pqc/external/flint-2.4.3/nmod_poly_factor/profile/p-factor.c

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2014-05-18 22:03:37 +00:00
/*=============================================================================
This file is part of FLINT.
FLINT is free software; you can redistribute it and/or modify
it under the terms of the GNU General Public License as published by
the Free Software Foundation; either version 2 of the License, or
(at your option) any later version.
FLINT is distributed in the hope that it will be useful,
but WITHOUT ANY WARRANTY; without even the implied warranty of
MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
GNU General Public License for more details.
You should have received a copy of the GNU General Public License
along with FLINT; if not, write to the Free Software
Foundation, Inc., 51 Franklin St, Fifth Floor, Boston, MA 02110-1301 USA
=============================================================================*/
/******************************************************************************
Copyright (C) 2012 Lina Kulakova
******************************************************************************/
#include <stdio.h>
#include <stdlib.h>
#include <sys/types.h>
#include <time.h>
#include <unistd.h>
#include <gmp.h>
#include "flint.h"
#include "nmod_poly.h"
#define NP 100 /* number of moduli */
#define ND 8 /* number of degrees */
/*
Benchmarking code for factorisation in nmod_poly.
Test how the relation between n (degree of polynomial) and p
affects working time for Cantor-Zassenhaus, Berlekamp and
Kaltofen-Shoup algorithms. p and n are chosen independently.
*/
int main(void)
{
FLINT_TEST_INIT(state);
nmod_poly_t f, g;
nmod_poly_factor_t res;
mp_limb_t modulus;
int i, j, k, n, num;
double t, T1, T2, T3, T4;
const slong degs[] = {8, 16, 32, 64, 128, 256, 512, 1024};
const int iter_count[] = {10000, 5000, 1000, 500, 300, 100, 50, 20};
flint_printf("Random polynomials\n");
for (i = 0; i < NP; i++)
{
modulus = n_randtest_prime(state, 0);
flint_printf("========== p: %wu\n", modulus);
fflush(stdout);
for (j = 0; j < ND; j++)
{
n = degs[j];
flint_printf(">>>>>n: %d\n", n);
fflush(stdout);
T1 = 0;
T2 = 0;
T3 = 0;
for (k = 0; k < iter_count[j]; k++)
{
nmod_poly_init(f, modulus);
nmod_poly_randtest_not_zero(f, state, n);
t = clock();
nmod_poly_factor_init(res);
nmod_poly_factor_with_cantor_zassenhaus(res, f);
nmod_poly_factor_clear(res);
t = (clock() - t) / CLOCKS_PER_SEC;
T1 += t;
t = clock();
nmod_poly_factor_init(res);
nmod_poly_factor_with_berlekamp(res, f);
nmod_poly_factor_clear(res);
t = (clock() - t) / CLOCKS_PER_SEC;
T2 += t;
t = clock();
nmod_poly_factor_init(res);
nmod_poly_factor_kaltofen_shoup(res, f);
nmod_poly_factor_clear(res);
t = (clock() - t) / CLOCKS_PER_SEC;
T3 += t;
nmod_poly_clear(f);
}
flint_printf("CZ: %.2lf B: %.2lf KS: %.2lf\n", T1, T2, T3);
fflush(stdout);
if (T1 > T3 + 1)
break;
}
}
/* This code checks whether nmod_poly_factor
made a correct choice between CZ, B and KS */
flint_printf("Check choice correctness\n");
for (i = 0; i < NP; i++)
{
modulus = n_randtest_prime(state, 0);
flint_printf("========== p: %wu\n", modulus);
fflush(stdout);
for (j = 0; j < ND; j++)
{
n = degs[j];
flint_printf(">>>>>n: %d\n", n);
fflush(stdout);
T1 = 0;
T2 = 0;
T3 = 0;
T4 = 0;
for (k = 0; k < iter_count[j]; k++)
{
nmod_poly_init(f, modulus);
nmod_poly_randtest_not_zero(f, state, n);
t = clock();
nmod_poly_factor_init(res);
nmod_poly_factor_with_cantor_zassenhaus(res, f);
nmod_poly_factor_clear(res);
t = (clock() - t) / CLOCKS_PER_SEC;
T1 += t;
t = clock();
nmod_poly_factor_init(res);
nmod_poly_factor_berlekamp(res, f);
nmod_poly_factor_clear(res);
t = (clock() - t) / CLOCKS_PER_SEC;
T2 += t;
t = clock();
nmod_poly_factor_init(res);
nmod_poly_factor_kaltofen_shoup(res, f);
nmod_poly_factor_clear(res);
t = (clock() - t) / CLOCKS_PER_SEC;
T3 += t;
t = clock();
nmod_poly_factor_init(res);
nmod_poly_factor(res, f);
nmod_poly_factor_clear(res);
t = (clock() - t) / CLOCKS_PER_SEC;
T4 += t;
nmod_poly_clear(f);
}
flint_printf("CZ: %.2lf B: %.2lf KS: %.2lf F: %.2lf\n", T1, T2, T3, T4);
fflush(stdout);
if (T1 > T3 + 1)
break;
}
}
flint_printf("Irreducible polynomials\n");
for (i = 0; i < NP; i++)
{
modulus = n_randtest_prime(state, 0);
flint_printf("========== p: %wu\n", modulus);
fflush(stdout);
for (j = 0; j < ND; j++)
{
n = degs[j];
flint_printf(">>>>>n: %d\n", n);
fflush(stdout);
T1 = 0;
T2 = 0;
T3 = 0;
for (k = 0; k < iter_count[j]; k++)
{
nmod_poly_init(f, modulus);
nmod_poly_randtest_irreducible(f, state, n);
t = clock();
nmod_poly_factor_init(res);
nmod_poly_factor_with_cantor_zassenhaus(res, f);
nmod_poly_factor_clear(res);
t = (clock() - t) / CLOCKS_PER_SEC;
T1 += t;
t = clock();
nmod_poly_factor_init(res);
nmod_poly_factor_with_berlekamp(res, f);
nmod_poly_factor_clear(res);
t = (clock() - t) / CLOCKS_PER_SEC;
T2 += t;
t = clock();
nmod_poly_factor_init(res);
nmod_poly_factor_kaltofen_shoup(res, f);
nmod_poly_factor_clear(res);
t = (clock() - t) / CLOCKS_PER_SEC;
T3 += t;
nmod_poly_clear(f);
}
flint_printf("CZ: %.2lf B: %.2lf KS: %.2lf\n", T1, T2, T3);
fflush(stdout);
if (T1 > T3 + 1)
break;
}
}
flint_printf("Product of two irreducible polynomials\n");
for (i = 0; i < NP; i++)
{
modulus = n_randtest_prime(state, 0);
flint_printf("========== p: %wu\n", modulus);
fflush(stdout);
for (j = 0; j < ND; j++)
{
n = (degs[j] >> 1);
flint_printf(">>>>>n: %d\n", n);
fflush(stdout);
T1 = 0;
T2 = 0;
T3 = 0;
for (k = 0; k < iter_count[j]; k++)
{
nmod_poly_init(f, modulus);
nmod_poly_init(g, modulus);
nmod_poly_randtest_irreducible(f, state, n);
nmod_poly_randtest_irreducible(g, state, n);
nmod_poly_mul(f, f, g);
t = clock();
nmod_poly_factor_init(res);
nmod_poly_factor_with_cantor_zassenhaus(res, f);
nmod_poly_factor_clear(res);
t = (clock() - t) / CLOCKS_PER_SEC;
T1 += t;
t = clock();
nmod_poly_factor_init(res);
nmod_poly_factor_with_berlekamp(res, f);
nmod_poly_factor_clear(res);
t = (clock() - t) / CLOCKS_PER_SEC;
T2 += t;
t = clock();
nmod_poly_factor_init(res);
nmod_poly_factor_kaltofen_shoup(res, f);
nmod_poly_factor_clear(res);
t = (clock() - t) / CLOCKS_PER_SEC;
T3 += t;
nmod_poly_clear(f);
nmod_poly_clear(g);
}
flint_printf("CZ: %.2lf B: %.2lf KS: %.2lf\n", T1, T2, T3);
fflush(stdout);
if (T1 > T3 + 1)
break;
}
}
flint_printf("Product of 8 small irreducible polynomials\n");
for (i = 0; i < NP; i++)
{
modulus = n_randtest_prime(state, 0);
flint_printf("========== p: %wu\n", modulus);
fflush(stdout);
for (j = 1; j < ND; j++)
{
n = (degs[j] >> 3);
flint_printf(">>>>>n: %d\n", n);
fflush(stdout);
T1 = 0;
T2 = 0;
T3 = 0;
for (k = 0; k < iter_count[j]; k++)
{
nmod_poly_init(f, modulus);
nmod_poly_init(g, modulus);
nmod_poly_randtest_irreducible(f, state, n);
for (num = 1; num < 8; num++)
{
nmod_poly_randtest_irreducible(g, state, n);
nmod_poly_mul(f, f, g);
}
t = clock();
nmod_poly_factor_init(res);
nmod_poly_factor_with_cantor_zassenhaus(res, f);
nmod_poly_factor_clear(res);
t = (clock() - t) / CLOCKS_PER_SEC;
T1 += t;
t = clock();
nmod_poly_factor_init(res);
nmod_poly_factor_with_berlekamp(res, f);
nmod_poly_factor_clear(res);
t = (clock() - t) / CLOCKS_PER_SEC;
T2 += t;
t = clock();
nmod_poly_factor_init(res);
nmod_poly_factor_kaltofen_shoup(res, f);
nmod_poly_factor_clear(res);
t = (clock() - t) / CLOCKS_PER_SEC;
T3 += t;
nmod_poly_clear(f);
nmod_poly_clear(g);
}
flint_printf("CZ: %.2lf B: %.2lf KS: %.2lf\n", T1, T2, T3);
fflush(stdout);
if (T1 > T3 + 1)
break;
}
}
flint_randclear(state);
return EXIT_SUCCESS;
}