op2}|$. @end tex @end iftex @end deftypefun @deftypefn Macro int mpz_sgn (mpz_t @var{op}) @ifinfo Return +1 if @var{op} > 0, 0 if @var{op} = 0, and @minus{}1 if @var{op} < 0. @end ifinfo @iftex @tex Return $+1$ if $@var{op} > 0$, 0 if $@var{op} = 0$, and $-1$ if $@var{op} < 0$. @end tex @end iftex This function is actually implemented as a macro. It evaluates its arguments multiple times. @end deftypefn @node Integer Logic and Bit Fiddling, I/O of Integers, Comparison Functions, Integer Functions @comment node-name, next, previous, up @section Logical and Bit Manipulation Functions @cindex Logical functions @cindex Bit manipulation functions These functions behave as if two's complement arithmetic were used (although sign-magnitude is used by the actual implementation). @deftypefun void mpz_and (mpz_t @var{rop}, mpz_t @var{op1}, mpz_t @var{op2}) Set @var{rop} to @var{op1} logical-and @var{op2}. @end deftypefun @deftypefun void mpz_ior (mpz_t @var{rop}, mpz_t @var{op1}, mpz_t @var{op2}) Set @var{rop} to @var{op1} inclusive-or @var{op2}. @end deftypefun @deftypefun void mpz_xor (mpz_t @var{rop}, mpz_t @var{op1}, mpz_t @var{op2}) Set @var{rop} to @var{op1} exclusive-or @var{op2}. @end deftypefun @deftypefun void mpz_com (mpz_t @var{rop}, mpz_t @var{op}) Set @var{rop} to the one's complement of @var{op}. @end deftypefun @deftypefun {unsigned long int} mpz_popcount (mpz_t @var{op}) For non-negative numbers, return the population count of @var{op}. For negative numbers, return the largest possible value (@var{MAX_ULONG}). @end deftypefun @deftypefun {unsigned long int} mpz_hamdist (mpz_t @var{op1}, mpz_t @var{op2}) If @var{op1} and @var{op2} are both non-negative, return the hamming distance between the two operands. Otherwise, return the largest possible value (@var{MAX_ULONG}). It is possible to extend this function to return a useful value when the operands are both negative, but the current implementation returns @var{MAX_ULONG} in this case. @strong{Do not depend on this behavior, since it will change in a future release.} @end deftypefun @deftypefun {unsigned long int} mpz_scan0 (mpz_t @var{op}, unsigned long int @var{starting_bit}) Scan @var{op}, starting with bit @var{starting_bit}, towards more significant bits, until the first clear bit is found. Return the index of the found bit. @end deftypefun @deftypefun {unsigned long int} mpz_scan1 (mpz_t @var{op}, unsigned long int @var{starting_bit}) Scan @var{op}, starting with bit @var{starting_bit}, towards more significant bits, until the first set bit is found. Return the index of the found bit. @end deftypefun @deftypefun void mpz_setbit (mpz_t @var{rop}, unsigned long int @var{bit_index}) Set bit @var{bit_index} in @var{rop}. @end deftypefun @deftypefun void mpz_clrbit (mpz_t @var{rop}, unsigned long int @var{bit_index}) Clear bit @var{bit_index} in @var{rop}. @end deftypefun @deftypefun int mpz_tstbit (mpz_t @var{op}, unsigned long int @var{bit_index}) Check bit @var{bit_index} in @var{op} and return 0 or 1 accordingly. @end deftypefun @node I/O of Integers, Miscellaneous Integer Functions, Integer Logic and Bit Fiddling, Integer Functions @comment node-name, next, previous, up @section Input and Output Functions @cindex Integer input and output functions @cindex Input functions @cindex Output functions @cindex I/O functions Functions that perform input from a stdio stream, and functions that output to a stdio stream. Passing a NULL pointer for a @var{stream} argument to any of these functions will make them read from @code{stdin} and write to @code{stdout}, respectively. When using any of these functions, it is a good idea to include @file{stdio.h} before @file{gmp.h}, since that will allow @file{gmp.h} to define prototypes for these functions. @deftypefun size_t mpz_out_str (FILE *@var{stream}, int @var{base}, mpz_t @var{op}) Output @var{op} on stdio stream @var{stream}, as a string of digits in base @var{base}. The base may vary from 2 to 36. Return the number of bytes written, or if an error occurred, return 0. @end deftypefun @deftypefun size_t mpz_inp_str (mpz_t @var{rop}, FILE *@var{stream}, int @var{base}) Input a possibly white-space preceded string in base @var{base} from stdio stream @var{stream}, and put the read integer in @var{rop}. The base may vary from 2 to 36. If @var{base} is 0, the actual base is determined from the leading characters: if the first two characters are `0x' or `0X', hexadecimal is assumed, otherwise if the first character is `0', octal is assumed, otherwise decimal is assumed. Return the number of bytes read, or if an error occurred, return 0. @end deftypefun @deftypefun size_t mpz_out_raw (FILE *@var{stream}, mpz_t @var{op}) Output @var{op} on stdio stream @var{stream}, in raw binary format. The integer is written in a portable format, with 4 bytes of size information, and that many bytes of limbs. Both the size and the limbs are written in decreasing significance order (i.e., in big-endian). The output can be read with @code{mpz_inp_raw}. Return the number of bytes written, or if an error occurred, return 0. The output of this can not be read by @code{mpz_inp_raw} from GMP 1, because of changes necessary for compatibility between 32-bit and 64-bit machines. @end deftypefun @deftypefun size_t mpz_inp_raw (mpz_t @var{rop}, FILE *@var{stream}) Input from stdio stream @var{stream} in the format written by @code{mpz_out_raw}, and put the result in @var{rop}. Return the number of bytes read, or if an error occurred, return 0. This routine can read the output from @code{mpz_out_raw} also from GMP 1, in spite of changes necessary for compatibility between 32-bit and 64-bit machines. @end deftypefun @need 2000 @node Miscellaneous Integer Functions,, I/O of Integers, Integer Functions @comment node-name, next, previous, up @section Miscellaneous Functions @cindex Miscellaneous integer functions @deftypefun int mpz_fits_ulong_p (mpz_t @var{op}) @deftypefunx int mpz_fits_slong_p (mpz_t @var{op}) @deftypefunx int mpz_fits_uint_p (mpz_t @var{op}) @deftypefunx int mpz_fits_sint_p (mpz_t @var{op}) @deftypefunx int mpz_fits_ushort_p (mpz_t @var{op}) @deftypefunx int mpz_fits_sshort_p (mpz_t @var{op}) Return non-zero iff the value of @var{op} fits in an @code{unsigned long int}, @code{signed long int}, @code{unsigned int}, @code{signed int}, @code{unsigned short int}, or @code{signed short int}, respectively. Otherwise, return zero. @end deftypefun The random number functions of GMP come in two groups; older function that rely on a global state, and newer functions that accept a state parameter that is read and modified. Please see the @ref{Random Number Functions} for more information on how to use and not to use random number functions. @deftypefun void mpz_urandomb (mpz_t @var{rop}, gmp_randstate_t @var{state}, unsigned long int @var{n}) Generate a uniform random integer in the range @ifinfo 0 to 2^@var{n} @minus{} 1, @end ifinfo @iftex @tex 0 to $2^n-1$, @end tex @end iftex inclusive. The variable @var{state} must be initialized by calling one of the @code{gmp_randinit} functions (@ref{Random State Initialization}) before invoking this function. @end deftypefun @deftypefun void mpz_urandomm (mpz_t @var{rop}, gmp_randstate_t @var{state}, mpz_t @var{n}) Generate a uniform random integer in the range 0 to @ifinfo @var{n} @minus{} 1, inclusive. @end ifinfo @iftex @tex $n-1$, inclusive. @end tex @end iftex The variable @var{state} must be initialized by calling one of the @code{gmp_randinit} functions (@ref{Random State Initialization}) before invoking this function. @end deftypefun @deftypefun void mpz_rrandomb (mpz_t @var{rop}, gmp_randstate_t @var{state}, unsigned long int @var{n}) Generate a random integer with long strings of zeros and ones in the binary representation. Useful for testing functions and algorithms, since this kind of random numbers have proven to be more likely to trigger corner-case bugs. The random number will be in the range @ifinfo 0 to 2^@var{n} @minus{} 1, @end ifinfo @iftex @tex 0 to $2^n-1$, @end tex @end iftex inclusive. The variable @var{state} must be initialized by calling one of the @code{gmp_randinit} functions (@ref{Random State Initialization}) before invoking this function. @end deftypefun @deftypefun size_t mpz_size (mpz_t @var{op}) Return the size of @var{op} measured in number of limbs. If @var{op} is zero, the returned value will be zero. @c (@xref{Nomenclature}, for an explanation of the concept @dfn{limb}.) @end deftypefun @deftypefun size_t mpz_sizeinbase (mpz_t @var{op}, int @var{base}) Return the size of @var{op} measured in number of digits in base @var{base}. The base may vary from 2 to 36. The returned value will be exact or 1 too big. If @var{base} is a power of 2, the returned value will always be exact. This function is useful in order to allocate the right amount of space before converting @var{op} to a string. The right amount of allocation is normally two more than the value returned by @code{mpz_sizeinbase} (one extra for a minus sign and one for the terminating '\0'). @end deftypefun @deftypefun void mpz_random (mpz_t @var{rop}, mp_size_t @var{max_size}) Generate a random integer of at most @var{max_size} limbs. The generated random number doesn't satisfy any particular requirements of randomness. Negative random numbers are generated when @var{max_size} is negative. This function is obsolete. Use @code{mpz_urandomb} or @code{mpz_urandomm} instead. @end deftypefun @deftypefun void mpz_random2 (mpz_t @var{rop}, mp_size_t @var{max_size}) Generate a random integer of at most @var{max_size} limbs, with long strings of zeros and ones in the binary representation. Useful for testing functions and algorithms, since this kind of random numbers have proven to be more likely to trigger corner-case bugs. Negative random numbers are generated when @var{max_size} is negative. This function is obsolete. Use @code{mpz_rrandomb} instead. @end deftypefun @node Rational Number Functions, Floating-point Functions, Integer Functions, Top @comment node-name, next, previous, up @chapter Rational Number Functions @cindex Rational number functions This chapter describes the GMP functions for performing arithmetic on rational numbers. These functions start with the prefix @code{mpq_}. Rational numbers are stored in objects of type @code{mpq_t}. All rational arithmetic functions assume operands have a canonical form, and canonicalize their result. The canonical from means that the denominator and the numerator have no common factors, and that the denominator is positive. Zero has the unique representation 0/1. Pure assignment functions do not canonicalize the assigned variable. It is the responsibility of the user to canonicalize the assigned variable before any arithmetic operations are performed on that variable. @strong{Note that this is an incompatible change from version 1 of the library.} @deftypefun void mpq_canonicalize (mpq_t @var{op}) Remove any factors that are common to the numerator and denominator of @var{op}, and make the denominator positive. @end deftypefun @menu * Initializing Rationals:: * Assigning Rationals:: * Simultaneous Integer Init & Assign:: * Comparing Rationals:: * Applying Integer Functions:: * Miscellaneous Rational Functions:: @end menu @node Initializing Rationals, Assigning Rationals, Rational Number Functions, Rational Number Functions @comment node-name, next, previous, up @section Initialization and Assignment Functions @deftypefun void mpq_init (mpq_t @var{dest_rational}) Initialize @var{dest_rational} and set it to 0/1. Each variable should normally only be initialized once, or at least cleared out (using the function @code{mpq_clear}) between each initialization. @end deftypefun @deftypefun void mpq_clear (mpq_t @var{rational_number}) Free the space occupied by @var{rational_number}. Make sure to call this function for all @code{mpq_t} variables when you are done with them. @end deftypefun @deftypefun void mpq_set (mpq_t @var{rop}, mpq_t @var{op}) @deftypefunx void mpq_set_z (mpq_t @var{rop}, mpz_t @var{op}) Assign @var{rop} from @var{op}. @end deftypefun @deftypefun void mpq_set_ui (mpq_t @var{rop}, unsigned long int @var{op1}, unsigned long int @var{op2}) @deftypefunx void mpq_set_si (mpq_t @var{rop}, signed long int @var{op1}, unsigned long int @var{op2}) Set the value of @var{rop} to @var{op1}/@var{op2}. Note that if @var{op1} and @var{op2} have common factors, @var{rop} has to be passed to @code{mpq_canonicalize} before any operations are performed on @var{rop}. @end deftypefun @node Assigning Rationals, Comparing Rationals, Initializing Rationals, Rational Number Functions @comment node-name, next, previous, up @section Arithmetic Functions @deftypefun void mpq_add (mpq_t @var{sum}, mpq_t @var{addend1}, mpq_t @var{addend2}) Set @var{sum} to @var{addend1} + @var{addend2}. @end deftypefun @deftypefun void mpq_sub (mpq_t @var{difference}, mpq_t @var{minuend}, mpq_t @var{subtrahend}) Set @var{difference} to @var{minuend} @minus{} @var{subtrahend}. @end deftypefun @deftypefun void mpq_mul (mpq_t @var{product}, mpq_t @var{multiplier}, mpq_t @var{multiplicand}) @ifinfo Set @var{product} to @var{multiplier} times @var{multiplicand}. @end ifinfo @iftex @tex Set @var{product} to $@var{multiplier} \times @var{multiplicand}$. @end tex @end iftex @end deftypefun @deftypefun void mpq_div (mpq_t @var{quotient}, mpq_t @var{dividend}, mpq_t @var{divisor}) Set @var{quotient} to @var{dividend}/@var{divisor}. @end deftypefun @deftypefun void mpq_neg (mpq_t @var{negated_operand}, mpq_t @var{operand}) Set @var{negated_operand} to @minus{}@var{operand}. @end deftypefun @deftypefun void mpq_inv (mpq_t @var{inverted_number}, mpq_t @var{number}) Set @var{inverted_number} to 1/@var{number}. If the new denominator is zero, this routine will divide by zero. @end deftypefun @node Comparing Rationals, Applying Integer Functions, Assigning Rationals, Rational Number Functions @comment node-name, next, previous, up @section Comparison Functions @deftypefun int mpq_cmp (mpq_t @var{op1}, mpq_t @var{op2}) @ifinfo Compare @var{op1} and @var{op2}. Return a positive value if @var{op1} > @var{op2}, zero if @var{op1} = @var{op2}, and a negative value if @var{op1} < @var{op2}. @end ifinfo @iftex @tex Compare @var{op1} and @var{op2}. Return a positive value if $@var{op1} > @var{op2}$, zero if $@var{op1} = @var{op2}$, and a negative value if $@var{op1} < @var{op2}$. @end tex @end iftex To determine if two rationals are equal, @code{mpq_equal} is faster than @code{mpq_cmp}. @end deftypefun @deftypefn Macro int mpq_cmp_ui (mpq_t @var{op1}, unsigned long int @var{num2}, unsigned long int @var{den2}) @ifinfo Compare @var{op1} and @var{num2}/@var{den2}. Return a positive value if @var{op1} > @var{num2}/@var{den2}, zero if @var{op1} = @var{num2}/@var{den2}, and a negative value if @var{op1} < @var{num2}/@var{den2}. @end ifinfo @iftex @tex Compare @var{op1} and @var{num2}/@var{den2}. Return a positive value if $@var{op1} > @var{num2}/@var{den2}$, zero if $@var{op1} = @var{num2}/@var{den2}$, and a negative value if $@var{op1} < @var{num2}/@var{den2}$. @end tex @end iftex This routine allows that @var{num2} and @var{den2} have common factors. This function is actually implemented as a macro. It evaluates its arguments multiple times. @end deftypefn @deftypefn Macro int mpq_sgn (mpq_t @var{op}) @ifinfo Return +1 if @var{op} > 0, 0 if @var{op} = 0, and @minus{}1 if @var{op} < 0. @end ifinfo @iftex @tex Return $+1$ if $@var{op} > 0$, 0 if $@var{op} = 0$, and $-1$ if $@var{op} < 0$. @end tex @end iftex This function is actually implemented as a macro. It evaluates its arguments multiple times. @end deftypefn @deftypefun int mpq_equal (mpq_t @var{op1}, mpq_t @var{op2}) Return non-zero if @var{op1} and @var{op2} are equal, zero if they are non-equal. Although @code{mpq_cmp} can be used for the same purpose, this function is much faster. @end deftypefun @node Applying Integer Functions, Miscellaneous Rational Functions, Comparing Rationals, Rational Number Functions @comment node-name, next, previous, up @section Applying Integer Functions to Rationals The set of @code{mpq} functions is quite small. In particular, there are no functions for either input or output. But there are two macros that allow us to apply any @code{mpz} function on the numerator or denominator of a rational number. If these macros are used to assign to the rational number, @code{mpq_canonicalize} normally need to be called afterwards. @deftypefn Macro mpz_t mpq_numref (mpq_t @var{op}) @deftypefnx Macro mpz_t mpq_denref (mpq_t @var{op}) Return a reference to the numerator and denominator of @var{op}, respectively. The @code{mpz} functions can be used on the result of these macros. @end deftypefn @need 2000 @node Miscellaneous Rational Functions, , Applying Integer Functions, Rational Number Functions @comment node-name, next, previous, up @section Miscellaneous Functions @deftypefun double mpq_get_d (mpq_t @var{op}) Convert @var{op} to a double. @end deftypefun @deftypefun double mpq_set_d (mpq_t @var{rop}, double @var{d}) Set @var{rop} to the value of d, without rounding. @end deftypefun These functions assign between either the numerator or denominator of a rational, and an integer. Instead of using these functions, it is preferable to use the more general mechanisms @code{mpq_numref} and @code{mpq_denref}, together with @code{mpz_set}. @deftypefun void mpq_set_num (mpq_t @var{rational}, mpz_t @var{numerator}) Copy @var{numerator} to the numerator of @var{rational}. When this risks to make the numerator and denominator of @var{rational} have common factors, you have to pass @var{rational} to @code{mpq_canonicalize} before any operations are performed on @var{rational}. This function is equivalent to @code{mpz_set (mpq_numref (@var{rational}), @var{numerator})}. @end deftypefun @deftypefun void mpq_set_den (mpq_t @var{rational}, mpz_t @var{denominator}) Copy @var{denominator} to the denominator of @var{rational}. When this risks to make the numerator and denominator of @var{rational} have common factors, or if the denominator might be negative, you have to pass @var{rational} to @code{mpq_canonicalize} before any operations are performed on @var{rational}. @strong{In version 1 of the library, negative denominators were handled by copying the sign to the numerator. That is no longer done.} This function is equivalent to @code{mpz_set (mpq_denref (@var{rational}), @var{denominators})}. @end deftypefun @deftypefun void mpq_get_num (mpz_t @var{numerator}, mpq_t @var{rational}) Copy the numerator of @var{rational} to the integer @var{numerator}, to prepare for integer operations on the numerator. This function is equivalent to @code{mpz_set (@var{numerator}, mpq_numref (@var{rational}))}. @end deftypefun @deftypefun void mpq_get_den (mpz_t @var{denominator}, mpq_t @var{rational}) Copy the denominator of @var{rational} to the integer @var{denominator}, to prepare for integer operations on the denominator. This function is equivalent to @code{mpz_set (@var{denominator}, mpq_denref (@var{rational}))}. @end deftypefun @node Floating-point Functions, Low-level Functions, Rational Number Functions, Top @comment node-name, next, previous, up @chapter Floating-point Functions @cindex Floating-point functions @cindex Float functions This chapter describes the GMP functions for performing floating point arithmetic. These functions start with the prefix @code{mpf_}. GMP integers are stored in objects of type @code{mpf_t}. The GMP floating-point functions have an interface that is similar to the GMP integer functions. The function prefix for floating-point operations is @code{mpf_}. There is one significant characteristic of floating-point numbers that has motivated a difference between this function class and other GMP function classes: the inherent inexactness of floating point arithmetic. The user has to specify the precision of each variable. A computation that assigns a variable will take place with the precision of the assigned variable; the precision of variables used as input is ignored. @cindex User-defined precision The precision of a calculation is defined as follows: Compute the requested operation exactly (with ``infinite precision''), and truncate the result to the destination variable precision. Even if the user has asked for a very high precision, GMP will not calculate with superfluous digits. For example, if two low-precision numbers of nearly equal magnitude are added, the precision of the result will be limited to what is required to represent the result accurately. The GMP floating-point functions are @emph{not} intended as a smooth extension to the IEEE P754 arithmetic. Specifically, the results obtained on one computer often differs from the results obtained on a computer with a different word size. @menu * Initializing Floats:: * Assigning Floats:: * Simultaneous Float Init & Assign:: * Converting Floats:: * Float Arithmetic:: * Float Comparison:: * I/O of Floats:: * Miscellaneous Float Functions:: @end menu @node Initializing Floats, Assigning Floats, , Floating-point Functions @comment node-name, next, previous, up @section Initialization and Assignment Functions @deftypefun void mpf_set_default_prec (unsigned long int @var{prec}) Set the default precision to be @strong{at least} @var{prec} bits. All subsequent calls to @code{mpf_init} will use this precision, but previously initialized variables are unaffected. @end deftypefun An @code{mpf_t} object must be initialized before storing the first value in it. The functions @code{mpf_init} and @code{mpf_init2} are used for that purpose. @deftypefun void mpf_init (mpf_t @var{x}) Initialize @var{x} to 0. Normally, a variable should be initialized once only or at least be cleared, using @code{mpf_clear}, between initializations. The precision of @var{x} is undefined unless a default precision has already been established by a call to @code{mpf_set_default_prec}. @end deftypefun @deftypefun void mpf_init2 (mpf_t @var{x}, unsigned long int @var{prec}) Initialize @var{x} to 0 and set its precision to be @strong{at least} @var{prec} bits. Normally, a variable should be initialized once only or at least be cleared, using @code{mpf_clear}, between initializations. @end deftypefun @deftypefun void mpf_clear (mpf_t @var{x}) Free the space occupied by @var{x}. Make sure to call this function for all @code{mpf_t} variables when you are done with them. @end deftypefun @need 2000 Here is an example on how to initialize floating-point variables: @example @{ mpf_t x, y; mpf_init (x); /* use default precision */ mpf_init2 (y, 256); /* precision @emph{at least} 256 bits */ @dots{} /* Unless the program is about to exit, do ... */ mpf_clear (x); mpf_clear (y); @} @end example The following three functions are useful for changing the precision during a calculation. A typical use would be for adjusting the precision gradually in iterative algorithms like Newton-Raphson, making the computation precision closely match the actual accurate part of the numbers. @deftypefun void mpf_set_prec (mpf_t @var{rop}, unsigned long int @var{prec}) Set the precision of @var{rop} to be @strong{at least} @var{prec} bits. Since changing the precision involves calls to @code{realloc}, this routine should not be called in a tight loop. @end deftypefun @deftypefun {unsigned long int} mpf_get_prec (mpf_t @var{op}) Return the precision actually used for assignments of @var{op}. @end deftypefun @deftypefun void mpf_set_prec_raw (mpf_t @var{rop}, unsigned long int @var{prec}) Set the precision of @var{rop} to be @strong{at least} @var{prec} bits. This is a low-level function that does not change the allocation. The @var{prec} argument must not be larger that the precision previously returned by @code{mpf_get_prec}. It is crucial that the precision of @var{rop} is ultimately reset to exactly the value returned by @code{mpf_get_prec} before the first call to @code{mpf_set_prec_raw}. @end deftypefun @node Assigning Floats, Simultaneous Float Init & Assign, Initializing Floats, Floating-point Functions @comment node-name, next, previous, up @subsection Assignment Functions @cindex Float assignment functions These functions assign new values to already initialized floats (@pxref{Initializing Floats}). @deftypefun void mpf_set (mpf_t @var{rop}, mpf_t @var{op}) @deftypefunx void mpf_set_ui (mpf_t @var{rop}, unsigned long int @var{op}) @deftypefunx void mpf_set_si (mpf_t @var{rop}, signed long int @var{op}) @deftypefunx void mpf_set_d (mpf_t @var{rop}, double @var{op}) @deftypefunx void mpf_set_z (mpf_t @var{rop}, mpz_t @var{op}) @deftypefunx void mpf_set_q (mpf_t @var{rop}, mpq_t @var{op}) Set the value of @var{rop} from @var{op}. @end deftypefun @deftypefun int mpf_set_str (mpf_t @var{rop}, char *@var{str}, int @var{base}) Set the value of @var{rop} from the string in @var{str}. The string is of the form @samp{M@@N} or, if the base is 10 or less, alternatively @samp{MeN}. @samp{M} is the mantissa and @samp{N} is the exponent. The mantissa is always in the specified base. The exponent is either in the specified base or, if @var{base} is negative, in decimal. The argument @var{base} may be in the ranges 2 to 36, or @minus{}36 to @minus{}2. Negative values are used to specify that the exponent is in decimal. Unlike the corresponding @code{mpz} function, the base will not be determined from the leading characters of the string if @var{base} is 0. This is so that numbers like @samp{0.23} are not interpreted as octal. White space is allowed in the string, and is simply ignored. This function returns 0 if the entire string up to the '\0' is a valid number in base @var{base}. Otherwise it returns @minus{}1. @end deftypefun @node Simultaneous Float Init & Assign, Converting Floats, Assigning Floats, Floating-point Functions @comment node-name, next, previous, up @subsection Combined Initialization and Assignment Functions @cindex Initialization and assignment functions For convenience, GMP provides a parallel series of initialize-and-set functions which initialize the output and then store the value there. These functions' names have the form @code{mpf_init_set@dots{}} Once the float has been initialized by any of the @code{mpf_init_set@dots{}} functions, it can be used as the source or destination operand for the ordinary float functions. Don't use an initialize-and-set function on a variable already initialized! @deftypefun void mpf_init_set (mpf_t @var{rop}, mpf_t @var{op}) @deftypefunx void mpf_init_set_ui (mpf_t @var{rop}, unsigned long int @var{op}) @deftypefunx void mpf_init_set_si (mpf_t @var{rop}, signed long int @var{op}) @deftypefunx void mpf_init_set_d (mpf_t @var{rop}, double @var{op}) Initialize @var{rop} and set its value from @var{op}. The precision of @var{rop} will be taken from the active default precision, as set by @code{mpf_set_default_prec}. @end deftypefun @deftypefun int mpf_init_set_str (mpf_t @var{rop}, char *@var{str}, int @var{base}) Initialize @var{rop} and set its value from the string in @var{str}. See @code{mpf_set_str} above for details on the assignment operation. Note that @var{rop} is initialized even if an error occurs. (I.e., you have to call @code{mpf_clear} for it.) The precision of @var{rop} will be taken from the active default precision, as set by @code{mpf_set_default_prec}. @end deftypefun @node Converting Floats, Float Arithmetic, Simultaneous Float Init & Assign, Floating-point Functions @comment node-name, next, previous, up @section Conversion Functions @cindex Conversion functions @deftypefun double mpf_get_d (mpf_t @var{op}) Convert @var{op} to a double. @end deftypefun @deftypefun {char *} mpf_get_str (char *@var{str}, mp_exp_t *@var{expptr}, int @var{base}, size_t @var{n_digits}, mpf_t @var{op}) Convert @var{op} to a string of digits in base @var{base}. The base may vary from 2 to 36. Generate at most @var{n_digits} significant digits, or if @var{n_digits} is 0, the maximum number of digits accurately representable by @var{op}. If @var{str} is NULL, space for the mantissa is allocated using the default allocation function. If @var{str} is not NULL, it should point to a block of storage enough large for the mantissa, i.e., @var{n_digits} + 2. The two extra bytes are for a possible minus sign, and for the terminating null character. The exponent is written through the pointer @var{expptr}. If @var{n_digits} is 0, the maximum number of digits meaningfully achievable from the precision of @var{op} will be generated. Note that the space requirements for @var{str} in this case will be impossible for the user to predetermine. Therefore, you need to pass NULL for the string argument whenever @var{n_digits} is 0. The generated string is a fraction, with an implicit radix point immediately to the left of the first digit. For example, the number 3.1416 would be returned as "31416" in the string and 1 written at @var{expptr}. A pointer to the result string is returned. This pointer will will either equal @var{str}, or if that is NULL, will point to the allocated storage. @end deftypefun @node Float Arithmetic, Float Comparison, Converting Floats, Floating-point Functions @comment node-name, next, previous, up @section Arithmetic Functions @cindex Float arithmetic functions @cindex Arithmetic functions @deftypefun void mpf_add (mpf_t @var{rop}, mpf_t @var{op1}, mpf_t @var{op2}) @deftypefunx void mpf_add_ui (mpf_t @var{rop}, mpf_t @var{op1}, unsigned long int @var{op2}) @ifinfo Set @var{rop} to @var{op1} + @var{op2}. @end ifinfo @iftex @tex Set @var{rop} to $@var{op1} + @var{op2}$. @end tex @end iftex @end deftypefun @deftypefun void mpf_sub (mpf_t @var{rop}, mpf_t @var{op1}, mpf_t @var{op2}) @deftypefunx void mpf_ui_sub (mpf_t @var{rop}, unsigned long int @var{op1}, mpf_t @var{op2}) @deftypefunx void mpf_sub_ui (mpf_t @var{rop}, mpf_t @var{op1}, unsigned long int @var{op2}) Set @var{rop} to @var{op1} @minus{} @var{op2}. @end deftypefun @deftypefun void mpf_mul (mpf_t @var{rop}, mpf_t @var{op1}, mpf_t @var{op2}) @deftypefunx void mpf_mul_ui (mpf_t @var{rop}, mpf_t @var{op1}, unsigned long int @var{op2}) @ifinfo Set @var{rop} to @var{op1} times @var{op2}. @end ifinfo @iftex @tex Set @var{rop} to $@var{op1} \times @var{op2}$. @end tex @end iftex @end deftypefun Division is undefined if the divisor is zero, and passing a zero divisor to the divide functions will make these functions intentionally divide by zero. This lets the user handle arithmetic exceptions in these functions in the same manner as other arithmetic exceptions. @deftypefun void mpf_div (mpf_t @var{rop}, mpf_t @var{op1}, mpf_t @var{op2}) @deftypefunx void mpf_ui_div (mpf_t @var{rop}, unsigned long int @var{op1}, mpf_t @var{op2}) @deftypefunx void mpf_div_ui (mpf_t @var{rop}, mpf_t @var{op1}, unsigned long int @var{op2}) Set @var{rop} to @var{op1}/@var{op2}. @end deftypefun @deftypefun void mpf_sqrt (mpf_t @var{rop}, mpf_t @var{op}) @deftypefunx void mpf_sqrt_ui (mpf_t @var{rop}, unsigned long int @var{op}) @ifinfo Set @var{rop} to the square root of @var{op}. @end ifinfo @iftex @tex Set @var{rop} to $\sqrt{@var{op}}$. @end tex @end iftex @end deftypefun @deftypefun void mpf_pow_ui (mpf_t @var{rop}, mpf_t @var{op1}, unsigned long int @var{op2}) @ifnottex Set @var{rop} to @var{op1} raised to the power @var{op2}. @end ifnottex @tex Set @var{rop} to $@var{op1}^{op2}$. @end tex @end deftypefun @deftypefun void mpf_neg (mpf_t @var{rop}, mpf_t @var{op}) Set @var{rop} to @minus{}@var{op}. @end deftypefun @deftypefun void mpf_abs (mpf_t @var{rop}, mpf_t @var{op}) Set @var{rop} to the absolute value of @var{op}. @end deftypefun @deftypefun void mpf_mul_2exp (mpf_t @var{rop}, mpf_t @var{op1}, unsigned long int @var{op2}) @ifinfo Set @var{rop} to @var{op1} times 2 raised to @var{op2}. @end ifinfo @iftex @tex Set @var{rop} to $@var{op1} \times 2^{op2}$. @end tex @end iftex @end deftypefun @deftypefun void mpf_div_2exp (mpf_t @var{rop}, mpf_t @var{op1}, unsigned long int @var{op2}) @ifinfo Set @var{rop} to @var{op1} divided by 2 raised to @var{op2}. @end ifinfo @iftex @tex Set @var{rop} to $@var{op1}/2^{op2}$. @end tex @end iftex @end deftypefun @node Float Comparison, I/O of Floats, Float Arithmetic, Floating-point Functions @comment node-name, next, previous, up @section Comparison Functions @cindex Float comparisons functions @cindex Comparison functions @deftypefun int mpf_cmp (mpf_t @var{op1}, mpf_t @var{op2}) @deftypefunx int mpf_cmp_ui (mpf_t @var{op1}, unsigned long int @var{op2}) @deftypefunx int mpf_cmp_si (mpf_t @var{op1}, signed long int @var{op2}) @ifinfo Compare @var{op1} and @var{op2}. Return a positive value if @var{op1} > @var{op2}, zero if @var{op1} = @var{op2}, and a negative value if @var{op1} < @var{op2}. @end ifinfo @iftex @tex Compare @var{op1} and @var{op2}. Return a positive value if $@var{op1} > @var{op2}$, zero if $@var{op1} = @var{op2}$, and a negative value if $@var{op1} < @var{op2}$. @end tex @end iftex @end deftypefun @deftypefun int mpf_eq (mpf_t @var{op1}, mpf_t @var{op2}, unsigned long int op3) Return non-zero if the first @var{op3} bits of @var{op1} and @var{op2} are equal, zero otherwise. I.e., test of @var{op1} and @var{op2} are approximately equal. @end deftypefun @deftypefun void mpf_reldiff (mpf_t @var{rop}, mpf_t @var{op1}, mpf_t @var{op2}) Compute the relative difference between @var{op1} and @var{op2} and store the result in @var{rop}. @end deftypefun @deftypefn Macro int mpf_sgn (mpf_t @var{op}) @ifinfo Return +1 if @var{op} > 0, 0 if @var{op} = 0, and @minus{}1 if @var{op} < 0. @end ifinfo @iftex @tex Return $+1$ if $@var{op} > 0$, 0 if $@var{op} = 0$, and $-1$ if $@var{op} < 0$. @end tex @end iftex This function is actually implemented as a macro. It evaluates its arguments multiple times. @end deftypefn @node I/O of Floats, Miscellaneous Float Functions, Float Comparison, Floating-point Functions @comment node-name, next, previous, up @section Input and Output Functions @cindex Float input and output functions @cindex Input functions @cindex Output functions @cindex I/O functions Functions that perform input from a stdio stream, and functions that output to a stdio stream. Passing a NULL pointer for a @var{stream} argument to any of these functions will make them read from @code{stdin} and write to @code{stdout}, respectively. When using any of these functions, it is a good idea to include @file{stdio.h} before @file{gmp.h}, since that will allow @file{gmp.h} to define prototypes for these functions. @deftypefun size_t mpf_out_str (FILE *@var{stream}, int @var{base}, size_t @var{n_digits}, mpf_t @var{op}) Output @var{op} on stdio stream @var{stream}, as a string of digits in base @var{base}. The base may vary from 2 to 36. Print at most @var{n_digits} significant digits, or if @var{n_digits} is 0, the maximum number of digits accurately representable by @var{op}. In addition to the significant digits, a leading @samp{0.} and a trailing exponent, in the form @samp{eNNN}, are printed. If @var{base} is greater than 10, @samp{@@} will be used instead of @samp{e} as exponent delimiter. Return the number of bytes written, or if an error occurred, return 0. @end deftypefun @deftypefun size_t mpf_inp_str (mpf_t @var{rop}, FILE *@var{stream}, int @var{base}) Input a string in base @var{base} from stdio stream @var{stream}, and put the read float in @var{rop}. The string is of the form @samp{M@@N} or, if the base is 10 or less, alternatively @samp{MeN}. @samp{M} is the mantissa and @samp{N} is the exponent. The mantissa is always in the specified base. The exponent is either in the specified base or, if @var{base} is negative, in decimal. The argument @var{base} may be in the ranges 2 to 36, or @minus{}36 to @minus{}2. Negative values are used to specify that the exponent is in decimal. Unlike the corresponding @code{mpz} function, the base will not be determined from the leading characters of the string if @var{base} is 0. This is so that numbers like @samp{0.23} are not interpreted as octal. Return the number of bytes read, or if an error occurred, return 0. @end deftypefun @c @deftypefun void mpf_out_raw (FILE *@var{stream}, mpf_t @var{float}) @c Output @var{float} on stdio stream @var{stream}, in raw binary @c format. The float is written in a portable format, with 4 bytes of @c size information, and that many bytes of limbs. Both the size and the @c limbs are written in decreasing significance order. @c @end deftypefun @c @deftypefun void mpf_inp_raw (mpf_t @var{float}, FILE *@var{stream}) @c Input from stdio stream @var{stream} in the format written by @c @code{mpf_out_raw}, and put the result in @var{float}. @c @end deftypefun @node Miscellaneous Float Functions, , I/O of Floats, Floating-point Functions @comment node-name, next, previous, up @section Miscellaneous Functions @cindex Miscellaneous float functions @deftypefun void mpf_ceil (mpf_t @var{rop}, mp_size_t @var{op}) @deftypefunx void mpf_floor (mpf_t @var{rop}, mp_size_t @var{op}) @deftypefunx void mpf_trunc (mpf_t @var{rop}, mp_size_t @var{op}) Set @var{rop} to @var{op} rounded to an integer. @code{mpf_ceil} rounds to the next higher integer, @code{mpf_floor} to the next lower, and @code{mpf_trunc} to the integer towards zero. @end deftypefun @deftypefun void mpf_urandomb (mpf_t @var{rop}, gmp_randstate_t @var{state}) Generate a universally distributed random float in the interval 0 <= X < 1. The variable @var{state} must be initialized by calling one of the @code{gmp_randinit} functions (@ref{Random State Initialization}) before invoking this function. @end deftypefun @deftypefun void mpf_random2 (mpf_t @var{rop}, mp_size_t @var{max_size}, mp_exp_t @var{max_exp}) Generate a random float of at most @var{max_size} limbs, with long strings of zeros and ones in the binary representation. The exponent of the number is in the interval @minus{}@var{exp} to @var{exp}. This function is useful for testing functions and algorithms, since this kind of random numbers have proven to be more likely to trigger corner-case bugs. Negative random numbers are generated when @var{max_size} is negative. @end deftypefun @c @deftypefun size_t mpf_size (mpf_t @var{op}) @c Return the size of @var{op} measured in number of limbs. If @var{op} is @c zero, the returned value will be zero. (@xref{Nomenclature}, for an @c explanation of the concept @dfn{limb}.) @c @c @strong{This function is obsolete. It will disappear from future GMP @c releases.} @c @end deftypefun @node Low-level Functions, Random Number Functions, Floating-point Functions, Top @comment node-name, next, previous, up @chapter Low-level Functions @cindex Low-level functions This chapter describes low-level GMP functions, used to implement the high-level GMP functions, but also intended for time-critical user code. These functions start with the prefix @code{mpn_}. @c 1. Some of these function clobber input operands. @c The @code{mpn} functions are designed to be as fast as possible, @strong{not} to provide a coherent calling interface. The different functions have somewhat similar interfaces, but there are variations that make them hard to use. These functions do as little as possible apart from the real multiple precision computation, so that no time is spent on things that not all callers need. A source operand is specified by a pointer to the least significant limb and a limb count. A destination operand is specified by just a pointer. It is the responsibility of the caller to ensure that the destination has enough space for storing the result. With this way of specifying operands, it is possible to perform computations on subranges of an argument, and store the result into a subrange of a destination. A common requirement for all functions is that each source area needs at least one limb. No size argument may be zero. Unless otherwise stated, in-place operations are allowed where source and destination are the same, but not where they only partly overlap. The @code{mpn} functions are the base for the implementation of the @code{mpz_}, @code{mpf_}, and @code{mpq_} functions. This example adds the number beginning at @var{s1p} and the number beginning at @var{s2p} and writes the sum at @var{destp}. All areas have @var{size} limbs. @example cy = mpn_add_n (destp, s1p, s2p, size) @end example @noindent In the notation used here, a source operand is identified by the pointer to the least significant limb, and the limb count in braces. For example, @{s1p, s1size@}. @deftypefun mp_limb_t mpn_add_n (mp_limb_t *@var{rp}, const mp_limb_t *@var{s1p}, const mp_limb_t *@var{s2p}, mp_size_t @var{size}) Add @{@var{s1p}, @var{size}@} and @{@var{s2p}, @var{size}@}, and write the @var{size} least significant limbs of the result to @var{rp}. Return carry, either 0 or 1. This is the lowest-level function for addition. It is the preferred function for addition, since it is written in assembly for most targets. For addition of a variable to itself (i.e., @var{s1p} equals @var{s2p}, use @code{mpn_lshift} with a count of 1 for optimal speed. @end deftypefun @deftypefun mp_limb_t mpn_add_1 (mp_limb_t *@var{rp}, const mp_limb_t *@var{s1p}, mp_size_t @var{size}, mp_limb_t @var{s2limb}) Add @{@var{s1p}, @var{size}@} and @var{s2limb}, and write the @var{size} least significant limbs of the result to @var{rp}. Return carry, either 0 or 1. @end deftypefun @deftypefun mp_limb_t mpn_add (mp_limb_t *@var{rp}, const mp_limb_t *@var{s1p}, mp_size_t @var{s1size}, const mp_limb_t *@var{s2p}, mp_size_t @var{s2size}) Add @{@var{s1p}, @var{s1size}@} and @{@var{s2p}, @var{s2size}@}, and write the @var{s1size} least significant limbs of the result to @var{rp}. Return carry, either 0 or 1. This function requires that @var{s1size} is greater than or equal to @var{s2size}. @end deftypefun @deftypefun mp_limb_t mpn_sub_n (mp_limb_t *@var{rp}, const mp_limb_t *@var{s1p}, const mp_limb_t *@var{s2p}, mp_size_t @var{size}) Subtract @{@var{s2p}, @var{s2size}@} from @{@var{s1p}, @var{size}@}, and write the @var{size} least significant limbs of the result to @var{rp}. Return borrow, either 0 or 1. This is the lowest-level function for subtraction. It is the preferred function for subtraction, since it is written in assembly for most targets. @end deftypefun @deftypefun mp_limb_t mpn_sub_1 (mp_limb_t *@var{rp}, const mp_limb_t *@var{s1p}, mp_size_t @var{size}, mp_limb_t @var{s2limb}) Subtract @var{s2limb} from @{@var{s1p}, @var{size}@}, and write the @var{size} least significant limbs of the result to @var{rp}. Return borrow, either 0 or 1. @end deftypefun @deftypefun mp_limb_t mpn_sub (mp_limb_t *@var{rp}, const mp_limb_t *@var{s1p}, mp_size_t @var{s1size}, const mp_limb_t *@var{s2p}, mp_size_t @var{s2size}) Subtract @{@var{s2p}, @var{s2size}@} from @{@var{s1p}, @var{s1size}@}, and write the @var{s1size} least significant limbs of the result to @var{rp}. Return borrow, either 0 or 1. This function requires that @var{s1size} is greater than or equal to @var{s2size}. @end deftypefun @deftypefun void mpn_mul_n (mp_limb_t *@var{rp}, const mp_limb_t *@var{s1p}, const mp_limb_t *@var{s2p}, mp_size_t @var{size}) Multiply @{@var{s1p}, @var{size}@} and @{@var{s2p}, @var{size}@}, and write the @strong{entire} result to @var{rp}. The destination has to have space for 2@var{size} limbs, even if the significant result might be one limb smaller. @end deftypefun @deftypefun mp_limb_t mpn_mul_1 (mp_limb_t *@var{rp}, const mp_limb_t *@var{s1p}, mp_size_t @var{size}, mp_limb_t @var{s2limb}) Multiply @{@var{s1p}, @var{size}@} and @var{s2limb}, and write the @var{size} least significant limbs of the product to @var{rp}. Return the most significant limb of the product. This is a low-level function that is a building block for general multiplication as well as other operations in GMP. It is written in assembly for most targets. Don't call this function if @var{s2limb} is a power of 2; use @code{mpn_lshift} with a count equal to the logarithm of @var{s2limb} instead, for optimal speed. @end deftypefun @deftypefun mp_limb_t mpn_addmul_1 (mp_limb_t *@var{rp}, const mp_limb_t *@var{s1p}, mp_size_t @var{size}, mp_limb_t @var{s2limb}) Multiply @{@var{s1p}, @var{size}@} and @var{s2limb}, and add the @var{size} least significant limbs of the product to @{@var{rp}, @var{size}@} and write the result to @var{rp}. Return the most significant limb of the product, plus carry-out from the addition. This is a low-level function that is a building block for general multiplication as well as other operations in GMP. It is written in assembly for most targets. @end deftypefun @deftypefun mp_limb_t mpn_submul_1 (mp_limb_t *@var{rp}, const mp_limb_t *@var{s1p}, mp_size_t @var{size}, mp_limb_t @var{s2limb}) Multiply @{@var{s1p}, @var{size}@} and @var{s2limb}, and subtract the @var{size} least significant limbs of the product from @{@var{rp}, @var{size}@} and write the result to @var{rp}. Return the most significant limb of the product, minus borrow-out from the subtraction. This is a low-level function that is a building block for general multiplication and division as well as other operations in GMP. It is written in assembly for most targets. @end deftypefun @deftypefun mp_limb_t mpn_mul (mp_limb_t *@var{rp}, const mp_limb_t *@var{s1p}, mp_size_t @var{s1size}, const mp_limb_t *@var{s2p}, mp_size_t @var{s2size}) Multiply @{@var{s1p}, @var{s1size}@} and @{@var{s2p}, @var{s2size}@}, and write the result to @var{rp}. Return the most significant limb of the result. The destination has to have space for @var{s1size} + @var{s2size} limbs, even if the result might be one limb smaller. This function requires that @var{s1size} is greater than or equal to @var{s2size}. The destination must be distinct from either input operands. @end deftypefun @deftypefun mp_limb_t mpn_divrem (mp_limb_t *@var{r1p}, mp_size_t @var{xsize}, mp_limb_t *@var{rs2p}, mp_size_t @var{rs2size}, const mp_limb_t *@var{s3p}, mp_size_t @var{s3size}) Divide @{@var{rs2p}, @var{rs2size}@} by @{@var{s3p}, @var{s3size}@}, and write the quotient at @var{r1p}, with the exception of the most significant limb, which is returned. The remainder replaces the dividend at @var{rs2p}; it will be @var{s3size} limbs long (i.e., as many limbs as the divisor). In addition to an integer quotient, @var{xsize} fraction limbs are developed, and stored after the integral limbs. For most usages, @var{xsize} will be zero. It is required that @var{rs2size} is greater than or equal to @var{s3size}. It is required that the most significant bit of the divisor is set. If the quotient is not needed, pass @var{rs2p} + @var{s3size} as @var{r1p}. Aside from that special case, no overlap between arguments is permitted. Return the most significant limb of the quotient, either 0 or 1. The area at @var{r1p} needs to be @var{rs2size} @minus{} @var{s3size} + @var{xsize} limbs large. @end deftypefun @deftypefun mp_limb_t mpn_divrem_1 (mp_limb_t *@var{r1p}, mp_size_t @var{xsize}, mp_limb_t *@var{s2p}, mp_size_t @var{s2size}, mp_limb_t @var{s3limb}) Divide @{@var{s2p}, @var{s2size}@} by @var{s3limb}, and write the quotient at @var{r1p}. Return the remainder. The integer quotient is written to @{@var{r1p}+@var{xsize}, @var{s2size}@} and in addition @var{xsize} fraction limbs are developed and written to @{@var{r1p}, @var{xsize}@}. Either or both @var{s2size} and @var{xsize} can be zero. For most usages, @var{xsize} will be zero. The areas at @var{r1p} and @var{s2p} have to be identical or completely separate, not partially overlapping. @end deftypefun @deftypefun mp_limb_t mpn_divmod (mp_limb_t *@var{r1p}, mp_limb_t *@var{rs2p}, mp_size_t @var{rs2size}, const mp_limb_t *@var{s3p}, mp_size_t @var{s3size}) @strong{This interface is obsolete. It will disappear from future releases. Use @code{mpn_divrem} in its stead.} @end deftypefun @deftypefun mp_limb_t mpn_divmod_1 (mp_limb_t *@var{r1p}, mp_limb_t *@var{s2p}, mp_size_t @var{s2size}, mp_limb_t @var{s3limb}) @strong{This interface is obsolete. It will disappear from future releases. Use @code{mpn_divrem_1} in its stead.} @end deftypefun @deftypefun mp_limb_t mpn_divexact_by3 (mp_limb_t *@var{rp}, mp_limb_t *@var{sp}, mp_size_t @var{size}) Divide @{@var{sp}, @var{size}@} by 3, expecting it to divide exactly, and writing the quotient to @{@var{rp}, @var{size}@}. If 3 divides exactly, the return value is zero and the quotient is correct. If not, the return value is non-zero and the quotient won't be anything useful. This routine uses a multiply-by-inverse and will be faster than @code{mpn_divrem_1} on CPUs with fast multiplication but slow division. @end deftypefun @deftypefun mp_limb_t mpn_mod_1 (mp_limb_t *@var{s1p}, mp_size_t @var{s1size}, mp_limb_t @var{s2limb}) Divide @{@var{s1p}, @var{s1size}@} by @var{s2limb}, and return the remainder. @var{s1size} can be zero. @end deftypefun @deftypefun mp_limb_t mpn_preinv_mod_1 (mp_limb_t *@var{s1p}, mp_size_t @var{s1size}, mp_limb_t @var{s2limb}, mp_limb_t @var{s3limb}) @strong{This interface is obsolete. It will disappear from future releases. Use @code{mpn_mod_1} in its stead.} @end deftypefun @deftypefun mp_limb_t mpn_bdivmod (mp_limb_t *@var{rp}, mp_limb_t *@var{s1p}, mp_size_t @var{s1size}, const mp_limb_t *@var{s2p}, mp_size_t @var{s2size}, unsigned long int @var{d}) The function puts the low [@var{d}/@var{BITS_PER_MP_LIMB}] limbs of @var{q} = @{@var{s1p}, @var{s1size}@}/@{@var{s2p}, @var{s2size}@} mod 2^@var{d} at @var{rp}, and returns the high @var{d} mod @var{BITS_PER_MP_LIMB} bits of @var{q}. @{@var{s1p}, @var{s1size}@} - @var{q} * @{@var{s2p}, @var{s2size}@} mod 2^(@var{s1size}*@var{BITS_PER_MP_LIMB}) is placed at @var{s1p}. Since the low [@var{d}/@var{BITS_PER_MP_LIMB}] limbs of this difference are zero, it is possible to overwrite the low limbs at @var{s1p} with this difference, provided @var{rp} <= @var{s1p}. This function requires that @var{s1size} * @var{BITS_PER_MP_LIMB} >= @var{D}, and that @{@var{s2p}, @var{s2size}@} is odd. @strong{This interface is preliminary. It might change incompatibly in future revisions.} @end deftypefun @deftypefun mp_limb_t mpn_lshift (mp_limb_t *@var{rp}, const mp_limb_t *@var{src_ptr}, mp_size_t @var{src_size}, unsigned long int @var{count}) Shift @{@var{src_ptr}, @var{src_size}@} @var{count} bits to the left, and write the @var{src_size} least significant limbs of the result to @var{rp}. @var{count} might be in the range 1 to n @minus{} 1, on an n-bit machine. The bits shifted out to the left are returned. Overlapping of the destination space and the source space is allowed in this function, provided @var{rp} >= @var{src_ptr}. This function is written in assembly for most targets. @end deftypefun @deftypefun mp_limp_t mpn_rshift (mp_limb_t *@var{rp}, const mp_limb_t *@var{src_ptr}, mp_size_t @var{src_size}, unsigned long int @var{count}) Shift @{@var{src_ptr}, @var{src_size}@} @var{count} bits to the right, and write the @var{src_size} most significant limbs of the result to @var{rp}. @var{count} might be in the range 1 to n @minus{} 1, on an n-bit machine. The bits shifted out to the right are returned. Overlapping of the destination space and the source space is allowed in this function, provided @var{rp} <= @var{src_ptr}. This function is written in assembly for most targets. @end deftypefun @deftypefun int mpn_cmp (const mp_limb_t *@var{s1p}, const mp_limb_t *@var{s2p}, mp_size_t @var{size}) Compare @{@var{s1p}, @var{size}@} and @{@var{s2p}, @var{size}@} and return a positive value if s1 > src2, 0 of they are equal, and a negative value if s1 < src2. @end deftypefun @deftypefun mp_size_t mpn_gcd (mp_limb_t *@var{rp}, mp_limb_t *@var{s1p}, mp_size_t @var{s1size}, mp_limb_t *@var{s2p}, mp_size_t @var{s2size}) Puts at @var{rp} the greatest common divisor of @{@var{s1p}, @var{s1size}@} and @{@var{s2p}, @var{s2size}@}; both source operands are destroyed by the operation. The size in limbs of the greatest common divisor is returned. @{@var{s1p}, @var{s1size}@} must have at least as many bits as @{@var{s2p}, @var{s2size}@}, and @{@var{s2p}, @var{s2size}@} must be odd. @end deftypefun @deftypefun mp_limb_t mpn_gcd_1 (const mp_limb_t *@var{s1p}, mp_size_t @var{s1size}, mp_limb_t @var{s2limb}) Return the greatest common divisor of @{@var{s1p}, @var{s1size}@} and @var{s2limb}, where @var{s2limb} (as well as @var{s1size}) must be different from 0. @end deftypefun @deftypefun mp_size_t mpn_gcdext (mp_limb_t *@var{r1p}, mp_limb_t *@var{r2p}, mp_size_t *@var{r2size}, mp_limb_t *@var{s1p}, mp_size_t @var{s1size}, mp_limb_t *@var{s2p}, mp_size_t @var{s2size}) Compute the greatest common divisor of @{@var{s1p}, @var{s1size}@} and @{@var{s2p}, @var{s2size}@}, and store it at @var{r1p}. Write the first cofactor at @var{r2p}. Both source operands are clobbered. @{@var{s1p}, @var{s1size}@} must be greater or equal to @{@var{s2p}, @var{s2size}@}. Neither operand may equal 0. The size and sign of the first cofactor are written at *@var{r2size}; the actual size of the cofactor is the absolute value of *@var{r2size}; the sign of the cofactor is negative iff *@var{r2size} is negative. The size in limbs of the greatest common divisor is returned. @end deftypefun @deftypefun mp_size_t mpn_sqrtrem (mp_limb_t *@var{r1p}, mp_limb_t *@var{r2p}, const mp_limb_t *@var{sp}, mp_size_t @var{size}) Compute the square root of @{@var{sp}, @var{size}@} and put the result at @var{r1p}. Write the remainder at @var{r2p}, unless @var{r2p} is NULL. Return the size of the remainder, whether @var{r2p} was NULL or non-NULL. Iff the operand was a perfect square, the return value will be 0. The areas at @var{r1p} and @var{sp} have to be distinct. The areas at @var{r2p} and @var{sp} have to be identical or completely separate, not partially overlapping. @ifinfo The area at @var{r1p} needs to have space for ceil(@var{size}/2) limbs. @end ifinfo @iftex @tex The area at @var{r1p} needs to have space for $\lceil@var{size}/2\rceil$ limbs. @end tex @end iftex The area at @var{r2p} needs to be @var{size} limbs large. @end deftypefun @deftypefun mp_size_t mpn_get_str (unsigned char *@var{str}, int @var{base}, mp_limb_t *@var{s1p}, mp_size_t @var{s1size}) Convert @{@var{s1p}, @var{s1size}@} to a raw unsigned char array in base @var{base}. The string is not in ASCII; to convert it to printable format, add the ASCII codes for @samp{0} or @samp{A}, depending on the base and range. There may be leading zeros in the string. The area at @var{s1p} is clobbered. Return the number of characters in @var{str}. The area at @var{str} has to have space for the largest possible number represented by a @var{s1size} long limb array, plus one extra character. @end deftypefun @deftypefun mp_size_t mpn_set_str (mp_limb_t *@var{r1p}, const char *@var{str}, size_t @var{strsize}, int @var{base}) Convert the raw unsigned char array at @var{str} of length @var{strsize} to a limb array @{@var{s1p}, @var{s1size}@}. The base of @var{str} is @var{base}. Return the number of limbs stored in @var{r1p}. @end deftypefun @deftypefun {unsigned long int} mpn_scan0 (const mp_limb_t *@var{s1p}, unsigned long int @var{bit}) Scan @var{s1p} from bit position @var{bit} for the next clear bit. It is required that there be a clear bit within the area at @var{s1p} at or beyond bit position @var{bit}, so that the function has something to return. @end deftypefun @deftypefun {unsigned long int} mpn_scan1 (const mp_limb_t *@var{s1p}, unsigned long int @var{bit}) Scan @var{s1p} from bit position @var{bit} for the next set bit. It is required that there be a set bit within the area at @var{s1p} at or beyond bit position @var{bit}, so that the function has something to return. @end deftypefun @deftypefun void mpn_random (mp_limb_t *@var{r1p}, mp_size_t @var{r1size}) @deftypefunx void mpn_random2 (mp_limb_t *@var{r1p}, mp_size_t @var{r1size}) Generate a random number of length @var{r1size} and store it at @var{r1p}. The most significant limb is always non-zero. @code{mpn_random} generates uniformly distributed limb data, @code{mpn_random2} generates long strings of zeros and ones in the binary representation. @code{mpn_random2} is intended for testing the correctness of the @code{mpn} routines. @end deftypefun @deftypefun {unsigned long int} mpn_popcount (const mp_limb_t *@var{s1p}, unsigned long int @var{size}) Count the number of set bits in @{@var{s1p}, @var{size}@}. @end deftypefun @deftypefun {unsigned long int} mpn_hamdist (const mp_limb_t *@var{s1p}, const mp_limb_t *@var{s2p}, unsigned long int @var{size}) Compute the hamming distance between @{@var{s1p}, @var{size}@} and @{@var{s2p}, @var{size}@}. @end deftypefun @deftypefun int mpn_perfect_square_p (const mp_limb_t *@var{s1p}, mp_size_t @var{size}) Return non-zero iff @{@var{s1p}, @var{size}@} is a perfect square. @end deftypefun @node Random Number Functions, BSD Compatible Functions, Low-level Functions, Top @chapter Random Number Functions @cindex Random Number Functions There are two groups of random number functions in GNU MP; older functions that call C library random number generators, rely on a global state, and aren't very random; and newer functions that don't have these problems. The newer functions are self-contained, they accept a random state parameter that supplants global state, and generate good random numbers. The random state parameter is of the type @code{gmp_randstate_t}. It must be initialized by a call to one of the @code{gmp_randinit} functions (@ref{Random State Initialization}). The initial seed is set using one of the @code{gmp_randseed} functions (@ref{Random State Initialization}). The size of the seed determines the number of different sequences of random numbers that is possible to generate. The ``quality'' of the seed is the randomness of a given seed compared to the previous seed used and affects the randomness of separate number sequences. The algorithm for assigning seed is critical if the generated random numbers are to be used for important applications, such as generating cryptographic keys. The traditional method is to use the current system time for seeding. One has to be careful when using the current time though. If the application seeds the random functions very often, say several times per second, and the resolution of the system clock is comparatively low, like one second, the same sequence of numbers will be generated until the system clock ticks. Furthermore, the current system time is quite easy to guess, so a system depending on any unpredictability of the random number sequence should absolutely not use that as its only source for a seed value. On some systems there is a special device, often called @code{/dev/random}, which provides a source of somewhat random numbers more usable as seed. The functions actually generating random functions are documented under ``Miscellaneous Functions'' in their respective function class: @ref{Miscellaneous Integer Functions}, @ref{Miscellaneous Float Functions}. @menu * Random State Initialization:: How to initialize a random state. @end menu @node Random State Initialization, , Random Number Functions, Random Number Functions @section Random State Initialization See @ref{Random Number Functions} for a discussion on how to choose the initial seed value passed to these functions. @deftypefun int gmp_randinit (gmp_randstate_t @var{state}, unsigned long int @var{size}, gmp_randalg_t @var{alg}) Initialize random state variable @var{state}. @var{alg} denotes what algorithm to use for random number generation. Use one of @itemize @minus @item GMP_RAND_ALG_LC --- Linear congruential. A fast generator defined by @math{X = (aX + c) mod m}. a, c, and m are picked from a table where the modulus (m) is a power of 2 and the multiplier is congruent to 5 (mod 8). All schemes in the table have passed the spectral test, as defined by [D. Knuth, "The Art of Computer Programming: Volume 2, Seminumerical Algorithms", Third Edition, Addison Wesley, 1998, p.93.]. The choice is based on the @var{size} parameter. The maximum @var{size} supported by this algorithm is 128. If you need bigger random numbers, use your own scheme and call one of the other @code{gmp_randinit} functions. @ignore @item GMP_RAND_ALG_BBS --- Blum, Blum, and Shub. @end ignore @end itemize If @var{alg} is 0 or GMP_RAND_ALG_DEFAULT, the default algorithm is used. The default algorithm is typically a fast algorithm like the linear congruential. @var{size} is the size of the largest good quality random number to be generated, expressed in number of bits. If the random generation functions are asked for a bigger random number than indicated by this parameter, two or more numbers of @var{size} bits will be generated and concatenated, resulting in a ``bad'' random number. This can be used to generate big random numbers relatively cheap if the quality of randomness isn't of great importance. When you're done with a @var{state} variable, call @code{gmp_randclear} to deallocate any memory allocated by this function. @code{gmp_randinit} may set the following bits in @var{gmp_errno}: @c FIXME: gmp_errno is printed in uppercase. That's wrong. @itemize @item GMP_ERROR_UNSUPPORTED_ARGUMENT --- @var{alg} is unsupported @item GMP_ERROR_INVALID_ARGUMENT --- @var{size} is too big @end itemize @end deftypefun @ignore @deftypefun void gmp_randinit_lc (gmp_randstate_t @var{state}, mpz_t @var{a}, unsigned long int @var{c}, mpz_t @var{m}) Initialize random state variable @var{state} with given linear congruential scheme. Parameters @var{a}, @var{c}, and @var{m} are the multiplier, adder, and modulus for the linear congruential scheme to use, respectively. When you're done with a @var{state} variable, call @code{gmp_randclear} to deallocate any memory allocated by this function. @end deftypefun @end ignore @deftypefun void gmp_randinit_lc_2exp (gmp_randstate_t @var{state}, mpz_t @var{a}, unsigned long int @var{c}, unsigned long int @var{m2exp}) Initialize random state variable @var{state} with given linear congruential scheme. Parameters @var{a}, @var{c}, and @var{m2exp} are the multiplier, adder, and modulus for the linear congruential scheme to use, respectively. The modulus is expressed as a power of 2, so that @ifinfo @var{m} = 2^@var{m2exp}. @end ifinfo @iftex @tex $m = 2^{m2exp}$. @end tex @end iftex The least significant bits of a random number generated by the linear congruential algorithm where the modulus is a power of two are not very random. Therefore, the lower half of a random number generated by an LC scheme initialized with this function is discarded. Thus, the size of a random number is @var{m2exp} / 2 (rounded upwards) bits when this function has been used for initializing the random state. When you're done with a @var{state} variable, call @code{gmp_randclear} to deallocate any memory allocated by this function. @end deftypefun @deftypefun void gmp_randseed (gmp_randstate_t @var{state}, mpz_t @var{seed}) @deftypefunx void gmp_randseed_ui (gmp_randstate_t @var{state}, unsigned long int @var{seed}) Set the initial seed value. Parameter @var{seed} is the initial random seed. The function @code{gmp_randseed_ui} takes the @var{seed} as an unsigned long int rather than as an mpz_t. @end deftypefun @deftypefun void gmp_randclear (gmp_randstate_t @var{state}) Free all memory occupied by @var{state}. Make sure to call this function for all @code{gmp_randstate_t} variables when you are done with them. @end deftypefun @node BSD Compatible Functions, Custom Allocation, Random Number Functions, Top @comment node-name, next, previous, up @chapter Berkeley MP Compatible Functions @cindex BSD MP compatible functions These functions are intended to be fully compatible with the Berkeley MP library which is available on many BSD derived U*ix systems. The @samp{--enable-mpbsd} option must be used when building GNU MP to make these available (@pxref{Installing GMP}). The original Berkeley MP library has a usage restriction: you cannot use the same variable as both source and destination in a single function call. The compatible functions in GNU MP do not share this restriction---inputs and outputs may overlap. It is not recommended that new programs are written using these functions. Apart from the incomplete set of functions, the interface for initializing @code{MINT} objects is more error prone, and the @code{pow} function collides with @code{pow} in @file{libm.a}. @cindex @file{mp.h} Include the header @file{mp.h} to get the definition of the necessary types and functions. If you are on a BSD derived system, make sure to include GNU @file{mp.h} if you are going to link the GNU @file{libmp.a} to your program. This means that you probably need to give the -I option to the compiler, where is the directory where you have GNU @file{mp.h}. @deftypefun {MINT *} itom (signed short int @var{initial_value}) Allocate an integer consisting of a @code{MINT} object and dynamic limb space. Initialize the integer to @var{initial_value}. Return a pointer to the @code{MINT} object. @end deftypefun @deftypefun {MINT *} xtom (char *@var{initial_value}) Allocate an integer consisting of a @code{MINT} object and dynamic limb space. Initialize the integer from @var{initial_value}, a hexadecimal, '\0'-terminate C string. Return a pointer to the @code{MINT} object. @end deftypefun @deftypefun void move (MINT *@var{src}, MINT *@var{dest}) Set @var{dest} to @var{src} by copying. Both variables must be previously initialized. @end deftypefun @deftypefun void madd (MINT *@var{src_1}, MINT *@var{src_2}, MINT *@var{destination}) Add @var{src_1} and @var{src_2} and put the sum in @var{destination}. @end deftypefun @deftypefun void msub (MINT *@var{src_1}, MINT *@var{src_2}, MINT *@var{destination}) Subtract @var{src_2} from @var{src_1} and put the difference in @var{destination}. @end deftypefun @deftypefun void mult (MINT *@var{src_1}, MINT *@var{src_2}, MINT *@var{destination}) Multiply @var{src_1} and @var{src_2} and put the product in @var{destination}. @end deftypefun @deftypefun void mdiv (MINT *@var{dividend}, MINT *@var{divisor}, MINT *@var{quotient}, MINT *@var{remainder}) @deftypefunx void sdiv (MINT *@var{dividend}, signed short int @var{divisor}, MINT *@var{quotient}, signed short int *@var{remainder}) Set @var{quotient} to @var{dividend}/@var{divisor}, and @var{remainder} to @var{dividend} mod @var{divisor}. The quotient is rounded towards zero; the remainder has the same sign as the dividend unless it is zero. Some implementations of these functions work differently---or not at all---for negative arguments. @end deftypefun @deftypefun void msqrt (MINT *@var{operand}, MINT *@var{root}, MINT *@var{remainder}) @ifinfo Set @var{root} to the truncated integer part of the square root of @var{operand}. Set @var{remainder} to @var{operand}@minus{}@var{root}*@var{root}, @end ifinfo @iftex @tex Set @var{root} to $\lfloor\sqrt{@var{operand}}\rfloor$, like @code{mpz_sqrt}. Set @var{remainder} to $(operand - root^2)$, @end tex @end iftex (i.e., zero if @var{operand} is a perfect square). If @var{root} and @var{remainder} are the same variable, the results are undefined. @end deftypefun @deftypefun void pow (MINT *@var{base}, MINT *@var{exp}, MINT *@var{mod}, MINT *@var{dest}) Set @var{dest} to (@var{base} raised to @var{exp}) modulo @var{mod}. @end deftypefun @deftypefun void rpow (MINT *@var{base}, signed short int @var{exp}, MINT *@var{dest}) Set @var{dest} to @var{base} raised to @var{exp}. @end deftypefun @deftypefun void gcd (MINT *@var{operand1}, MINT *@var{operand2}, MINT *@var{res}) Set @var{res} to the greatest common divisor of @var{operand1} and @var{operand2}. @end deftypefun @deftypefun int mcmp (MINT *@var{operand1}, MINT *@var{operand2}) Compare @var{operand1} and @var{operand2}. Return a positive value if @var{operand1} > @var{operand2}, zero if @var{operand1} = @var{operand2}, and a negative value if @var{operand1} < @var{operand2}. @end deftypefun @deftypefun void min (MINT *@var{dest}) Input a decimal string from @code{stdin}, and put the read integer in @var{dest}. SPC and TAB are allowed in the number string, and are ignored. @end deftypefun @deftypefun void mout (MINT *@var{src}) Output @var{src} to @code{stdout}, as a decimal string. Also output a newline. @end deftypefun @deftypefun {char *} mtox (MINT *@var{operand}) Convert @var{operand} to a hexadecimal string, and return a pointer to the string. The returned string is allocated using the default memory allocation function, @code{malloc} by default. @end deftypefun @deftypefun void mfree (MINT *@var{operand}) De-allocate, the space used by @var{operand}. @strong{This function should only be passed a value returned by @code{itom} or @code{xtom}.} @end deftypefun @node Custom Allocation, Contributors, BSD Compatible Functions, Top @comment node-name, next, previous, up @chapter Custom Allocation By default, the GMP functions use @code{malloc}, @code{realloc}, and @code{free} for memory allocation. If @code{malloc} or @code{realloc} fails, the GMP library terminates execution after printing a fatal error message to standard error. For some applications, you may wish to allocate memory in other ways, or you may not want to have a fatal error when there is no more memory available. To accomplish this, you can specify alternative memory allocation functions. @deftypefun void mp_set_memory_functions (@* void *(*@var{alloc_func_ptr}) (size_t), @* void *(*@var{realloc_func_ptr}) (void *, size_t, size_t), @* void (*@var{free_func_ptr}) (void *, size_t)) Replace the current allocation functions from the arguments. If an argument is NULL, the corresponding default function is retained. @strong{Make sure to call this function in such a way that there are no active GMP objects that were allocated using the previously active allocation function! Usually, that means that you have to call this function before any other GMP function.} @end deftypefun The functions you supply should fit the following declarations: @deftypefun {void *} allocate_function (size_t @var{alloc_size}) This function should return a pointer to newly allocated space with at least @var{alloc_size} storage units. @end deftypefun @deftypefun {void *} reallocate_function (void *@var{ptr}, size_t @var{old_size}, size_t @var{new_size}) This function should return a pointer to newly allocated space of at least @var{new_size} storage units, after copying at least the first @var{old_size} storage units from @var{ptr}. It should also de-allocate the space at @var{ptr}. You can assume that the space at @var{ptr} was formerly returned from @code{allocate_function} or @code{reallocate_function}, for a request for @var{old_size} storage units. @end deftypefun @deftypefun void deallocate_function (void *@var{ptr}, size_t @var{size}) De-allocate the space pointed to by @var{ptr}. You can assume that the space at @var{ptr} was formerly returned from @code{allocate_function} or @code{reallocate_function}, for a request for @var{size} storage units. @end deftypefun (A @dfn{storage unit} is the unit in which the @code{sizeof} operator returns the size of an object, normally an 8 bit byte.) @node Contributors, References, Custom Allocation, Top @comment node-name, next, previous, up @unnumbered Contributors Torbjorn Granlund wrote the original GMP library and is still developing and maintaining it. Several other individuals and organizations have contributed to GMP in various ways. Here is a list in chronological order: Gunnar Sjoedin and Hans Riesel helped with mathematical problems in early versions of the library. Richard Stallman contributed to the interface design and revised the first version of this manual. Brian Beuning and Doug Lea helped with testing of early versions of the library and made creative suggestions. John Amanatides of York University in Canada contributed the function @code{mpz_probab_prime_p}. Paul Zimmermann of Inria sparked the development of GMP 2, with his comparisons between bignum packages. Ken Weber (Kent State University, Universidade Federal do Rio Grande do Sul) contributed @code{mpz_gcd}, @code{mpz_divexact}, @code{mpn_gcd}, and @code{mpn_bdivmod}, partially supported by CNPq (Brazil) grant 301314194-2. Per Bothner of Cygnus Support helped to set up GMP to use Cygnus' configure. He has also made valuable suggestions and tested numerous intermediary releases. Joachim Hollman was involved in the design of the @code{mpf} interface, and in the @code{mpz} design revisions for version 2. Bennet Yee contributed the functions @code{mpz_jacobi} and @code{mpz_legendre}. Andreas Schwab contributed the files @file{mpn/m68k/lshift.S} and @file{mpn/m68k/rshift.S}. The development of floating point functions of GNU MP 2, were supported in part by the ESPRIT-BRA (Basic Research Activities) 6846 project POSSO (POlynomial System SOlving). GNU MP 2 was finished and released by SWOX AB (formerly known as TMG Datakonsult), Swedenborgsgatan 23, SE-118 27 STOCKHOLM, SWEDEN, in cooperation with the IDA Center for Computing Sciences, USA. Robert Harley of Inria, France and David Seal of ARM, England, suggested clever improvements for population count. Robert Harley also wrote highly optimized Karatsuba and 3-way Toom multiplication functions for GMP 3. Torsten Ekedahl of the Mathematical department of Stockholm University provided significant inspiration during several phases of the GMP development. His mathematical expertise helped improve several algorithms. Paul Zimmermann wrote the Burnikel-Ziegler division code, the REDC code, and the new mpz_powm code that uses Hensel lifting. The ECMNET project Paul is organizing has been a driving force behind many of the optimization of GMP 3. Linus Nordberg wrote the new configure system based on autoconf and implemented the new random functions. Kent Boortz made the Macintosh port. Kevin Ryde wrote a lot of very high quality x86 code, optimized for most CPU variants. He also made countless other valuable contributions. GNU MP 3 was finished and released by Torbjorn Granlund and Linus Nordberg of SWOX AB, and volunteer Kevin Ryde. The work was partially funded by the IDA Center for Computing Sciences, USA. (This list is chronological, not ordered after significance. If you have contributed to GMP but are not listed above, please tell @email{tege@@swox.com} about the omission!) @node References, , Contributors, Top @comment node-name, next, previous, up @unnumbered References @itemize @bullet @item Donald E. Knuth, "The Art of Computer Programming", vol 2, "Seminumerical Algorithms", 3rd edition, Addison-Wesley, 1988. @item John D. Lipson, "Elements of Algebra and Algebraic Computing", The Benjamin Cummings Publishing Company Inc, 1981. @item Richard M. Stallman, "Using and Porting GCC", Free Software Foundation, 1999, @uref{ftp://ftp.gnu.org/pub/gnu/gcc/}. @item Peter L. Montgomery, "Modular Multiplication Without Trial Division", in Mathematics of Computation, volume 44, number 170, April 1985. @item Torbjorn Granlund and Peter L. Montgomery, "Division by Invariant Integers using Multiplication", in Proceedings of the SIGPLAN PLDI'94 Conference, June 1994. @item Tudor Jebelean, "An algorithm for exact division", Journal of Symbolic Computation, v. 15, 1993, pp. 169-180. @item Kenneth Weber, "The accelerated integer GCD algorithm", ACM Transactions on Mathematical Software, v. 21 (March), 1995, pp. 111-122. @item Christoph Burnikel and Joachim Ziegler, "Fast Recursive Division", Max-Planck-Institut fuer Informatik Research Report MPI-I-98-1-022, @uref{http://www.mpi-sb.mpg.de/~ziegler/TechRep.ps.gz}. @end itemize @node Concept Index, , , Top @comment node-name, next, previous, up @unnumbered Concept Index @printindex cp @node Function Index, , , Top @comment node-name, next, previous, up @unnumbered Function and Type Index @printindex fn @contents @bye @c Local variables: @c fill-column: 78 @c End: