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\documentclass[synpaper]{book}
\usepackage{hyperref}
\usepackage{makeidx}
\usepackage{amssymb}
\usepackage{color}
\usepackage{alltt}
\usepackage{graphicx}
\usepackage{layout}
\usepackage{appendix}
\def\union{\cup}
\def\intersect{\cap}
\def\getsrandom{\stackrel{\rm R}{\gets}}
\def\cross{\times}
\def\cat{\hspace{0.5em} \| \hspace{0.5em}}
\def\catn{$\|$}
\def\divides{\hspace{0.3em} | \hspace{0.3em}}
\def\nequiv{\not\equiv}
\def\approx{\raisebox{0.2ex}{\mbox{\small $\sim$}}}
\def\lcm{{\rm lcm}}
\def\gcd{{\rm gcd}}
\def\log{{\rm log}}
\def\ord{{\rm ord}}
\def\abs{{\mathit abs}}
\def\rep{{\mathit rep}}
\def\mod{{\mathit\ mod\ }}
\renewcommand{\pmod}[1]{\ ({\rm mod\ }{#1})}
\newcommand{\floor}[1]{\left\lfloor{#1}\right\rfloor}
\newcommand{\ceil}[1]{\left\lceil{#1}\right\rceil}
\def\Or{{\rm\ or\ }}
\def\And{{\rm\ and\ }}
\def\iff{\hspace{1em}\Longleftrightarrow\hspace{1em}}
\def\implies{\Rightarrow}
\def\undefined{{\rm ``undefined"}}
\def\Proof{\vspace{1ex}\noindent {\bf Proof:}\hspace{1em}}
\let\oldphi\phi
\def\phi{\varphi}
\def\Pr{{\rm Pr}}
\newcommand{\str}[1]{{\mathbf{#1}}}
\def\F{{\mathbb F}}
\def\N{{\mathbb N}}
\def\Z{{\mathbb Z}}
\def\R{{\mathbb R}}
\def\C{{\mathbb C}}
\def\Q{{\mathbb Q}}
\definecolor{DGray}{gray}{0.5}
\newcommand{\emailaddr}[1]{\mbox{$<${#1}$>$}}
\def\twiddle{\raisebox{0.3ex}{\mbox{\tiny $\sim$}}}
\def\gap{\vspace{0.5ex}}
\makeindex
\begin{document}
\frontmatter
\pagestyle{empty}
\title{LibTomMath User Manual \\ v1.2.1}
\author{LibTom Projects \\ www.libtom.net}
\maketitle
This text, the library and the accompanying textbook are all hereby placed in the public domain.
This book has been
formatted for B5 [176x250] paper using the \LaTeX{} {\em book} macro package.
\vspace{10cm}
\begin{flushright}Open Source. Open Academia. Open Minds.
\mbox{ }
LibTom Projects
\& originally
Tom St Denis,
Ontario, Canada
\end{flushright}
\tableofcontents
\listoffigures
\mainmatter
\pagestyle{headings}
\chapter{Introduction}
\section{What is LibTomMath?}
LibTomMath is a library of source code which provides a series of efficient and carefully written
functions for manipulating large integer numbers. It was written in portable ISO C source code so
that it will build on any platform with a conforming C compiler.
In a nutshell the library was written from scratch with verbose comments to help instruct computer
science students how to implement ``bignum'' math. However, the resulting code has proven to be
very useful. It has been used by numerous universities, commercial and open source software
developers. It has been used on a variety of platforms ranging from Linux and Windows based x86 to
ARM based Gameboys and PPC based MacOS machines.
\section{License}
As of the v0.25 the library source code has been placed in the public domain with every new
release. As of the v0.28 release the textbook ``Implementing Multiple Precision Arithmetic'' has
been placed in the public domain with every new release as well. This textbook is meant to
compliment the project by providing a more solid walkthrough of the development algorithms used in
the library.
Since both\footnote{Note that the MPI files under \texttt{mtest/} are copyrighted by Michael
Fromberger. They are not required to use LibTomMath.} are in the public domain everyone is
entitled
to do with them as they see fit.
\section{Building LibTomMath}
LibTomMath is meant to be very ``GCC friendly'' as it comes with a makefile well suited for GCC.
However, the library will also build in MSVC, Borland C out of the box. For any other ISO C
compiler a makefile will have to be made by the end
developer. Please consider to commit such a makefile to the LibTomMath developers, currently
residing at
\url{http://github.com/libtom/libtommath}, if successfully done so.
Intel's C-compiler (ICC) is sufficiently compatible with GCC, at least the newer versions, to
replace GCC for building the static and the shared library. Editing the makefiles is not needed,
just set the shell variable \texttt{CC} as shown below.
\begin{alltt}
CC=/home/czurnieden/intel/bin/icc make
\end{alltt}
ICC does not know all options available for GCC and LibTomMath uses two diagnostics
\texttt{-Wbad-function-cast} and \texttt{-Wcast-align} that are not supported by ICC resulting in
the warnings:
\begin{alltt}
icc: command line warning #10148: option '-Wbad-function-cast' not supported
icc: command line warning #10148: option '-Wcast-align' not supported
\end{alltt}
It is possible to mute this ICC warning with the compiler flag
\texttt{-diag-disable=10148}\footnote{It is not recommended to suppress warnings without a very
good reason but there is no harm in doing so in this very special case.}.
\subsection{Static Libraries}
To build as a static library for GCC issue the following
\begin{alltt}
make
\end{alltt}
command. This will build the library and archive the object files in ``libtommath.a''. Now you
link against that and include ``tommath.h'' within your programs. Alternatively to build with MSVC
issue the following
\begin{alltt}
nmake -f makefile.msvc
\end{alltt}
This will build the library and archive the object files in ``tommath.lib''. This has been tested
with MSVC version 6.00 with service pack 5.
To run a program to adapt the Toom--Cook cut--off values to your architecture type
\begin{alltt}
make tune
\end{alltt}
This will take some time.
\subsection{Shared Libraries}
\subsubsection{GNU based Operating Systems}
To build as a shared library for GCC issue the following
\begin{alltt}
make -f makefile.shared
\end{alltt}
This requires the ``libtool'' package (common on most Linux/BSD systems). It will build LibTomMath
as both shared and static then install (by default) into /usr/lib as well as install the header
files in \texttt{/usr/include}. The shared library (resource) will be called
\texttt{libtommath.la} while the static library called \texttt{libtommath.a}. Generally you use
libtool to link your application against the shared object.
To run a program to adapt the Toom--Cook cut--off values to your architecture type
\begin{alltt}
make -f makefile.shared tune
\end{alltt}
This will take some time.
\subsubsection{Microsoft Windows based Operating Systems}
There is limited support for making a ``DLL'' in windows via the \texttt{makefile.cygwin\_dll}
makefile. It requires Cygwin to work with since it requires the auto-export/import functionality.
The resulting DLL and import library \texttt{libtommath.dll.a} can be used to link LibTomMath
dynamically to any Windows program using Cygwin.
\subsubsection{OpenBSD}
OpenBSD replaced some of their GNU-tools, especially \texttt{libtool} with their own, slightly
different versions. To ease the workload of LibTomMath's developer team, only a static library can
be build with the included \texttt{makefile.unix}.
The wrong \texttt{make} will result in errors like:
\begin{alltt}
*** Parse error in /home/user/GITHUB/libtommath: Need an operator in 'LIBNAME' )
*** Parse error: Need an operator in 'endif' (makefile.shared:8)
*** Parse error: Need an operator in 'CROSS_COMPILE' (makefile_include.mk:16)
*** Parse error: Need an operator in 'endif' (makefile_include.mk:18)
*** Parse error: Missing dependency operator (makefile_include.mk:22)
*** Parse error: Missing dependency operator (makefile_include.mk:23)
...
\end{alltt}
The wrong \texttt{libtool} will build it all fine but when it comes to the final linking fails with
\begin{alltt}
...
cc -I./ -Wall -Wsign-compare -Wextra -Wshadow -Wsystem-headers -Wdeclaration-afo...
cc -I./ -Wall -Wsign-compare -Wextra -Wshadow -Wsystem-headers -Wdeclaration-afo...
cc -I./ -Wall -Wsign-compare -Wextra -Wshadow -Wsystem-headers -Wdeclaration-afo...
libtool --mode=link --tag=CC cc error.lo s_mp_invmod_fast.lo fast_mp_mo
libtool: link: cc error.lo s_mp_invmod_fast.lo s_mp_montgomery_reduce_fast0
error.lo: file not recognized: File format not recognized
cc: error: linker command failed with exit code 1 (use -v to see invocation)
Error while executing cc error.lo s_mp_invmod_fast.lo fast_mp_montgomery0
gmake: *** [makefile.shared:64: libtommath.la] Error 1
\end{alltt}
To build a shared library with OpenBSD\footnote{Tested with OpenBSD version 6.4} the GNU versions
of \texttt{make} and \texttt{libtool} are needed.
\begin{alltt}
$ sudo pkg_add gmake libtool
\end{alltt}
At this time two versions of \texttt{libtool} are installed and both are named \texttt{libtool},
unfortunately but GNU \texttt{libtool} has been placed in \texttt{/usr/local/bin/} and the native
version in \texttt{/usr/bin/}. The path might be different in other versions of OpenBSD but both
programs differ in the output of \texttt{libtool --version}
\begin{alltt}
$ /usr/local/bin/libtool --version
libtool (GNU libtool) 2.4.2
Written by Gordon Matzigkeit <gord@gnu.ai.mit.edu>, 1996
Copyright (C) 2011 Free Software Foundation, Inc.
This is free software; see the source for copying conditions. There is NO
warranty; not even for MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE.
$ libtool --version
libtool (not (GNU libtool)) 1.5.26
\end{alltt}
The shared library should build now with
\begin{alltt}
LIBTOOL="/usr/local/bin/libtool" gmake -f makefile.shared
\end{alltt}
You might need to run a \texttt{gmake -f makefile.shared clean} first.
\subsubsection{NetBSD}
NetBSD is not as strict as OpenBSD but still needs \texttt{gmake} to build the shared library.
\texttt{libtool} may also not exist in a fresh install.
\begin{alltt}
pkg_add gmake libtool
\end{alltt}
Please check with \texttt{libtool --version} that installed libtool is indeed a GNU libtool.
Build the shared library by typing:
\begin{alltt}
gmake -f makefile.shared
\end{alltt}
\subsection{Testing}
To build the library and the test harness type
\begin{alltt}
make test
\end{alltt}
This will build the library, \texttt{test} and \texttt{mtest/mtest}. The \texttt{test} program
will accept test vectors and verify the results. \texttt{mtest/mtest} will generate test vectors
using the MPI library by Michael Fromberger\footnote{A copy of MPI is included in the package}.
Simply pipe \texttt{mtest} into \texttt{test} using
\begin{alltt}
mtest/mtest | test
\end{alltt}
If you do not have a \texttt{/dev/urandom} style RNG source you will have to write your own PRNG
and simply pipe that into \texttt{mtest}. For example, if your PRNG program is called
\texttt{myprng} simply invoke
\begin{alltt}
myprng | mtest/mtest | test
\end{alltt}
This will output a row of numbers that are increasing. Each column is a different test (such as
addition, multiplication, etc) that is being performed. The numbers represent how many times the
test was invoked. If an error is detected the program will exit with a dump of the relevant
numbers it was working with.
\section{Build Configuration}
LibTomMath can configured at build time in two phases we shall call ``depends'' and
``trims''. Each phase changes how the library is built and they are applied one after another
respectively.
To make the system more powerful you can tweak the build process. Classes are defined in the file
\texttt{tommath\_superclass.h}. By default, the symbol \texttt{LTM\_ALL} shall be defined which
simply instructs the system to build all of the functions. This is how LibTomMath used to be
packaged. This will give you access to every function LibTomMath offers.
However, there are cases where such a build is not optional. For instance, you want to perform RSA
operations. You don't need the vast majority of the library to perform these operations. Aside
from \texttt{LTM\_ALL} there is another pre--defined class \texttt{SC\_RSA\_1} which works in
conjunction with the RSA from LibTomCrypt. Additional classes can be defined base on the need of
the user.
\subsection{Build Depends}
In the file \texttt{tommath\_class.h} you will see a large list of C ``defines'' followed by a
series of ``ifdefs'' which further define symbols. All of the symbols (technically they're macros
$\ldots$) represent a given C source file. For instance, \texttt{MP\_ADD\_C} represents the file
\texttt{mp\_add.c}. When a define has been enabled the function in the respective file will be
compiled and linked into the library. Accordingly when the define is absent the file will not be
compiled and not contribute any size to the library.
You will also note that the header \texttt{tommath\_class.h} is actually recursively included (it
includes itself twice). This is to help resolve as many dependencies as possible. In the last pass
the symbol \texttt{LTM\_LAST} will be defined. This is useful for ``trims''.
Note that the configuration system relies
on dead code elimination. Unfortunately this can result in linking errors on compilers which
perform insufficient dead code elimination. In particular MSVC with the /Od option enabled shows this issue.
The issue can be resolved by passing the /O option instead to the compiler.
\subsection{Build Trims}
A trim is a manner of removing functionality from a function that is not required. For instance,
to perform RSA cryptography you only require exponentiation with odd moduli so even moduli support
can be safely removed. Build trims are meant to be defined on the last pass of the configuration
which means they are to be defined only if \texttt{LTM\_LAST} has been defined.
\subsubsection{Moduli Related}
\begin{small}
\begin{center}
\begin{tabular}{|l|l|}
\hline \textbf{Restriction} & \textbf{Undefine} \\
\hline Exponentiation with odd moduli only & S\_MP\_EXPTMOD\_C \\
& MP\_REDUCE\_C \\
& MP\_REDUCE\_SETUP\_C \\
& S\_MP\_MUL\_HIGH\_DIGS\_C \\
& FAST\_S\_MP\_MUL\_HIGH\_DIGS\_C \\
\hline Exponentiation with random odd moduli & (The above plus the following) \\
& MP\_REDUCE\_2K\_C \\
& MP\_REDUCE\_2K\_SETUP\_C \\
& MP\_REDUCE\_IS\_2K\_C \\
& MP\_DR\_IS\_MODULUS\_C \\
& MP\_DR\_REDUCE\_C \\
& MP\_DR\_SETUP\_C \\
\hline Modular inverse odd moduli only & MP\_INVMOD\_SLOW\_C \\
\hline Modular inverse (both, smaller/slower) & FAST\_MP\_INVMOD\_C \\
\hline
\end{tabular}
\end{center}
\end{small}
\subsubsection{Operand Size Related}
\begin{small}
\begin{center}
\begin{tabular}{|l|l|}
\hline \textbf{Restriction} & \textbf{Undefine} \\
\hline Moduli $\le 2560$ bits & MP\_MONTGOMERY\_REDUCE\_C \\
& S\_MP\_MUL\_DIGS\_C \\
& S\_MP\_MUL\_HIGH\_DIGS\_C \\
& S\_MP\_SQR\_C \\
\hline Polynomial Schmolynomial & MP\_KARATSUBA\_MUL\_C \\
& MP\_KARATSUBA\_SQR\_C \\
& MP\_TOOM\_MUL\_C \\
& MP\_TOOM\_SQR\_C \\
\hline
\end{tabular}
\end{center}
\end{small}
\section{Purpose of LibTomMath}
Unlike GNU MP (GMP) Library, LIP, OpenSSL or various other commercial kits (Miracl), LibTomMath
was not written with bleeding edge performance in mind. First and foremost LibTomMath was written
to be entirely open. Not only is the source code public domain (unlike various other GPL/etc
licensed code), not only is the code freely downloadable but the source code is also accessible for
computer science students attempting to learn ``BigNum'' or multiple precision arithmetic
techniques.
LibTomMath was written to be an instructive collection of source code. This is why there are many
comments, only one function per source file and often I use a ``middle-road'' approach where I
don't cut corners for an extra 2\% speed increase.
Source code alone cannot really teach how the algorithms work which is why I also wrote a textbook
that accompanies the library (beat that!).
So you may be thinking ``should I use LibTomMath?'' and the answer is a definite maybe. Let me
tabulate what I think are the pros and cons of LibTomMath by comparing it to the math routines from
GnuPG\footnote{GnuPG v1.2.3 versus LibTomMath v0.28}.
\newpage\begin{figure}[h]
\begin{small}
\begin{center}
\begin{tabular}{|p{4.5cm}|c|c|p{4.5cm}|}
\hline \textbf{Criteria} & \textbf{Pro} & \textbf{Con} & \textbf{Notes}
\\
\hline Few lines of code per file & X & & GnuPG $ = 300.9$
\\
& & & LibTomMath $ =
71.97$\hfill
\\
\hline Commented function prototypes & X & & GnuPG function
names are cryptic.
\\
\hline Speed & & X & LibTomMath is
slower.
\\
\hline Totally free & X & & GPL has
unfavourable restrictions.
\\
\hline Large function base & X & & GnuPG is
barebones.
\\
\hline Five modular reduction algorithms & X & & Faster modular
exponentiation for a variety of
moduli.
\\
\hline Portable & X & & GnuPG requires
configuration to build.
\\
\hline
\end{tabular}
\end{center}
\end{small}
\caption{LibTomMath Valuation}
\end{figure}
It may seem odd to compare LibTomMath to GnuPG since the math in GnuPG is only a small portion of
the entire application. However, LibTomMath was written with cryptography in mind. It provides
essentially all of the functions a cryptosystem would require when working with large integers.
So it may feel tempting to just rip the math code out of GnuPG (or GnuMP where it was taken from
originally) in your own application but I think there are reasons not to. While LibTomMath is
slower than libraries such as GnuMP it is not normally significantly slower. On x86 machines the
difference is normally a factor of two when performing modular exponentiations. It depends largely
on the processor, compiler and the moduli being used.
Essentially the only time you wouldn't use LibTomMath is when blazing speed is the primary concern.
However, on the other side of the coin LibTomMath offers you a totally free (public domain) well
structured math library that is very flexible, complete and performs well in resource constrained
environments. Fast RSA for example can be performed with as little as 8 Kibibytes of RAM for data
(again depending on build options).
\chapter{Getting Started with LibTomMath}
\section{Building Programs}
In order to use LibTomMath you must include ``tommath.h'' and link against the appropriate library
file (typically
libtommath.a). There is no library initialization required and the entire library is thread safe.
\section{Return Codes}
There are five possible return codes a function may return.
\index{MP\_OKAY}\index{MP\_VAL}\index{MP\_MEM}\index{MP\_ITER}\index{MP\_BUF}
\begin{figure}[h!]
\begin{center}
\begin{small}
\begin{tabular}{|l|l|}
\hline \textbf{Code} & \textbf{Meaning} \\
\hline MP\_OKAY & The function succeeded. \\
\hline MP\_VAL & The function input was invalid. \\
\hline MP\_MEM & Heap memory exhausted. \\
\hline MP\_ITER & Maximum iterations reached. \\
\hline MP\_BUF & Buffer overflow, supplied buffer too small. \\
\hline
\end{tabular}
\end{small}
\end{center}
\caption{Return Codes}
\end{figure}
The error codes \texttt{MP\_OKAY},\texttt{MP\_VAL}, \texttt{MP\_MEM}, \texttt{MP\_ITER}, and
\texttt{MP\_BUF} are of the type \texttt{mp\_err}.
The last two codes listed are not actually ``return'ed'' by a function. They are placed in an
integer (the caller must provide the address of an integer it can store to) which the caller can
access. To convert one of the three return codes to a string use the following function.
\index{mp\_error\_to\_string}
\begin{alltt}
char *mp_error_to_string(mp_err code);
\end{alltt}
This will return a pointer to a string which describes the given error code.
\section{Data Types}
The basic ``multiple precision integer'' type is known as the \texttt{mp\_int} within LibTomMath.
This data type is used to organize all of the data required to manipulate the integer it
represents. Within LibTomMath it has been prototyped as the following.
\index{mp\_int}
\begin{alltt}
typedef struct \{
int used, alloc;
mp_sign sign;
mp_digit *dp;
\} mp_int;
\end{alltt}
Where \texttt{mp\_digit} is a data type that represents individual digits of the integer. By
default, an \texttt{mp\_digit} is the ISO C \texttt{unsigned long} data type and each digit is
$28-$bits long. The \texttt{mp\_digit} type can be configured to suit other platforms by defining
the appropriate macros.
All LTM functions that use the \texttt{mp\_int} type will expect a pointer to \texttt{mp\_int}
structure. You must allocate memory to hold the structure itself by yourself (whether off stack or
heap it doesn't matter). The very first thing that must be done to use an \texttt{mp\_int} is that
it must be initialized.
\section{Function Organization}
The arithmetic functions of the library are all organized to have the same style prototype. That
is source operands are passed on the left and the destination is on the right. For instance,
\begin{alltt}
mp_add(&a, &b, &c); /* c = a + b */
mp_mul(&a, &a, &c); /* c = a * a */
mp_div(&a, &b, &c, &d); /* c = [a/b], d = a mod b */
\end{alltt}
Another feature of the way the functions have been implemented is that source operands can be
destination operands as well. For instance,
\begin{alltt}
mp_add(&a, &b, &b); /* b = a + b */
mp_div(&a, &b, &a, &c); /* a = [a/b], c = a mod b */
\end{alltt}
This allows operands to be re--used which can make programming simpler.
\section{Initialization}
\subsection{Single Initialization}
A single \texttt{mp\_int} can be initialized with the \texttt{mp\_init} function.
\index{mp\_init}
\begin{alltt}
mp_err mp_init (mp_int *a);
\end{alltt}
This function expects a pointer to an \texttt{mp\_int} structure and will initialize the members
of the structure so the \texttt{mp\_int} represents the default integer which is zero. If the
functions returns \texttt{MP\_OKAY} then the \texttt{mp\_int} is ready to be used by the other
LibTomMath functions.
\begin{small}
\begin{alltt}
int main(void)
\{
mp_int number;
mp_err result;
if ((result = mp_init(&number)) != MP_OKAY) \{
printf("Error initializing the number. \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
/* use the number */
return EXIT_SUCCESS;
\}
\end{alltt}
\end{small}
\subsection{Single Free}
When you are finished with an \texttt{mp\_int} it is ideal to return the heap it used back to the
system. The following function provides this functionality.
\index{mp\_clear}
\begin{alltt}
void mp_clear (mp_int *a);
\end{alltt}
The function expects a pointer to a previously initialized \texttt{mp\_int} structure and frees the
heap it uses. It sets the pointer\footnote{The \texttt{dp} member.} within the \texttt{mp\_int} to
\texttt{NULL} which is used to prevent double free situations. Is is legal to call
\texttt{mp\_clear} twice on the same \texttt{mp\_int} in a row.
\begin{small}
\begin{alltt}
int main(void)
\{
mp_int number;
mp_err result;
if ((result = mp_init(&number)) != MP_OKAY) \{
printf("Error initializing the number. \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
/* use the number */
/* We're done with it. */
mp_clear(&number);
return EXIT_SUCCESS;
\}
\end{alltt}
\end{small}
\subsection{Multiple Initializations}
Certain algorithms require more than one large integer. In these instances it is ideal to
initialize all of the \texttt{mp\_int} variables in an ``all or nothing'' fashion. That is, they
are either all initialized successfully or they are all not initialized.
The \texttt{mp\_init\_multi} function provides this functionality.
\index{mp\_init\_multi} \index{mp\_clear\_multi}
\begin{alltt}
mp_err mp_init_multi(mp_int *mp, ...);
\end{alltt}
It accepts a \texttt{NULL} terminated list of pointers to \texttt{mp\_int} structures. It will
attempt to initialize them all at once. If the function returns \texttt{MP\_OKAY} then all of the
\texttt{mp\_int} variables are ready to use, otherwise none of them are available for use.
A complementary \texttt{mp\_clear\_multi} function allows multiple \texttt{mp\_int} variables to be
free'd
from the heap at the same time.
\begin{small}
\begin{alltt}
int main(void)
\{
mp_int num1, num2, num3;
mp_err result;
if ((result = mp_init_multi(&num1,
&num2,
&num3, NULL)) != MP\_OKAY) \{
printf("Error initializing the numbers. \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
/* use the numbers */
/* We're done with them. */
mp_clear_multi(&num1, &num2, &num3, NULL);
return EXIT_SUCCESS;
\}
\end{alltt}
\end{small}
\subsection{Other Initializers}
To initialized and make a copy of an \texttt{mp\_int} the \texttt{mp\_init\_copy} function has been
provided.
\index{mp\_init\_copy}
\begin{alltt}
mp_err mp_init_copy (mp_int *a, mp_int *b);
\end{alltt}
This function will initialize $a$ and make it a copy of $b$ if all goes well.
\begin{small}
\begin{alltt}
int main(void)
\{
mp_int num1, num2;
mp_err result;
/* initialize and do work on num1 ... */
/* We want a copy of num1 in num2 now */
if ((result = mp_init_copy(&num2, &num1)) != MP_OKAY) \{
printf("Error initializing the copy. \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
/* now num2 is ready and contains a copy of num1 */
/* We're done with them. */
mp_clear_multi(&num1, &num2, NULL);
return EXIT_SUCCESS;
\}
\end{alltt}
\end{small}
Another less common initializer is \texttt{mp\_init\_size} which allows the user to initialize an
\texttt{mp\_int} with a given default number of digits. By default, all initializers allocate
\texttt{MP\_PREC} digits. This function lets you override this behaviour.
\index{mp\_init\_size}
\begin{alltt}
mp_err mp_init_size (mp_int *a, int size);
\end{alltt}
The $size$ parameter must be greater than zero. If the function succeeds the \texttt{mp\_int} $a$
will be initialized to have $size$ digits (which are all initially zero).
\begin{small}
\begin{alltt}
int main(void)
\{
mp_int number;
mp_err result;
/* we need a 60-digit number */
if ((result = mp_init_size(&number, 60)) != MP_OKAY) \{
printf("Error initializing the number. \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
/* use the number */
return EXIT_SUCCESS;
\}
\end{alltt}
\end{small}
\section{Maintenance Functions}
\subsection{Clear Leading Zeros}
This is used to ensure that leading zero digits are trimmed and the leading "used" digit will be
non--zero. It also fixes the sign if there are no more leading digits.
\index{mp\_clamp}
\begin{alltt}
void mp_clamp(mp_int *a);
\end{alltt}
\subsection{Zero Out}
This function will set the ``bigint'' to zeros without changing the amount of allocated memory.
\index{mp\_zero}
\begin{alltt}
void mp_zero(mp_int *a);
\end{alltt}
\subsection{Reducing Memory Usage}
When an \texttt{mp\_int} is in a state where it won't be changed again\footnote{A Diffie--Hellman
modulus for instance.} excess digits can be removed to return memory to the heap with the
\texttt{mp\_shrink} function.
\index{mp\_shrink}
\begin{alltt}
mp_err mp_shrink (mp_int *a);
\end{alltt}
This will remove excess digits of the \texttt{mp\_int} $a$. If the operation fails the
\texttt{mp\_int} should be intact without the excess digits being removed. Note that you can use a
shrunk \texttt{mp\_int} in further computations, however, such operations will require heap
operations which can be slow. It is not ideal to shrink \texttt{mp\_int} variables that you will
further modify in the system (unless you are seriously low on memory).
\begin{small}
\begin{alltt}
int main(void)
\{
mp_int number;
mp_err result;
if ((result = mp_init(&number)) != MP_OKAY) \{
printf("Error initializing the number. \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
/* use the number [e.g. pre-computation] */
/* We're done with it for now. */
if ((result = mp_shrink(&number)) != MP_OKAY) \{
printf("Error shrinking the number. \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
/* use it .... */
/* we're done with it. */
mp_clear(&number);
return EXIT_SUCCESS;
\}
\end{alltt}
\end{small}
\subsection{Adding additional digits}
Within the mp\_int structure are two parameters which control the limitations of the array of
digits that represent the integer the mp\_int is meant to equal. The \texttt{used} parameter
dictates how many digits are significant, that is, contribute to the value of the mp\_int. The
\texttt{alloc} parameter dictates how many digits are currently available in the array. If you
need to perform an operation that requires more digits you will have to \texttt{mp\_grow} the
\texttt{mp\_int} to your desired size.
\index{mp\_grow}
\begin{alltt}
mp_err mp_grow (mp_int *a, int size);
\end{alltt}
This will grow the array of digits of $a$ to $size$. If the \texttt{alloc} parameter is already
bigger than $size$ the function will not do anything.
\begin{small}
\begin{alltt}
int main(void)
\{
mp_int number;
mp_err result;
if ((result = mp_init(&number)) != MP_OKAY) \{
printf("Error initializing the number. \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
/* use the number */
/* We need to add 20 digits to the number */
if ((result = mp_grow(&number, number.alloc + 20)) != MP_OKAY) \{
printf("Error growing the number. \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
/* use the number */
/* we're done with it. */
mp_clear(&number);
return EXIT_SUCCESS;
\}
\end{alltt}
\end{small}
\chapter{Basic Operations}
\section{Copying}
A so called ``deep copy'', where new memory is allocated and all contents of $a$ are copied
verbatim into $b$ such that $b = a$ at the end.
\index{mp\_copy}
\begin{alltt}
mp_err mp_copy (const mp_int *a, mp_int *b);
\end{alltt}
You can also just swap $a$ and $b$. It does the normal pointer changing with a temporary pointer
variable, just that you do not have to.
\index{mp\_exch}
\begin{alltt}
void mp_exch (mp_int *a, mp_int *b);
\end{alltt}
\section{Bit Counting}
To get the position of the lowest bit set (LSB, the Lowest Significant Bit; the number of bits
which are zero before the first zero bit )
\index{mp\_cnt\_lsb}
\begin{alltt}
int mp_cnt_lsb(const mp_int *a);
\end{alltt}
To get the position of the highest bit set (MSB, the Most Significant Bit; the number of bits in
the ``bignum'')
\index{mp\_count\_bits}
\begin{alltt}
int mp_count_bits(const mp_int *a);
\end{alltt}
\section{Small Constants}
Setting an \texttt{mp\_int} to a small constant is a relatively common operation. To accommodate
these instances there is a small constant assignment function. This function is used to set a
single digit constant. The reason for this function is efficiency. Setting a single digit is quick
but the domain of a digit can change (it's always at least $0 \ldots 127$).
\subsection{Single Digit}
Setting a single digit can be accomplished with the following function.
\index{mp\_set}
\begin{alltt}
void mp_set (mp_int *a, mp_digit b);
\end{alltt}
This will zero the contents of $a$ and make it represent an integer equal to the value of $b$. Note
that this function has a return type of \texttt{void}. It cannot cause an error so it is safe to
assume the function succeeded.
\begin{small}
\begin{alltt}
int main(void)
\{
mp_int number;
mp_err result;
if ((result = mp_init(&number)) != MP_OKAY) \{
printf("Error initializing the number. \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
/* set the number to 5 */
mp_set(&number, 5);
/* we're done with it. */
mp_clear(&number);
return EXIT_SUCCESS;
\}
\end{alltt}
\end{small}
\subsection{Int32 and Int64 Constants}
These functions can be used to set a constant with 32 or 64 bits.
\index{mp\_set\_i32} \index{mp\_set\_u32}
\index{mp\_set\_i64} \index{mp\_set\_u64}
\begin{alltt}
void mp_set_i32 (mp_int *a, int32_t b);
void mp_set_u32 (mp_int *a, uint32_t b);
void mp_set_i64 (mp_int *a, int64_t b);
void mp_set_u64 (mp_int *a, uint64_t b);
\end{alltt}
These functions assign the sign and value of the input $b$ to the big integer $a$.
The value can be obtained again by calling the following functions.
\index{mp\_get\_i32} \index{mp\_get\_u32} \index{mp\_get\_mag\_u32}
\index{mp\_get\_i64} \index{mp\_get\_u64} \index{mp\_get\_mag\_u64}
\begin{alltt}
int32_t mp_get_i32 (const mp_int *a);
uint32_t mp_get_u32 (const mp_int *a);
uint32_t mp_get_mag_u32 (const mp_int *a);
int64_t mp_get_i64 (const mp_int *a);
uint64_t mp_get_u64 (const mp_int *a);
uint64_t mp_get_mag_u64 (const mp_int *a);
\end{alltt}
These functions return the 32 or 64 least significant bits of $a$ respectively. The unsigned
functions return negative values in a twos complement representation. The absolute value or
magnitude can be obtained using the \texttt{mp\_get\_mag*} functions.
\begin{small}
\begin{alltt}
int main(void)
\{
mp_int number;
mp_err result;
if ((result = mp_init(&number)) != MP_OKAY) \{
printf("Error initializing the number. \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
/* set the number to 654321 (note this is bigger than 127) */
mp_set_u32(&number, 654321);
printf("number == \%" PRIi32 "\textbackslash{}n", mp_get_i32(&number));
/* we're done with it. */
mp_clear(&number);
return EXIT_SUCCESS;
\}
\end{alltt}
\end{small}
This should output the following if the program succeeds.
\begin{alltt}
number == 654321
\end{alltt}
\subsection{Long Constants - platform dependant}
\index{mp\_set\_l} \index{mp\_set\_ul}
\begin{alltt}
void mp_set_l (mp_int *a, long b);
void mp_set_ul (mp_int *a, unsigned long b);
\end{alltt}
This will assign the value of the platform--dependent sized variable $b$ to the big integer $a$.
To retrieve the value, the following functions can be used.
\index{mp\_get\_l} \index{mp\_get\_ul} \index{mp\_get\_mag\_ul}
\begin{alltt}
long mp_get_l (const mp_int *a);
unsigned long mp_get_ul (const mp_int *a);
unsigned long mp_get_mag_ul (const mp_int *a);
\end{alltt}
This will return the least significant bits of the big integer $a$ that fit into the native data
type \texttt{long}.
\subsection{Floating Point Constants - platform dependant}
\index{mp\_set\_double}
\begin{alltt}
mp_err mp_set_double(mp_int *a, double b);
\end{alltt}
If the platform supports the floating point data type \texttt{double} (binary64) this function will
assign the integer part of \texttt{b} to the big integer $a$. This function will return
\texttt{MP\_VAL} if \texttt{b} is \texttt{+/-inf} or \texttt{NaN}.
To convert a big integer to a \texttt{double} use
\index{mp\_get\_double}
\begin{alltt}
double mp_get_double(const mp_int *a);
\end{alltt}
\subsection{Initialize and Setting Constants}
To both initialize and set small constants the following nine functions are available.
\index{mp\_init\_set} \index{mp\_init\_i32} \index{mp\_init\_i64} \index{mp\_init\_u32} \index{mp\_init\_u64}
\index{mp\_init\_l} \index{mp\_init\_ul}
\begin{alltt}
mp_err mp_init_set (mp_int *a, mp_digit b);
mp_err mp_init_i32 (mp_int *a, int32_t b);
mp_err mp_init_u32 (mp_int *a, uint32_t b);
mp_err mp_init_i64 (mp_int *a, int64_t b);
mp_err mp_init_u64 (mp_int *a, uint64_t b);
mp_err mp_init_l (mp_int *a, long b);
mp_err mp_init_ul (mp_int *a, unsigned long b);
\end{alltt}
Both functions work like the previous counterparts except they first initialize $a$ with the
function \texttt{mp\_init} before setting the values.
\begin{small}
\begin{alltt}
int main(void)
\{
mp_int number1, number2;
mp_err result;
/* initialize and set a single digit */
if ((result = mp_init_set(&number1, 100)) != MP_OKAY) \{
printf("Error setting number1: \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
/* initialize and set a long */
if ((result = mp_init_l(&number2, 1023)) != MP_OKAY) \{
printf("Error setting number2: \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
/* display */
printf("Number1, Number2 == \%" PRIi32 ", \%" PRIi32 "\textbackslash{}n",
mp_get_i32(&number1), mp_get_i32(&number2));
/* clear */
mp_clear_multi(&number1, &number2, NULL);
return EXIT_SUCCESS;
\}
\end{alltt}
\end{small}
If this program succeeds it shall output.
\begin{alltt}
Number1, Number2 == 100, 1023
\end{alltt}
\section{Comparisons}
Comparisons in LibTomMath are always performed in a ``left to right'' fashion. There are three
possible return codes for any comparison.
\index{MP\_GT} \index{MP\_EQ} \index{MP\_LT}
\begin{figure}[h]
\begin{center}
\begin{tabular}{|c|c|}
\hline \textbf{Result Code} & \textbf{Meaning} \\
\hline MP\_GT & $a > b$ \\
\hline MP\_EQ & $a = b$ \\
\hline MP\_LT & $a < b$ \\
\hline
\end{tabular}
\end{center}
\caption{Comparison Codes for $a, b$}
\label{fig:CMP}
\end{figure}
In figure \ref{fig:CMP} two integers $a$ and $b$ are being compared. In this case $a$ is said to
be ``to the left'' of $b$. The return codes are of type \texttt{mp\_ord}.
\subsection{Unsigned comparison}
An unsigned comparison considers only the digits themselves and not the associated \texttt{sign}
flag of the \texttt{mp\_int} structures. This is analogous to an absolute comparison. The
function \texttt{mp\_cmp\_mag} will compare two \texttt{mp\_int} variables based on their digits
only.
\index{mp\_cmp\_mag}
\begin{alltt}
mp_ord mp_cmp_mag(mp_int *a, mp_int *b);
\end{alltt}
This will compare $a$ to $b$ placing $a$ to the left of $b$. This function cannot fail and will
return one of the three compare codes listed in figure \ref{fig:CMP}.
\begin{small}
\begin{alltt}
int main(void)
\{
mp_int number1, number2;
mp_err result;
if ((result = mp_init_multi(&number1, &number2, NULL)) != MP_OKAY) \{
printf("Error initializing the numbers. \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
/* set the number1 to 5 */
mp_set(&number1, 5);
/* set the number2 to -6 */
mp_set(&number2, 6);
if ((result = mp_neg(&number2, &number2)) != MP_OKAY) \{
printf("Error negating number2. \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
switch(mp_cmp_mag(&number1, &number2)) \{
case MP_GT: printf("|number1| > |number2|"); break;
case MP_EQ: printf("|number1| = |number2|"); break;
case MP_LT: printf("|number1| < |number2|"); break;
\}
/* we're done with it. */
mp_clear_multi(&number1, &number2, NULL);
return EXIT_SUCCESS;
\}
\end{alltt}
\end{small}
If this program\footnote{This function uses the \texttt{mp\_neg} function which is discussed in
section \ref{sec:NEG}.} completes successfully it should print the following.
\begin{alltt}
|number1| < |number2|
\end{alltt}
This is because $\vert -6 \vert = 6$ and obviously $5 < 6$.
\subsection{Signed comparison}
To compare two \texttt{mp\_int} variables based on their signed value the \texttt{mp\_cmp} function
is provided.
\index{mp\_cmp}
\begin{alltt}
mp_ord mp_cmp(mp_int *a, mp_int *b);
\end{alltt}
This will compare $a$ to the left of $b$. It will first compare the signs of the two
\texttt{mp\_int} variables. If they differ it will return immediately based on their signs. If
the signs are equal then it will compare the digits individually. This function will return one of
the compare conditions codes listed in figure \ref{fig:CMP}.
\begin{small}
\begin{alltt}
int main(void)
\{
mp_int number1, number2;
mp_err result;
if ((result = mp_init_multi(&number1, &number2, NULL)) != MP_OKAY) \{
printf("Error initializing the numbers. \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
/* set the number1 to 5 */
mp_set(&number1, 5);
/* set the number2 to -6 */
mp_set(&number2, 6);
if ((result = mp_neg(&number2, &number2)) != MP_OKAY) \{
printf("Error negating number2. \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
switch(mp_cmp(&number1, &number2)) \{
case MP_GT: printf("number1 > number2"); break;
case MP_EQ: printf("number1 = number2"); break;
case MP_LT: printf("number1 < number2"); break;
\}
/* we're done with it. */
mp_clear_multi(&number1, &number2, NULL);
return EXIT_SUCCESS;
\}
\end{alltt}
\end{small}
If this program\footnote{This function uses the \texttt{mp\_neg} function which is discussed in
section \ref{sec:NEG}.} completes successfully it should print the following.
\begin{alltt}
number1 > number2
\end{alltt}
\subsection{Single Digit}
To compare a single digit against an \texttt{mp\_int} the following function has been provided.
\index{mp\_cmp\_d}
\begin{alltt}
mp_ord mp_cmp_d(mp_int *a, mp_digit b);
\end{alltt}
This will compare $a$ to the left of $b$ using a signed comparison. Note that it will always
treat$b$ as positive. This function is rather handy when you have to compare against small values
such as $1$ (which often comes up in cryptography). The function cannot fail and will return one
of the tree compare condition codes listed in figure \ref{fig:CMP}.
\begin{small}
\begin{alltt}
int main(void)
\{
mp_int number;
mp_err result;
if ((result = mp_init(&number)) != MP_OKAY) \{
printf("Error initializing the number. \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
/* set the number to 5 */
mp_set(&number, 5);
switch(mp_cmp_d(&number, 7)) \{
case MP_GT: printf("number > 7"); break;
case MP_EQ: printf("number = 7"); break;
case MP_LT: printf("number < 7"); break;
\}
/* we're done with it. */
mp_clear(&number);
return EXIT_SUCCESS;
\}
\end{alltt}
\end{small}
If this program functions properly it will print out the following.
\begin{alltt}
number < 7
\end{alltt}
\section{Logical Operations}
Logical operations are operations that can be performed either with simple shifts or boolean
operators such as AND, XOR and OR directly. These operations are very quick.
\subsection{Multiplication by two}
Multiplications and divisions by any power of two can be performed with quick logical shifts either
left or right depending on the operation.
When multiplying or dividing by two a special case routine can be used which are as follows.
\index{mp\_mul\_2} \index{mp\_div\_2}
\begin{alltt}
mp_err mp_mul_2(const mp_int *a, mp_int *b);
mp_err mp_div_2(const mp_int *a, mp_int *b);
\end{alltt}
The former will assign twice $a$ to $b$ while the latter will assign half $a$ to $b$. These
functions are fast since the shift counts and masks are hardcoded into the routines.
\begin{small}
\begin{alltt}
int main(void)
\{
mp_int number;
mp_err result;
if ((result = mp_init(&number)) != MP_OKAY) \{
printf("Error initializing the number. \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
/* set the number to 5 */
mp_set(&number, 5);
/* multiply by two */
if ((result = mp\_mul\_2(&number, &number)) != MP_OKAY) \{
printf("Error multiplying the number. \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
switch(mp_cmp_d(&number, 7)) \{
case MP_GT: printf("2*number > 7"); break;
case MP_EQ: printf("2*number = 7"); break;
case MP_LT: printf("2*number < 7"); break;
\}
/* now divide by two */
if ((result = mp\_div\_2(&number, &number)) != MP_OKAY) \{
printf("Error dividing the number. \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
switch(mp_cmp_d(&number, 7)) \{
case MP_GT: printf("2*number/2 > 7"); break;
case MP_EQ: printf("2*number/2 = 7"); break;
case MP_LT: printf("2*number/2 < 7"); break;
\}
/* we're done with it. */
mp_clear(&number);
return EXIT_SUCCESS;
\}
\end{alltt}
\end{small}
If this program is successful it will print out the following text.
\begin{alltt}
2*number > 7
2*number/2 < 7
\end{alltt}
Since $10 > 7$ and $5 < 7$.
To multiply by a power of two the following function can be used.
\index{mp\_mul\_2d}
\begin{alltt}
mp_err mp_mul_2d(const mp_int *a, int b, mp_int *c);
\end{alltt}
This will multiply $a$ by $2^b$ and store the result in $c$. If the value of $b$ is less than or
equal to zero the function will copy $a$ to $c$ without performing any further actions. The
multiplication itself is implemented as a right--shift operation of $a$ by $b$ bits. To divide by a
power of two use the following.
\index{mp\_div\_2d}
\begin{alltt}
mp_err mp_div_2d (const mp_int *a, int b, mp_int *c, mp_int *d);
\end{alltt}
Which will divide $a$ by $2^b$, store the quotient in $c$ and the remainder in $d$. If $b \le 0$
then the function simply copies $a$ over to $c$ and zeroes $d$. The variable $d$ may be
passed as a \texttt{NULL} value to signal that the remainder is not desired. The division itself
is implemented as a left--shift operation of $a$ by $b$ bits.
It is also not very uncommon to need just the power of two $2^b$; for example as a start--value
for
the Newton method.
\index{mp\_2expt}
\begin{alltt}
mp_err mp_2expt(mp_int *a, int b);
\end{alltt}
It is faster than doing it by shifting $1$ with \texttt{mp\_mul\_2d}.
\subsection{Polynomial Basis Operations}
Strictly speaking the organization of the integers within the mp\_int structures is what is known
as a ``polynomial basis''. This simply means a field element is stored by divisions of a radix.
For example, if $f(x) = \sum_{i=0}^{k} y_ix^k$ for any vector $\vec y$ then the array of digits in
$\vec y$ are said to be the polynomial basis representation of $z$ if $f(\beta) = z$ for a given
radix $\beta$.
To multiply by the polynomial $g(x) = x$ all you have todo is shift the digits of the basis left
one place. The following function provides this operation.
\index{mp\_lshd}
\begin{alltt}
mp_err mp_lshd (mp_int *a, int b);
\end{alltt}
This will multiply $a$ in place by $x^b$ which is equivalent to shifting the digits left $b$ places
and inserting zeroes in the least significant digits. Similarly to divide by a power of $x$ the
following function is provided.
\index{mp\_rshd}
\begin{alltt}
void mp_rshd (mp_int *a, int b)
\end{alltt}
This will divide $a$ in place by $x^b$ and discard the remainder. This function cannot fail as it
performs the operations in place and no new digits are required to complete it.
\subsection{AND, OR, XOR and COMPLEMENT Operations}
While AND, OR and XOR operations compute arbitrary--precision bitwise operations. Negative numbers
are treated as if they are in two--complement representation, while internally they are
sign--magnitude however.
\index{mp\_or} \index{mp\_and} \index{mp\_xor} \index{mp\_complement} \index{mp\_signed\_rsh}
\begin{alltt}
mp_err mp_or (const mp_int *a, mp_int *b, mp_int *c);
mp_err mp_and (const mp_int *a, mp_int *b, mp_int *c);
mp_err mp_xor (const mp_int *a, mp_int *b, mp_int *c);
mp_err mp_complement(const mp_int *a, mp_int *b);
mp_err mp_signed_rsh(const mp_int *a, int b, mp_int *c, mp_int *d);
\end{alltt}
The function \texttt{mp\_complement} computes a two--complement $b = \sim a$. The function
\texttt{mp\_signed\_rsh} performs sign extending right shift. For positive numbers it is equivalent
to \texttt{mp\_div\_2d}.
\section{Addition and Subtraction}
To compute an addition or subtraction the following two functions can be used.
\index{mp\_add} \index{mp\_sub}
\begin{alltt}
mp_err mp_add (const mp_int *a, const mp_int *b, mp_int *c);
mp_err mp_sub (const mp_int *a, const mp_int *b, mp_int *c)
\end{alltt}
Which perform $c = a \odot b$ where $\odot$ is one of signed addition or subtraction. The
operations are fully sign aware.
\section{Sign Manipulation}
\subsection{Negation}
\label{sec:NEG}
Simple integer negation can be performed with the following.
\index{mp\_neg}
\begin{alltt}
mp_err mp_neg (const mp_int *a, mp_int *b);
\end{alltt}
Which assigns $-a$ to $b$.
\subsection{Absolute}
Simple integer absolutes can be performed with the following.
\index{mp\_abs}
\begin{alltt}
mp_err mp_abs (const mp_int *a, mp_int *b);
\end{alltt}
Which assigns $\vert a \vert$ to $b$.
\section{Integer Division and Remainder}
To perform a complete and general integer division with remainder use the following function.
\index{mp\_div}
\begin{alltt}
mp_err mp_div (const mp_int *a, const mp_int *b, mp_int *c, mp_int *d);
\end{alltt}
This divides $a$ by $b$ and stores the quotient in $c$ and $d$. The signed quotient is computed
such that $bc + d = a$. Note that either of $c$ or $d$ can be set to \texttt{NULL} if their value
is not required. If $b$ is zero the function returns \texttt{MP\_VAL}.
\section{Hashing}
To get a non-cryptographic hash of an \texttt{mp\_int} use the following function.
\index{mp\_hash}
\begin{alltt}
mp_err mp_hash (const mp_int *a, mp_hval *hash);
\end{alltt}
This will create the hash of $a$ following the \mbox{FNV-1a} algorithm as described on
\url{http://www.isthe.com/chongo/tech/comp/fnv/index.html#FNV-1a}. With the
help of this function one can use an \texttt{mp\_int} as a key in a hash table.
NB: The hashing is not stable over different widths of an \texttt{mp\_digit}.
\chapter{Multiplication and Squaring}
\section{Multiplication}
A full signed integer multiplication can be performed with the following.
\index{mp\_mul}
\begin{alltt}
mp_err mp_mul (const mp_int *a, const mp_int *b, mp_int *c);
\end{alltt}
Which assigns the full signed product $ab$ to $c$. This function actually breaks into one of four
cases which are specific multiplication routines optimized for given parameters. First there are
the Toom--Cook multiplications which should only be used with very large inputs. This is followed
by the Karatsuba multiplications which are for moderate sized inputs. Then followed by the Comba
and baseline multipliers.
Fortunately for the developer you don't really need to know this unless you really want to fine
tune the system. The function \texttt{mp\_mul} will determine on its own\footnote{Some tweaking may
be required but \texttt{make tune} will put some reasonable values in \texttt{bncore.c}} what
routine to use automatically when it is called.
\begin{small}
\begin{alltt}
int main(void)
\{
mp_int number1, number2;
mp_err result;
/* Initialize the numbers */
if ((result = mp_init_multi(&number1,
&number2, NULL)) != MP_OKAY) \{
printf("Error initializing the numbers. \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
/* set the terms */
mp_set_i32(&number, 257);
mp_set_i32(&number2, 1023);
/* multiply them */
if ((result = mp_mul(&number1, &number2,
&number1)) != MP_OKAY) \{
printf("Error multiplying terms. \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
/* display */
printf("number1 * number2 == \%" PRIi32, mp_get_i32(&number1));
/* free terms and return */
mp_clear_multi(&number1, &number2, NULL);
return EXIT_SUCCESS;
\}
\end{alltt}
\end{small}
If this program succeeds it shall output the following.
\begin{alltt}
number1 * number2 == 262911
\end{alltt}
\section{Squaring}
Since squaring can be performed faster than multiplication it is performed it's own function
instead of just using
\texttt{mp\_mul}.
\index{mp\_sqr}
\begin{alltt}
mp_err mp_sqr (const mp_int *a, mp_int *b);
\end{alltt}
Will square $a$ and store it in $b$. Like the case of multiplication there are four different
squaring algorithms all which can be called from the function \texttt{mp\_sqr}. It is ideal to use
\texttt{mp\_sqr} over \texttt{mp\_mul} when squaring terms because of the speed difference.
\section{Tuning Polynomial Basis Routines}
Both of the Toom--Cook and Karatsuba multiplication algorithms are faster than the traditional
$O(n^2)$ approach that the Comba and baseline algorithms use. At $O(n^{1.464973})$ and
$O(n^{1.584962})$ running times respectively they require considerably less work. For example, a
$10\,000$-digit multiplication would take roughly $724\,000$ single precision multiplications with
Toom--Cook or $100\,000\,000$ single precision multiplications with the standard Comba (a factor of
$138$).
So why not always use Karatsuba or Toom--Cook? The simple answer is that they have so much
overhead that they're not actually faster than Comba until you hit distinct ``cutoff'' points.
For Karatsuba with the default configuration, GCC 3.3.1 and an Athlon XP processor the cutoff point
is roughly 110 digits (about 70 for the Intel P4). That is, at 110 digits Karatsuba and Comba
multiplications just about break even and for 110+ digits Karatsuba is faster.
To get reasonable values for the cut--off points for your architecture, type
\begin{alltt}
make tune
\end{alltt}
This will run a benchmark, computes the medians, rewrites \texttt{bncore.c}, and recompiles
\texttt{bncore.c} and relinks the library.
The benchmark itself can be fine--tuned in the file \texttt{etc/tune\_it.sh}.
The program \texttt{etc/tune} is also able to print a list of values for printing curves with e.g.:
\texttt{gnuplot}. type \texttt{./etc/tune -h} to get a list of all available options.
\chapter{Modular Reduction}
Modular reduction is process of taking the remainder of one quantity divided by another. Expressed
as (\ref{eqn:mod}) the modular reduction is equivalent to the remainder of $b$ divided by $c$.
\begin{equation}
a \equiv b \mbox{ (mod }c\mbox{)}
\label{eqn:mod}
\end{equation}
Of particular interest to cryptography are reductions where $b$ is limited to the range $0 \le b <
c^2$ since particularly fast reduction algorithms can be written for the limited range.
Note that one of the four optimized reduction algorithms are automatically chosen in the modular
exponentiation algorithm \texttt{mp\_exptmod} when an appropriate modulus is detected.
\section{Straight Division}
In order to effect an arbitrary modular reduction the following algorithm is provided.
\index{mp\_mod}
\begin{alltt}
mp_err mp_mod(const mp_int *a,const mp_int *b, mp_int *c);
\end{alltt}
This reduces $a$ modulo $b$ and stores the result in $c$. The sign of $c$ shall agree with the
sign of $b$. This algorithm accepts an input $a$ of any range and is not limited by $0 \le a <
b^2$.
\section{Barrett Reduction}
Barrett reduction is a generic optimized reduction algorithm that requires pre--computation to
achieve a decent speedup over straight division. First a $\mu$ value must be precomputed with the
following function.
\index{mp\_reduce\_setup}
\begin{alltt}
mp_err mp_reduce_setup(const mp_int *a, mp_int *b);
\end{alltt}
Given a modulus in $b$ this produces the required $\mu$ value in $a$. For any given modulus this
only has to be computed once. Modular reduction can now be performed with the following.
\index{mp\_reduce}
\begin{alltt}
mp_err mp_reduce(const mp_int *a, const mp_int *b, mp_int *c);
\end{alltt}
This will reduce $a$ in place modulo $b$ with the precomputed $\mu$ value in $c$. $a$ must be in
the range
$0 \le a < b^2$.
\begin{small}
\begin{alltt}
int main(void)
\{
mp_int a, b, c, mu;
mp_err result;
/* initialize a,b to desired values, mp_init mu,
* c and set c to 1...we want to compute a^3 mod b
*/
/* get mu value */
if ((result = mp_reduce_setup(&mu, b)) != MP_OKAY) \{
printf("Error getting mu. \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
/* square a to get c = a^2 */
if ((result = mp_sqr(&a, &c)) != MP_OKAY) \{
printf("Error squaring. \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
/* now reduce `c' modulo b */
if ((result = mp_reduce(&c, &b, &mu)) != MP_OKAY) \{
printf("Error reducing. \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
/* multiply a to get c = a^3 */
if ((result = mp_mul(&a, &c, &c)) != MP_OKAY) \{
printf("Error reducing. \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
/* now reduce `c' modulo b */
if ((result = mp_reduce(&c, &b, &mu)) != MP_OKAY) \{
printf("Error reducing. \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
/* c now equals a^3 mod b */
return EXIT_SUCCESS;
\}
\end{alltt}
\end{small}
This program will calculate $a^3 \mbox{ mod }b$ if all the functions succeed.
\section{Montgomery Reduction}
Montgomery is a specialized reduction algorithm for any odd moduli. Like Barrett reduction a
pre--computation step is required. This isaccomplished with the following.
\index{mp\_montgomery\_setup}
\begin{alltt}
mp_err mp_montgomery_setup(const mp_int *a, mp_digit *mp);
\end{alltt}
For the given odd moduli $a$ the precomputation value is placed in $mp$. The reduction is computed
with the following.
\index{mp\_montgomery\_reduce}
\begin{alltt}
mp_err mp_montgomery_reduce(mp_int *a, mp_int *m, mp_digit mp);
\end{alltt}
This reduces $a$ in place modulo $m$ with the pre--computed value $mp$. $a$ must be in the range
$0 \le a < b^2$.
Montgomery reduction is faster than Barrett reduction for moduli smaller than the ``Comba'' limit.
With the default setup for instance, the limit is $127$ digits ($3556$--bits). Note that this
function is not limited to $127$ digits just that it falls back to a baseline algorithm after that
point.
An important observation is that this reduction does not return $a \mbox{ mod }m$ but $aR^{-1}
\mbox{ mod }m$ where $R = \beta^n$, $n$ is the n number of digits in $m$ and $\beta$ is the radix
used (default is $2^{28}$).
To quickly calculate $R$ the following function was provided.
\index{mp\_montgomery\_calc\_normalization}
\begin{alltt}
mp_err mp_montgomery_calc_normalization(mp_int *a, mp_int *b);
\end{alltt}
Which calculates $a = R$ for the odd moduli $b$ without using multiplication or division.
The normal modus operandi for Montgomery reductions is to normalize the integers before entering
the system. For example, to calculate $a^3 \mbox { mod }b$ using Montgomery reduction the value of
$a$ can be normalized by multiplying it by $R$. Consider the following code snippet.
\begin{small}
\begin{alltt}
int main(void)
\{
mp_int a, b, c, R;
mp_digit mp;
mp_err result;
/* initialize a,b to desired values,
* mp_init R, c and set c to 1....
*/
/* get normalization */
if ((result = mp_montgomery_calc_normalization(&R, b)) != MP_OKAY) \{
printf("Error getting norm. \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
/* get mp value */
if ((result = mp_montgomery_setup(&c, &mp)) != MP_OKAY) \{
printf("Error setting up montgomery. \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
/* normalize `a' so now a is equal to aR */
if ((result = mp_mulmod(&a, &R, &b, &a)) != MP_OKAY) \{
printf("Error computing aR. \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
/* square a to get c = a^2R^2 */
if ((result = mp_sqr(&a, &c)) != MP_OKAY) \{
printf("Error squaring. \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
/* now reduce `c' back down to c = a^2R^2 * R^-1 == a^2R */
if ((result = mp_montgomery_reduce(&c, &b, mp)) != MP_OKAY) \{
printf("Error reducing. \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
/* multiply a to get c = a^3R^2 */
if ((result = mp_mul(&a, &c, &c)) != MP_OKAY) \{
printf("Error reducing. \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
/* now reduce `c' back down to c = a^3R^2 * R^-1 == a^3R */
if ((result = mp_montgomery_reduce(&c, &b, mp)) != MP_OKAY) \{
printf("Error reducing. \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
/* now reduce (again) `c' back down to c = a^3R * R^-1 == a^3 */
if ((result = mp_montgomery_reduce(&c, &b, mp)) != MP_OKAY) \{
printf("Error reducing. \%s",
mp_error_to_string(result));
return EXIT_FAILURE;
\}
/* c now equals a^3 mod b */
return EXIT_SUCCESS;
\}
\end{alltt}
\end{small}
This particular example does not look too efficient but it demonstrates the point of the algorithm.
By normalizing the inputs the reduced results are always of the form $aR$ for some variable $a$.
This allows a single final reduction to correct for the normalization and the fast reduction used
within the algorithm.
For more details consider examining the file \texttt{bn\_mp\_exptmod\_fast.c}.
\section{Restricted Diminished Radix}
``Diminished Radix'' reduction refers to reduction with respect to moduli that are amenable to
simple digit shifting and small multiplications. In this case the ``restricted'' variant refers to
moduli of the form $\beta^k - p$ for some $k \ge 0$ and $0 < p < \beta$ where $\beta$ is the radix
(default to $2^{28}$).
As in the case of Montgomery reduction there is a pre--computation phase required for a given
modulus.
\index{mp\_dr\_setup}
\begin{alltt}
void mp_dr_setup(const mp_int *a, mp_digit *d);
\end{alltt}
This computes the value required for the modulus $a$ and stores it in $d$. This function cannot
fail and does not return any error codes.
To determine if $a$ is a valid DR modulus:
\index{mp\_dr\_is\_modulus}
\begin{alltt}
bool mp_dr_is_modulus(const mp_int *a);
\end{alltt}
After the pre--computation a reduction can be performed with the following.
\index{mp\_dr\_reduce}
\begin{alltt}
mp_err mp_dr_reduce(mp_int *a, const mp_int *b, mp_digit mp);
\end{alltt}
This reduces $a$ in place modulo $b$ with the pre--computed value $mp$. $b$ must be of a restricted
diminished radix form and $a$ must be in the range $0 \le a < b^2$. Diminished radix reductions
are much faster than both Barrett and Montgomery reductions as they have a much lower asymptotic
running time.
Since the moduli are restricted this algorithm is not particularly useful for something like Rabin,
RSA or BBS cryptographic purposes. This reduction algorithm is useful for Diffie--Hellman and ECC
where fixed primes are acceptable.
Note that unlike Montgomery reduction there is no normalization process. The result of this
function is equal to the correct residue.
\section{Unrestricted Diminished Radix}
Unrestricted reductions work much like the restricted counterparts except in this case the moduli
is of the form $2^k - p$ for $0 < p < \beta$. In this sense the unrestricted reductions are more
flexible as they can be applied to a wider range of numbers.
\index{mp\_reduce\_2k\_setup}\index{mp\_reduce\_2k\_setup\_l}
\begin{alltt}
mp_err mp_reduce_2k_setup(const mp_int *a, mp_digit *d);
mp_err mp_reduce_2k_setup_l(const mp_int *a, mp_int *d);
\end{alltt}
This will compute the required $d$ value for the given moduli $a$.
\index{mp\_reduce\_2k}\index{mp\_reduce\_2k\_l}
\begin{alltt}
mp_err mp_reduce_2k(mp_int *a, const mp_int *n, mp_digit d);
mp_err mp_reduce_2k_l(mp_int *a, const mp_int *n, const mp_int *d);
\end{alltt}
This will reduce $a$ in place modulo $n$ with the pre--computed value $d$. From my experience this
routine is slower than the function \texttt{mp\_dr\_reduce} but faster for most moduli sizes than
the Montgomery reduction.
To determine if \texttt{mp\_reduce\_2k} can be used at all, ask the function
\texttt{mp\_reduce\_is\_2k}.
\index{mp\_reduce\_is\_2k}\index{mp\_reduce\_is\_2k\_l}
\begin{alltt}
bool mp_reduce_is_2k(const mp_int *a);
bool mp_reduce_is_2k_l(const mp_int *a);
\end{alltt}
\section{Combined Modular Reduction}
Some of the combinations of an arithmetic operations followed by a modular reduction can be done in
a faster way. The ones implemented are:
Addition $d = (a + b) \mod c$
\index{mp\_addmod}
\begin{alltt}
mp_err mp_addmod(const mp_int *a, const mp_int *b, const mp_int *c, mp_int *d);
\end{alltt}
Subtraction $d = (a - b) \mod c$
\index{mp\_submod}
\begin{alltt}
mp_err mp_submod(const mp_int *a, const mp_int *b, const mp_int *c, mp_int *d);
\end{alltt}
Multiplication $d = (ab) \mod c$
\index{mp\_mulmod}
\begin{alltt}
mp_err mp_mulmod(const mp_int *a, const mp_int *b, const mp_int *c, mp_int *d);
\end{alltt}
Squaring $d = (a^2) \mod c$
\index{mp\_sqrmod}
\begin{alltt}
mp_err mp_sqrmod(const mp_int *a, const mp_int *b, const mp_int *c, mp_int *d);
\end{alltt}
\chapter{Exponentiation}
\section{Single Digit Exponentiation}
\index{mp\_expt\_n}
\begin{alltt}
mp_err mp_expt_n(const mp_int *a, int b, int *c)
\end{alltt}
This function computes $c = a^b$.
\section{Modular Exponentiation}
\index{mp\_exptmod}
\begin{alltt}
mp_err mp_exptmod (const mp_int *G, const mp_int *X, const mp_int *P, mp_int *Y)
\end{alltt}
This computes $Y \equiv G^X \mbox{ (mod }P\mbox{)}$ using a variable width sliding window
algorithm. This function will automatically detect the fastest modular reduction technique to use
during the operation. For negative values of $X$ the operation is performed as $Y \equiv (G^{-1}
\mbox{ mod }P)^{\vert X \vert} \mbox{ (mod }P\mbox{)}$ provided that $gcd(G, P) = 1$.
This function is actually a shell around the two internal exponentiation functions. This routine
will automatically detect when Barrett, Montgomery, Restricted and Unrestricted Diminished Radix
based exponentiation can be used. Generally moduli of the a ``restricted diminished radix'' form
lead to the fastest modular exponentiations. Followed by Montgomery and the other two algorithms.
\section{Modulus a Power of Two}
\index{mp\_mod\_2d}
\begin{alltt}
mp_err mp_mod_2d(const mp_int *a, int b, mp_int *c)
\end{alltt}
It calculates $c = a \mod 2^b$.
\section{Root Finding}
\index{mp\_root\_n}
\begin{alltt}
mp_err mp_root_n(const mp_int *a, int b, mp_int *c)
\end{alltt}
This computes $c = a^{1/b}$ such that $c^b \le a$ and $(c+1)^b > a$. Will return a positive root
only for even roots and return a root with the sign of the input for odd roots. For example,
performing $4^{1/2}$ will return $2$ whereas $(-8)^{1/3}$ will return $-2$.
This algorithm uses the ``Newton Approximation'' method and will converge on the correct root
fairly quickly.
The square root $c = a^{1/2}$ (with the same conditions $c^2 \le a$ and $(c+1)^2 > a$) is
implemented with a faster algorithm.
\index{mp\_sqrt}
\begin{alltt}
mp_err mp_sqrt(const mp_int *arg, mp_int *ret)
\end{alltt}
\chapter{Logarithm}
\section{Integer Logarithm}
A logarithm function for positive integer input \texttt{a, base} computing $\floor{\log_bx}$ such
that $(\log_b x)^b \le x$. The function \texttt{mp\_log\_n} is just a wrapper that converts \texttt{base}
to a bigint and calls \texttt{mp\_log}.
\index{mp\_log}
\begin{alltt}
mp_err mp_log(const mp_int *a, const mp_int *base, int *c)
\end{alltt}
\index{mp\_log\_n}
\begin{alltt}
mp_err mp_log_n(const mp_int *a, int base, int *c)
\end{alltt}
\subsection{Example}
Example given for \texttt{mp\_log\_n} only because the single difference is the type of \texttt{base}.
\begin{small}
\begin{alltt}
#include <stdlib.h>
#include <stdio.h>
#include <errno.h>
#include <tommath.h>
int main(int argc, char **argv)
{
mp_int x;
int base, output;
mp_err e;
if (argc != 3) {
fprintf(stderr,"Usage %s base x\textbackslash{}n", argv[0]);
exit(EXIT_FAILURE);
}
if ((e = mp_init(&x)) != MP_OKAY) {
fprintf(stderr,"mp_init failed: \textbackslash{}"%s\textbackslash{}"\textbackslash{}n",
mp_error_to_string(e));
exit(EXIT_FAILURE);
}
errno = 0;
base = (int)strtoul(argv[1], NULL, 10);
if (errno == ERANGE) {
fprintf(stderr,"strtoul(l) failed: input out of range\textbackslash{}n");
exit(EXIT_FAILURE);
}
if ((e = mp_read_radix(&x, argv[2], 10)) != MP_OKAY) {
fprintf(stderr,"mp_read_radix failed: \textbackslash{}"%s\textbackslash{}"\textbackslash{}n",
mp_error_to_string(e));
exit(EXIT_FAILURE);
}
if ((e = mp_log_n(&x, base, &output)) != MP_OKAY) {
fprintf(stderr,"mp_log_n failed: \textbackslash{}"%s\textbackslash{}"\textbackslash{}n",
mp_error_to_string(e));
exit(EXIT_FAILURE);
}
printf("%d\textbackslash{}n",output);
mp_clear(&x);
exit(EXIT_SUCCESS);
}
\end{alltt}
\end{small}
\chapter{Prime Numbers}
\section{Fermat Test}
\index{mp\_prime\_fermat}
\begin{alltt}
mp_err mp_prime_fermat (const mp_int *a, const mp_int *b, int *result)
\end{alltt}
Performs a Fermat primality test to the base $b$. That is it computes $b^a \mbox{ mod }a$ and
tests whether the value is equal to $b$ or not. If the values are equal then $a$ is probably prime
and $result$ is set to one. Otherwise $result$ is set to zero.
\section{Miller--Rabin Test}
\index{mp\_prime\_miller\_rabin}
\begin{alltt}
mp_err mp_prime_miller_rabin (const mp_int *a, const mp_int *b, int *result)
\end{alltt}
Performs a Miller--Rabin test to the base $b$ of $a$. This test is much stronger than the Fermat
test and is very hard to fool (besides with Carmichael numbers). If $a$ passes the test (therefore
is probably prime) $result$ is set to one. Otherwise $result$ is set to zero.
Note that it is suggested that you use the Miller--Rabin test instead of the Fermat test since all
of the failures of Miller--Rabin are a subset of the failures of the Fermat test.
\subsection{Required Number of Tests}
Generally to ensure a number is very likely to be prime you have to perform the Miller--Rabin with
at least a half--dozen or so unique bases. However, it has been proven that the probability of
failure goes down as the size of the input goes up. This is why a simple function has been provided
to help out.
\index{mp\_prime\_rabin\_miller\_trials}
\begin{alltt}
mp_err mp_prime_rabin_miller_trials(int size)
\end{alltt}
This returns the number of trials required for a low probability of failure for a given
\texttt{size} expressed in bits. This comes in handy specially since larger numbers are slower to
test. For example, a 512--bit number would require 18 tests for a probability of $2^{-160}$ whereas
a 1024--bit number would only require 12 tests for a probability of $2^{-192}$. The exact values as
implemented are listed in table \ref{table:millerrabinrunsimpl}.
\begin{table}[h]
\begin{center}
\begin{tabular}{c c c}
\textbf{bits} & \textbf{Rounds} & \textbf{Error} \\
80 & -1 & Use deterministic algorithm for size <= 80 bits \\
81 & 37 & $2^{-96}$ \\
96 & 32 & $2^{-96}$ \\
128 & 40 & $2^{-112}$ \\
160 & 35 & $2^{-112}$ \\
256 & 27 & $2^{-128}$ \\
384 & 16 & $2^{-128}$ \\
512 & 18 & $2^{-160}$ \\
768 & 11 & $2^{-160}$ \\
896 & 10 & $2^{-160}$ \\
1024 & 12 & $2^{-192}$ \\
1536 & 8 & $2^{-192}$ \\
2048 & 6 & $2^{-192}$ \\
3072 & 4 & $2^{-192}$ \\
4096 & 5 & $2^{-256}$ \\
5120 & 4 & $2^{-256}$ \\
6144 & 4 & $2^{-256}$ \\
8192 & 3 & $2^{-256}$ \\
9216 & 3 & $2^{-256}$ \\
10240 & 2 & $2^{-256}$
\end{tabular}
\caption{ Number of Miller-Rabin rounds as implemented } \label{table:millerrabinrunsimpl}
\end{center}
\end{table}
A small table, broke in two for typographical reasons, with the number of rounds of Miller--Rabin
tests is shown below. The numbers have been computed with a PARI/GP script listed in appendix
\ref{app:numberofmrcomp}.
The first column is the number of bits $b$ in the prime $p = 2^b$, the numbers in the first row
represent the probability that the number that all of the Miller--Rabin tests deemed a pseudoprime
is actually a composite. There is a deterministic test for numbers smaller than $2^{80}$.
\begin{table}[h]
\begin{center}
\begin{tabular}{c c c c c c c}
\textbf{bits} & $\mathbf{2^{-80}}$ & $\mathbf{2^{-96}}$ & $\mathbf{2^{-112}}$ &
$\mathbf{2^{-128}}$
& $\mathbf{2^{-160}}$ & $\mathbf{2^{-192}}$
\\
80 & 31 & 39 & 47 & 55
& 71 & 87 \\
96 & 29 & 37 & 45 & 53
& 69 & 85 \\
128 & 24 & 32 & 40 & 48
& 64 & 80 \\
160 & 19 & 27 & 35 & 43
& 59 & 75 \\
192 & 15 & 21 & 29 & 37
& 53 & 69 \\
256 & 10 & 15 & 20 & 27
& 43 & 59 \\
384 & 7 & 9 & 12 & 16
& 25 & 38 \\
512 & 5 & 7 & 9 & 12
& 18 & 26 \\
768 & 4 & 5 & 6 & 8
& 11 & 16 \\
1024 & 3 & 4 & 5 & 6
& 9 & 12 \\
1536 & 2 & 3 & 3 & 4
& 6 & 8 \\
2048 & 2 & 2 & 3 & 3
& 4 & 6 \\
3072 & 1 & 2 & 2 & 2
& 3 & 4 \\
4096 & 1 & 1 & 2 & 2
& 2 & 3 \\
6144 & 1 & 1 & 1 & 1
& 2 & 2 \\
8192 & 1 & 1 & 1 & 1
& 2 & 2 \\
12288 & 1 & 1 & 1 & 1
& 1 & 1 \\
16384 & 1 & 1 & 1 & 1
& 1 & 1 \\
24576 & 1 & 1 & 1 & 1
& 1 & 1 \\
32768 & 1 & 1 & 1 & 1
& 1 & 1
\end{tabular}
\caption{ Number of Miller-Rabin rounds. Part I } \label{table:millerrabinrunsp1}
\end{center}
\end{table}
\newpage
\begin{table}[h]
\begin{center}
\begin{tabular}{c c c c c c c c}
\textbf{bits} & $\mathbf{2^{-224}}$ & $\mathbf{2^{-256}}$ & $\mathbf{2^{-288}}$ &
$\mathbf{2^{-320}}$ & $\mathbf{2^{-352}}$ & $\mathbf{2^{-384}}$ & $\mathbf{2^{-416}}$
\\
80 & 103 & 119 & 135 & 151 &
167 & 183 & 199
\\
96 & 101 & 117 & 133 & 149 &
165 & 181 & 197
\\
128 & 96 & 112 & 128 & 144 &
160 & 176 & 192
\\
160 & 91 & 107 & 123 & 139 &
155 & 171 & 187
\\
192 & 85 & 101 & 117 & 133 &
149 & 165 & 181
\\
256 & 75 & 91 & 107 & 123 &
139 & 155 & 171
\\
384 & 54 & 70 & 86 & 102 &
118 & 134 & 150
\\
512 & 36 & 49 & 65 & 81 &
97 & 113 & 129
\\
768 & 22 & 29 & 37 & 47 &
58 & 70 & 86
\\
1024 & 16 & 21 & 26 & 33 &
40 & 48 & 58
\\
1536 & 10 & 13 & 17 & 21 &
25 & 30 & 35
\\
2048 & 8 & 10 & 13 & 15 &
18 & 22 & 26
\\
3072 & 5 & 7 & 8 & 10 &
12 & 14 & 17
\\
4096 & 4 & 5 & 6 & 8 &
9 & 11 & 12
\\
6144 & 3 & 4 & 4 & 5 &
6 & 7 & 8
\\
8192 & 2 & 3 & 3 & 4 &
5 & 6 & 6
\\
12288 & 2 & 2 & 2 & 3 &
3 & 4 & 4
\\
16384 & 1 & 2 & 2 & 2 &
3 & 3 & 3
\\
24576 & 1 & 1 & 2 & 2 &
2 & 2 & 2
\\
32768 & 1 & 1 & 1 & 1 &
2 & 2 & 2
\end{tabular}
\caption{ Number of Miller-Rabin rounds. Part II } \label{table:millerrabinrunsp2}
\end{center}
\end{table}
Determining the probability needed to pick the right column is a bit harder. Fips 186.4, for
example has $2^{-80}$ for $512$ bit large numbers, $2^{-112}$ for $1024$ bits, and $2^{128}$ for
$1536$ bits. It can be seen in table \ref{table:millerrabinrunsp1} that those combinations follow
the diagonal from $(512,2^{-80})$ downwards and to the right to gain a lower probability of getting
a composite declared a pseudoprime for the same amount of work or less.
If this version of the library has the strong Lucas--Selfridge and/or the Frobenius--Underwood test
implemented only one or two rounds of the Miller--Rabin test with a random base is necessary for
numbers larger than or equal to $1024$ bits.
This function is meant for RSA. The number of rounds for DSA is $\lceil -log_2(p)/2\rceil$ with $p$
the probability which is just the half of the absolute value of $p$ if given as a power of two.
E.g.: with $p = 2^{-128}$, $\lceil -log_2(p)/2\rceil = 64$.
This function can be used to test a DSA prime directly if these rounds are followed by a Lucas
test.
See also table C.1 in FIPS 186-4.
\section{Strong Lucas--Selfridge Test}
\index{mp\_prime\_strong\_lucas\_selfridge}
\begin{alltt}
mp_err mp_prime_strong_lucas_selfridge(const mp_int *a, bool *result)
\end{alltt}
Performs a strong Lucas--Selfridge test. The strong Lucas--Selfridge test together with the
Rabin--Miller test with bases $2$ and $3$ resemble the BPSW test. The single internal use is a
compile--time option in \texttt{mp\_prime\_is\_prime} and can be excluded from the Libtommath build
if not needed.
\section{Frobenius (Underwood) Test}
\index{mp\_prime\_frobenius\_underwood}
\begin{alltt}
mp_err mp_prime_frobenius_underwood(const mp_int *N, bool *result)
\end{alltt}
Performs the variant of the Frobenius test as described by Paul Underwood. It can be included at
build--time if the preprocessor macro \texttt{LTM\_USE\_FROBENIUS\_TEST} is defined and will be
used
instead of the Lucas--Selfridge test.
It returns \texttt{MP\_ITER} if the number of iterations is exhausted, assumes a composite as the
input and sets \texttt{result} accordingly. This will reduce the set of available pseudoprimes by a
very small amount: test with large datasets (more than $10^{10}$ numbers, both randomly chosen and
sequences of odd numbers with a random start point) found only 31 (thirty--one) numbers with $a >
120$ and none at all with just an additional simple check for divisors $d < 2^8$.
\section{Primality Testing}
Testing if a number is a square can be done a bit faster than just by calculating the square root.
It is used by the primality testing function described below.
\index{mp\_is\_square}
\begin{alltt}
mp_err mp_is_square(const mp_int *arg, bool *ret);
\end{alltt}
\index{mp\_prime\_is\_prime}
\begin{alltt}
mp_err mp_prime_is_prime(const mp_int *a, int t, bool *result)
\end{alltt}
This will perform a trial division followed by two rounds of Miller--Rabin with bases 2 and 3 and a
Lucas--Selfridge test. The Frobenius--Underwood is available as a compile--time option with the
preprocessor macro \texttt{LTM\_USE\_FROBENIUS\_TEST}. See file \texttt{bn\_mp\_prime\_is\_prime.c}
for the necessary details. It shall be noted that both functions are much slower than the
Miller--Rabin test and if speed is an essential issue, the macro \texttt{LTM\_USE\_ONLY\_MR}
switches the Frobenius--Underwood test and the Lucas--Selfridge test off and their code will not
even be compiled into the library.
If $t$ is set to a positive value $t$ additional rounds of the Miller--Rabin test with random bases
will be performed to allow for Fips 186.4 (vid.~p.~126ff) compliance. The function
\texttt{mp\_prime\_rabin\_miller\_trials} can be used to determine the number of rounds. It is
vital that the function \texttt{mp\_rand} has a cryptographically strong random number generator
available.
One Miller--Rabin tests with a random base will be run automatically, so by setting $t$ to a
positive value this function will run $t + 1$ Miller--Rabin tests with random bases.
If $t$ is set to a negative value the test will run the deterministic Miller--Rabin test for the
primes up to $3\,317\,044\,064\,679\,887\ 385\,961\,981$\footnote{The semiprime $1287836182261\cdot
2575672364521$ with both factors smaller than $2^{64}$. An alternative with all factors smaller
than
$2^32$ is $4290067842\cdot 262853\cdot 1206721\cdot 2134439 + 3$}. That limit has to be checked
by
the caller.
If $a$ passes all of the tests $result$ is set to \texttt{true}, otherwise it is set to
\texttt{false}.
\section{Next Prime}
\index{mp\_prime\_next\_prime}
\begin{alltt}
mp_err mp_prime_next_prime(mp_int *a, int t, bool bbs_style)
\end{alltt}
This finds the next prime after $a$ that passes the function \texttt{mp\_prime\_is\_prime} with $t$
tests but see the documentation for \texttt{mp\_prime\_is\_prime} for details regarding the use of
the argument $t$. Set $bbs\_style$ to \texttt{true} if you want only the next prime congruent
to $3 \mbox{ mod } 4$, otherwise set it to \texttt{false} to find any next prime.
\section{Random Primes}
\index{mp\_prime\_rand}
\begin{alltt}
mp_err mp_prime_rand(mp_int *a, int t, int size, int flags);
\end{alltt}
This will generate a prime in $a$ using $t$ tests of the primality testing algorithms. See the
documentation for the function \texttt{mp\_prime\_is\_prime} for details regarding the use of the
argument \texttt{t}. The parameter \texttt{size} specifies the bit--length of the prime desired.
The parameter \texttt{flags} specifies one of several options available (see fig.
\ref{fig:primeopts}) which can be OR'ed together.
The function \texttt{mp\_prime\_rand} is suitable for generating primes which must be secret (as in
the case of RSA) since there is no skew on the least significant bits.
\begin{figure}[h]
\begin{center}
\begin{small}
\begin{tabular}{|r|l|}
\hline \textbf{Flag} & \textbf{Meaning}
\\
\hline MP\_PRIME\_BBS & Make the prime congruent to $3$ modulo $4$
\\
\hline MP\_PRIME\_SAFE & Make a prime $p$ such that $(p - 1)/2$ is also prime.
\\
& This option implies MP\_PRIME\_BBS as well.
\\
\hline MP\_PRIME\_2MSB\_OFF & Makes sure that the bit adjacent to the most significant bit
\\
& Is forced to zero.
\\
\hline MP\_PRIME\_2MSB\_ON & Makes sure that the bit adjacent to the most significant bit
\\
& Is forced to one.
\\
\hline
\end{tabular}
\end{small}
\end{center}
\caption{Primality Generation Options}
\label{fig:primeopts}
\end{figure}
\chapter{Random Number Generation}
\section{PRNG}
\index{mp\_rand}
\begin{alltt}
mp_err mp_rand(mp_int *a, int digits)
\end{alltt}
This function generates a random number of \texttt{digits} bits.
The random number generated with these two functions is cryptographically secure if the source of
random numbers the operating systems offers is cryptographically secure. It will use
\texttt{arc4random()} if the OS is a BSD flavor, Wincrypt on Windows, or \texttt{/dev/urandom} on
all operating systems that have it.
If you have a custom random source you might find the function \texttt{mp\_rand\_source()} useful.
\index{mp\_rand\_source}
\begin{alltt}
void mp_rand_source(mp_err(*source)(void *out, size_t size));
\end{alltt}
\chapter{Input and Output}
\section{ASCII Conversions}
\subsection{To ASCII}
\index{mp\_to\_radix}
\begin{alltt}
mp_err mp_to_radix (const mp_int *a, char *str, size_t maxlen, size_t *written, int radix);
\end{alltt}
This stores $a$ in \texttt{str} of maximum length \texttt{maxlen} as a base-\texttt{radix} string
of ASCII chars and appends a \texttt{NUL} character to terminate the string.
Valid values of \texttt{radix} are in the range $[2, 64]$.
The exact number of characters in \texttt{str} plus the \texttt{NUL} will be put in
\texttt{written} if that variable is not set to \texttt{NULL}.
If \texttt{str} is not big enough to hold $a$, \texttt{str} will be filled with the least
significant digits of length \texttt{maxlen-1}, then \texttt{str} will be \texttt{NUL} terminated
and the error \texttt{MP\_BUF} is returned.
Please be aware that this function cannot evaluate the actual size of the buffer, it relies on the
correctness of \texttt{maxlen}!
\index{mp\_radix\_size}
\begin{alltt}
mp_err mp_radix_size (const mp_int *a, int radix, int *size)
\end{alltt}
This stores in \texttt{size} the number of characters (including space for the \texttt{NUL}
terminator) required. Upon error this function returns an error code and \texttt{size} will be
zero. This version of \texttt{mp\_radix\_size} uses \texttt{mp\_log} to calculate the size. It
is exact but slow for larger numbers.
\index{mp\_radix\_size\_overestimate}
\begin{alltt}
mp_err mp_radix_size_overestimate (const mp_int *a, int radix, int *size)
\end{alltt}
This stores in \texttt{size} the number of characters (including space for the \texttt{NUL}
terminator) required. Upon error this function returns an error code and \texttt{size} will be
zero. This version of \texttt{mp\_radix\_size} is much faster than the exact version above but
introduces the relative error $\approx 10^{-8}$. That would be $22$ for $2^{2^{31}}-1$, the
largest possible number in LibTomMath. Experiments gave no absolute error over $+5$.
The result is \emph{always} either exact or too large but it is \emph{never} too small.
If \texttt{MP\_NO\_FILE} is not defined a function to write to a file is also available.
\index{mp\_fwrite}
\begin{alltt}
mp_err mp_fwrite(const mp_int *a, int radix, FILE *stream);
\end{alltt}
\subsection{From ASCII}
\index{mp\_read\_radix}
\begin{alltt}
mp_err mp_read_radix (mp_int *a, const char *str, int radix);
\end{alltt}
This will read a \texttt{NUL} terminated string in base \texttt{radix} from \texttt{str} into $a$.
Valid values of \texttt{radix} are in the range $[2, 64]$.
%It will stop reading when it reads a character it does not recognize (which happens to include the
%\texttt{NUL} char\dots imagine that\dots).
It returns \texttt{MP\_VAL} for any character {\em not} in the range allowed for the given base.
The list of characters is the same as for base-64 and also in the same order.
\begin{alltt}
0123456789ABCDEFGHIJKLMNOPQRSTUVWXYZabcdefghijklmnopqrstuvwxyz+/
\end{alltt}
A single leading $-$ (ASCII \texttt{0x20}) sign can be used to denote a negative number. The
plus sign $+$ (ASCII \texttt{0x2b}) is already in use (bases 63 and 64) and cannot be used
to denote positivity, no matter how good the mood of the number is.
For all bases smaller than 37 the list is case-insensitive, e.g.:~the two hexadecimal numbers
$123abc_{16} = 1194684_{10}$ and $123ABC_{16} = 1194684_{10}$ are equivalent but the two base
64 numbers $123abc_{64} = 1108232550_{10}$ and $123ABC_{64} = 1108124364_{10}$ are not.
The input encoding is currently restricted to ASCII only.
If \texttt{MP\_NO\_FILE} is not defined a function to read from a file is also available.
\index{mp\_fread}
\begin{alltt}
mp_err mp_fread(mp_int *a, int radix, FILE *stream);
\end{alltt}
\section{Binary Conversions}
Converting an \texttt{mp\_int} to and from binary is another keen idea.
\index{mp\_ubin\_size}
\begin{alltt}
size_t mp_ubin_size(const mp_int *a);
\end{alltt}
This will return the number of bytes (octets) required to store the unsigned copy of the integer
$a$.
\index{mp\_to\_ubin}
\begin{alltt}
mp_err mp_to_ubin(const mp_int *a, uint8_t *buf, size_t maxlen, size_t *written)
\end{alltt}
This will store $a$ into the buffer \texttt{buf} of size \texttt{maxlen} in big--endian format
storing the number of bytes written in \texttt{len}. Fortunately this is exactly what DER (or is
it ASN?) requires. It does not store the sign of the integer.
\index{mp\_from\_ubin}
\begin{alltt}
mp_err mp_from_ubin(mp_int *a, uint8_t *b, size_t size);
\end{alltt}
This will read in an unsigned big--endian array of bytes (octets) from \texttt{b} of length
\texttt{size} into $a$. The resulting big--integer $a$ will always be positive.
For those who acknowledge the existence of negative numbers (heretic!) there are ``signed''
versions of the previous functions.
\index{mp\_sbin\_size} \index{mp\_from\_sbin} \index{mp\_to\_sbin}
\begin{alltt}
size_t mp_sbin_size(const mp_int *a);
mp_err mp_from_sbin(mp_int *a, const uint8_t *b, size_t size);
mp_err mp_to_sbin(const mp_int *a, uint8_t *b, size_t maxsize, size_t *len);
\end{alltt}
They operate essentially the same as the unsigned copies except they prefix the data with zero or
non--zero byte depending on the sign. If the sign is \texttt{MP\_ZPOS} (e.g. not negative) the
prefix is zero, otherwise the prefix is non--zero.
The two functions \texttt{mp\_unpack} (get your gifts out of the box, import binary data) and
\texttt{mp\_pack} (put your gifts into the box, export binary data) implement the similarly working
GMP functions as described at \url{http://gmplib.org/manual/Integer-Import-and-Export.html} with
the exception that \texttt{mp\_pack} will not allocate memory if \texttt{rop} is \texttt{NULL}.
\index{mp\_unpack} \index{mp\_pack}
\begin{alltt}
mp_err mp_unpack(mp_int *rop, size_t count, mp_order order, size_t size,
mp_endian endian, size_t nails, const void *op, size_t maxsize);
mp_err mp_pack(void *rop, size_t *countp, mp_order order, size_t size,
mp_endian endian, size_t nails, const mp_int *op);
\end{alltt}
The function \texttt{mp\_pack} has the additional variable \texttt{maxsize} which must hold the
size of the buffer \texttt{rop} in bytes. Use
\index{mp\_pack\_count}
\begin{alltt}
/* Parameters "nails" and "size" are the same as in mp_pack */
size_t mp_pack_count(const mp_int *a, size_t nails, size_t size);
\end{alltt}
To get the size in bytes necessary to be put in \texttt{maxsize}).
To enhance the readability of your code, the following enums have been wrought for your
convenience.
\begin{alltt}
typedef enum {
MP_LSB_FIRST = -1,
MP_MSB_FIRST = 1
} mp_order;
typedef enum {
MP_LITTLE_ENDIAN = -1,
MP_NATIVE_ENDIAN = 0,
MP_BIG_ENDIAN = 1
} mp_endian;
\end{alltt}
\chapter{Algebraic Functions}
\section{Extended Euclidean Algorithm}
\index{mp\_exteuclid}
\begin{alltt}
mp_err mp_exteuclid(const mp_int *a, const mp_int *b,
mp_int *U1, mp_int *U2, mp_int *U3);
\end{alltt}
This finds the triple $U_1$/$U_2$/$U_3$ using the Extended Euclidean algorithm such that the
following equation holds.
\begin{equation}
a \cdot U_1 + b \cdot U_2 = U_3
\end{equation}
Any of the \texttt{U1}/\texttt{U2}/\texttt{U3} parameters can be set to \textbf{NULL} if they are
not desired.
\section{Greatest Common Divisor}
\index{mp\_gcd}
\begin{alltt}
mp_err mp_gcd (const mp_int *a, const mp_int *b, mp_int *c)
\end{alltt}
This will compute the greatest common divisor of $a$ and $b$ and store it in $c$.
\section{Least Common Multiple}
\index{mp\_lcm}
\begin{alltt}
mp_err mp_lcm (const mp_int *a, const mp_int *b, mp_int *c)
\end{alltt}
This will compute the least common multiple of $a$ and $b$ and store it in $c$.
\section{Kronecker Symbol}
\index{mp\_kronecker}
\begin{alltt}
mp_err mp_kronecker (const mp_int *a, const mp_int *p, int *c)
\end{alltt}
This will compute the Kronecker symbol (an extension of the Jacobi symbol) for $a$ with respect to
$p$ with $\lbrace a, p \rbrace \in \mathbb{Z}$. If $p$ is prime this essentially computes the
Legendre symbol. The result is stored in $c$ and can take on one of three values $\lbrace -1, 0, 1
\rbrace$. If $p$ is prime then the result will be $-1$ when $a$ is not a quadratic residue
modulo
$p$. The result will be $0$ if $a$ divides $p$ and the result will be $1$ if $a$ is a quadratic
residue modulo $p$.
\section{Modular square root}
\index{mp\_sqrtmod\_prime}
\begin{alltt}
mp_err mp_sqrtmod_prime(const mp_int *n, const mp_int *p, mp_int *r)
\end{alltt}
This will solve the modular equation $r^2 = n \mod p$ where $p$ is a prime number greater than 2
(odd prime). The result is returned in the third argument $r$, the function returns
\texttt{MP\_OKAY} on success, other return values indicate failure.
The implementation is split for two different cases:
1. if $p \mod 4 == 3$ we apply \href{http://cacr.uwaterloo.ca/hac/}{Handbook of Applied
Cryptography algorithm 3.36} and compute $r$ directly as $r = n^{(p+1)/4} \mod p$
2. otherwise we use \href{https://en.wikipedia.org/wiki/Tonelli-Shanks_algorithm}{Tonelli--Shanks
algorithm}
The function does not check the primality of parameter $p$ thus it is up to the caller to assure
that this parameter is a prime number. When $p$ is a composite the function behaviour is undefined,
it may even return a false--positive \texttt{MP\_OKAY}.
\section{Modular Inverse}
\index{mp\_invmod}
\begin{alltt}
mp_err mp_invmod (const mp_int *a, const mp_int *b, mp_int *c)
\end{alltt}
Computes the multiplicative inverse of $a$ modulo $b$ and stores the result in $c$ such that
$ac \equiv 1 \mbox{ (mod }b\mbox{)}$.
\section{Single Digit Functions}
For those using small numbers (\textit{snicker snicker}) there are several ``helper'' functions
\index{mp\_add\_d} \index{mp\_sub\_d} \index{mp\_mul\_d} \index{mp\_div\_d} \index{mp\_mod\_d}
\begin{alltt}
mp_err mp_add_d(const mp_int *a, mp_digit b, mp_int *c);
mp_err mp_sub_d(const mp_int *a, mp_digit b, mp_int *c);
mp_err mp_mul_d(const mp_int *a, mp_digit b, mp_int *c);
mp_err mp_div_d(const mp_int *a, mp_digit b, mp_int *c, mp_digit *d);
mp_err mp_mod_d(const mp_int *a, mp_digit b, mp_digit *c);
\end{alltt}
These work like the full \texttt{mp\_int} capable variants except the second parameter $b$ is a
\texttt{mp\_digit}. These functions come fairly handy if you have to work with relatively small numbers
since you will not have to allocate an entire \texttt{mp\_int} to store a number like $1$ or $2$.
The functions \texttt{mp\_incr} and \texttt{mp\_decr} mimic the postfix operators \texttt{++} and
\texttt{--} respectively, to increment the input by one. They call the full single--digit functions
if the addition would carry. Both functions need to be included in a minimized library because they
call each other in case of a negative input, These functions change the inputs!
\index{mp\_incr} \index{mp\_decr}
\begin{alltt}
mp_err mp_incr(mp_int *a);
mp_err mp_decr(mp_int *a);
\end{alltt}
\chapter{Little Helpers}
It is never wrong to have some useful little shortcuts at hand.
\section{Function Macros}
To make this overview simpler the macros are given as function prototypes. The return of logic
macros is \texttt{false} or \texttt{true} respectively.
\index{mp\_iseven}
\begin{alltt}
bool mp_iseven(const mp_int *a)
\end{alltt}
Checks if $a = 0 \;\mathrm{mod}\; 2$
\index{mp\_isodd}
\begin{alltt}
bool mp_isodd(const mp_int *a)
\end{alltt}
Checks if $a = 1 \;\mathrm{mod}\; 2$
\index{mp\_isneg}
\begin{alltt}
bool mp_isneg(mp_int *a)
\end{alltt}
Checks if $a < 0$
\index{mp\_iszero}
\begin{alltt}
bool mp_iszero(mp_int *a)
\end{alltt}
Checks if $a = 0$. It does not check if the amount of memory allocated for $a$ is also minimal.
\index{mp\_isone}
\begin{alltt}
bool mp_isone(mp_int *a)
\end{alltt}
Checks if $a = 1$.
Other macros which are either shortcuts to normal functions or just other names for them do have
their place in a programmer's life, too!
\subsection{Shortcuts}
\index{mp\_to\_binary}
\begin{alltt}
#define mp_to_binary(M, S, N) mp_to_radix((M), (S), (N), 2)
\end{alltt}
\index{mp\_to\_octal}
\begin{alltt}
#define mp_to_octal(M, S, N) mp_to_radix((M), (S), (N), 8)
\end{alltt}
\index{mp\_to\_decimal}
\begin{alltt}
#define mp_to_decimal(M, S, N) mp_to_radix((M), (S), (N), 10)
\end{alltt}
\index{mp\_to\_hex}
\begin{alltt}
#define mp_to_hex(M, S, N) mp_to_radix((M), (S), (N), 16)
\end{alltt}
\begin{appendices}
\appendixpage
%\noappendicestocpagenum
\addappheadtotoc
\chapter{Computing Number of Miller--Rabin Trials}\label{app:numberofmrcomp}
The number of Miller--Rabin rounds in the tables \ref{millerrabinrunsimpl},
\ref{millerrabinrunsp1}, and \ref{millerrabinrunsp2} have been calculated with the formula in
FIPS
186--4 appendix F.1 (page 117) implemented as a PARI/GP script.
\begin{small}
\begin{alltt}
log2(x) = log(x)/log(2)
fips_f1_sums(k, M, t) = {
local(s = 0);
s = sum(m=3,M,
2^(m-t*(m-1)) *
sum(j=2,m,
1/ ( 2^( j + (k-1)/j ) )
)
);
return(s);
}
fips_f1_2(k, t, M) = {
local(common_factor, t1, t2, f1, f2, ds, res);
common_factor = 2.00743 * log(2) * k * 2^(-k);
t1 = 2^(k - 2 - M*t);
f1 = (8 * ((Pi^2) - 6))/3;
f2 = 2^(k - 2);
ds = t1 + f1 * f2 * fips_f1_sums(k, M, t);
res = common_factor * ds;
return(res);
}
fips_f1_1(prime_length, ptarget)={
local(t, t_end, M, M_end, pkt);
t_end = ceil(-log2(ptarget)/2);
M_end = floor(2 * sqrt(prime_length-1) - 1);
for(t = 1, t_end,
for(M = 3, M_end,
pkt = fips_f1_2(prime_length, t, M);
if(pkt <= ptarget,
return(t);
);
);
);
}
\end{alltt}
\end{small}
To get the number of rounds for a $1024$ bit large prime with a probability of $2^{-160}$:
\begin{alltt}
? fips_f1_1(1024,2^(-160))
%1 = 9
\end{alltt}
\end{appendices}
\input{bn.ind}
\end{document}
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