doc/man3/BN_add.pod - third_party/openssl - Git at Google

 =pod

 =head1 NAME

 BN_add, BN_sub, BN_mul, BN_sqr, BN_div, BN_mod, BN_nnmod, BN_mod_add,
 BN_mod_sub, BN_mod_mul, BN_mod_sqr, BN_mod_sqrt, BN_exp, BN_mod_exp, BN_gcd -
 arithmetic operations on BIGNUMs

 =head1 SYNOPSIS

  #include <openssl/bn.h>

  int BN_add(BIGNUM *r, const BIGNUM *a, const BIGNUM *b);

  int BN_sub(BIGNUM *r, const BIGNUM *a, const BIGNUM *b);

  int BN_mul(BIGNUM *r, BIGNUM *a, BIGNUM *b, BN_CTX *ctx);

  int BN_sqr(BIGNUM *r, BIGNUM *a, BN_CTX *ctx);

  int BN_div(BIGNUM *dv, BIGNUM *rem, const BIGNUM *a, const BIGNUM *d,
             BN_CTX *ctx);

  int BN_mod(BIGNUM *rem, const BIGNUM *a, const BIGNUM *m, BN_CTX *ctx);

  int BN_nnmod(BIGNUM *r, const BIGNUM *a, const BIGNUM *m, BN_CTX *ctx);

  int BN_mod_add(BIGNUM *r, BIGNUM *a, BIGNUM *b, const BIGNUM *m,
                 BN_CTX *ctx);

  int BN_mod_sub(BIGNUM *r, BIGNUM *a, BIGNUM *b, const BIGNUM *m,
                 BN_CTX *ctx);

  int BN_mod_mul(BIGNUM *r, BIGNUM *a, BIGNUM *b, const BIGNUM *m,
                 BN_CTX *ctx);

  int BN_mod_sqr(BIGNUM *r, BIGNUM *a, const BIGNUM *m, BN_CTX *ctx);

  BIGNUM *BN_mod_sqrt(BIGNUM *in, BIGNUM *a, const BIGNUM *p, BN_CTX *ctx);

  int BN_exp(BIGNUM *r, BIGNUM *a, BIGNUM *p, BN_CTX *ctx);

  int BN_mod_exp(BIGNUM *r, BIGNUM *a, const BIGNUM *p,
                 const BIGNUM *m, BN_CTX *ctx);

  int BN_gcd(BIGNUM *r, BIGNUM *a, BIGNUM *b, BN_CTX *ctx);

 =head1 DESCRIPTION

 BN_add() adds I<a> and I<b> and places the result in I<r> (C<r=a+b>).
 I<r> may be the same B<BIGNUM> as I<a> or I<b>.

 BN_sub() subtracts I<b> from I<a> and places the result in I<r> (C<r=a-b>).
 I<r> may be the same B<BIGNUM> as I<a> or I<b>.

 BN_mul() multiplies I<a> and I<b> and places the result in I<r> (C<r=a*b>).
 I<r> may be the same B<BIGNUM> as I<a> or I<b>.
 For multiplication by powers of 2, use L<BN_lshift(3)>.

 BN_sqr() takes the square of I<a> and places the result in I<r>
 (C<r=a^2>). I<r> and I<a> may be the same B<BIGNUM>.
 This function is faster than BN_mul(r,a,a).

 BN_div() divides I<a> by I<d> and places the result in I<dv> and the
 remainder in I<rem> (C<dv=a/d, rem=a%d>). Either of I<dv> and I<rem> may
 be B<NULL>, in which case the respective value is not returned.
 The result is rounded towards zero; thus if I<a> is negative, the
 remainder will be zero or negative.
 For division by powers of 2, use BN_rshift(3).

 BN_mod() corresponds to BN_div() with I<dv> set to B<NULL>.

 BN_nnmod() reduces I<a> modulo I<m> and places the nonnegative
 remainder in I<r>.

 BN_mod_add() adds I<a> to I<b> modulo I<m> and places the nonnegative
 result in I<r>.

 BN_mod_sub() subtracts I<b> from I<a> modulo I<m> and places the
 nonnegative result in I<r>.

 BN_mod_mul() multiplies I<a> by I<b> and finds the nonnegative
 remainder respective to modulus I<m> (C<r=(a*b) mod m>). I<r> may be
 the same B<BIGNUM> as I<a> or I<b>. For more efficient algorithms for
 repeated computations using the same modulus, see
 L<BN_mod_mul_montgomery(3)> and
 L<BN_mod_mul_reciprocal(3)>.

 BN_mod_sqr() takes the square of I<a> modulo B<m> and places the
 result in I<r>.

 BN_mod_sqrt() returns the modular square root of I<a> such that
 C<in^2 = a (mod p)>. The modulus I<p> must be a
 prime, otherwise an error or an incorrect "result" will be returned.
 The result is stored into I<in> which can be NULL. The result will be
 newly allocated in that case.

 BN_exp() raises I<a> to the I<p>-th power and places the result in I<r>
 (C<r=a^p>). This function is faster than repeated applications of
 BN_mul().

 BN_mod_exp() computes I<a> to the I<p>-th power modulo I<m> (C<r=a^p %
 m>). This function uses less time and space than BN_exp(). Do not call this
 function when B<m> is even and any of the parameters have the
 B<BN_FLG_CONSTTIME> flag set.

 BN_gcd() computes the greatest common divisor of I<a> and I<b> and
 places the result in I<r>. I<r> may be the same B<BIGNUM> as I<a> or
 I<b>.

 For all functions, I<ctx> is a previously allocated B<BN_CTX> used for
 temporary variables; see L<BN_CTX_new(3)>.

 Unless noted otherwise, the result B<BIGNUM> must be different from
 the arguments.

 =head1 RETURN VALUES

 The BN_mod_sqrt() returns the result (possibly incorrect if I<p> is
 not a prime), or NULL.

 For all remaining functions, 1 is returned for success, 0 on error. The return
 value should always be checked (e.g., C<if (!BN_add(r,a,b)) goto err;>).
 The error codes can be obtained by L<ERR_get_error(3)>.

 =head1 SEE ALSO

 L<ERR_get_error(3)>, L<BN_CTX_new(3)>,
 L<BN_add_word(3)>, L<BN_set_bit(3)>

 =head1 COPYRIGHT

 Copyright 2000-2022 The OpenSSL Project Authors. All Rights Reserved.

 Licensed under the Apache License 2.0 (the "License").  You may not use
 this file except in compliance with the License.  You can obtain a copy
 in the file LICENSE in the source distribution or at
 L<https://www.openssl.org/source/license.html>.

 =cut
	=pod

	=head1 NAME

	BN_add, BN_sub, BN_mul, BN_sqr, BN_div, BN_mod, BN_nnmod, BN_mod_add,
	BN_mod_sub, BN_mod_mul, BN_mod_sqr, BN_mod_sqrt, BN_exp, BN_mod_exp, BN_gcd -
	arithmetic operations on BIGNUMs

	=head1 SYNOPSIS

	#include <openssl/bn.h>

	int BN_add(BIGNUM r, const BIGNUM a, const BIGNUM *b);

	int BN_sub(BIGNUM r, const BIGNUM a, const BIGNUM *b);

	int BN_mul(BIGNUM r, BIGNUM a, BIGNUM b, BN_CTX ctx);

	int BN_sqr(BIGNUM r, BIGNUM a, BN_CTX *ctx);

	int BN_div(BIGNUM dv, BIGNUM rem, const BIGNUM a, const BIGNUM d,
	BN_CTX *ctx);

	int BN_mod(BIGNUM rem, const BIGNUM a, const BIGNUM m, BN_CTX ctx);

	int BN_nnmod(BIGNUM r, const BIGNUM a, const BIGNUM m, BN_CTX ctx);

	int BN_mod_add(BIGNUM r, BIGNUM a, BIGNUM b, const BIGNUM m,
	BN_CTX *ctx);

	int BN_mod_sub(BIGNUM r, BIGNUM a, BIGNUM b, const BIGNUM m,
	BN_CTX *ctx);

	int BN_mod_mul(BIGNUM r, BIGNUM a, BIGNUM b, const BIGNUM m,
	BN_CTX *ctx);

	int BN_mod_sqr(BIGNUM r, BIGNUM a, const BIGNUM m, BN_CTX ctx);

	BIGNUM BN_mod_sqrt(BIGNUM in, BIGNUM a, const BIGNUM p, BN_CTX *ctx);

	int BN_exp(BIGNUM r, BIGNUM a, BIGNUM p, BN_CTX ctx);

	int BN_mod_exp(BIGNUM r, BIGNUM a, const BIGNUM *p,
	const BIGNUM m, BN_CTX ctx);

	int BN_gcd(BIGNUM r, BIGNUM a, BIGNUM b, BN_CTX ctx);

	=head1 DESCRIPTION

	BN_add() adds I<a> and I<b> and places the result in I<r> (C<r=a+b>).
	I<r> may be the same B<BIGNUM> as I<a> or I<b>.

	BN_sub() subtracts I<b> from I<a> and places the result in I<r> (C<r=a-b>).
	I<r> may be the same B<BIGNUM> as I<a> or I<b>.

	BN_mul() multiplies I<a> and I<b> and places the result in I<r> (C<r=a*b>).
	I<r> may be the same B<BIGNUM> as I<a> or I<b>.
	For multiplication by powers of 2, use L<BN_lshift(3)>.

	BN_sqr() takes the square of I<a> and places the result in I<r>
	(C<r=a^2>). I<r> and I<a> may be the same B<BIGNUM>.
	This function is faster than BN_mul(r,a,a).

	BN_div() divides I<a> by I<d> and places the result in I<dv> and the
	remainder in I<rem> (C<dv=a/d, rem=a%d>). Either of I<dv> and I<rem> may
	be B<NULL>, in which case the respective value is not returned.
	The result is rounded towards zero; thus if I<a> is negative, the
	remainder will be zero or negative.
	For division by powers of 2, use BN_rshift(3).

	BN_mod() corresponds to BN_div() with I<dv> set to B<NULL>.

	BN_nnmod() reduces I<a> modulo I<m> and places the nonnegative
	remainder in I<r>.

	BN_mod_add() adds I<a> to I<b> modulo I<m> and places the nonnegative
	result in I<r>.

	BN_mod_sub() subtracts I<b> from I<a> modulo I<m> and places the
	nonnegative result in I<r>.

	BN_mod_mul() multiplies I<a> by I<b> and finds the nonnegative
	remainder respective to modulus I<m> (C<r=(a*b) mod m>). I<r> may be
	the same B<BIGNUM> as I<a> or I<b>. For more efficient algorithms for
	repeated computations using the same modulus, see
	L<BN_mod_mul_montgomery(3)> and
	L<BN_mod_mul_reciprocal(3)>.

	BN_mod_sqr() takes the square of I<a> modulo B<m> and places the
	result in I<r>.

	BN_mod_sqrt() returns the modular square root of I<a> such that
	C<in^2 = a (mod p)>. The modulus I<p> must be a
	prime, otherwise an error or an incorrect "result" will be returned.
	The result is stored into I<in> which can be NULL. The result will be
	newly allocated in that case.

	BN_exp() raises I<a> to the I<p>-th power and places the result in I<r>
	(C<r=a^p>). This function is faster than repeated applications of
	BN_mul().

	BN_mod_exp() computes I<a> to the I<p>-th power modulo I<m> (C<r=a^p %
	m>). This function uses less time and space than BN_exp(). Do not call this
	function when B<m> is even and any of the parameters have the
	B<BN_FLG_CONSTTIME> flag set.

	BN_gcd() computes the greatest common divisor of I<a> and I<b> and
	places the result in I<r>. I<r> may be the same B<BIGNUM> as I<a> or
	I<b>.

	For all functions, I<ctx> is a previously allocated B<BN_CTX> used for
	temporary variables; see L<BN_CTX_new(3)>.

	Unless noted otherwise, the result B<BIGNUM> must be different from
	the arguments.

	=head1 RETURN VALUES

	The BN_mod_sqrt() returns the result (possibly incorrect if I<p> is
	not a prime), or NULL.

	For all remaining functions, 1 is returned for success, 0 on error. The return
	value should always be checked (e.g., C<if (!BN_add(r,a,b)) goto err;>).
	The error codes can be obtained by L<ERR_get_error(3)>.

	=head1 SEE ALSO

	L<ERR_get_error(3)>, L<BN_CTX_new(3)>,
	L<BN_add_word(3)>, L<BN_set_bit(3)>

	=head1 COPYRIGHT

	Copyright 2000-2022 The OpenSSL Project Authors. All Rights Reserved.

	Licensed under the Apache License 2.0 (the "License"). You may not use
	this file except in compliance with the License. You can obtain a copy
	in the file LICENSE in the source distribution or at
	L<https://www.openssl.org/source/license.html>.

	=cut