/*============================================================================= 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) 2007 David Howden Copyright (C) 2007, 2008, 2009, 2010 William Hart Copyright (C) 2008 Richard Howell-Peak Copyright (C) 2011 Fredrik Johansson Copyright (C) 2012 Lina Kulakova ******************************************************************************/ #include "fmpz_mod_poly.h" #include "ulong_extras.h" void fmpz_mod_poly_factor_squarefree(fmpz_mod_poly_factor_t res, const fmpz_mod_poly_t f) { fmpz_mod_poly_t f_d, g, g_1, r; fmpz_t p, x; slong deg, i, p_ui; if (f->length <= 1) { res->num = 0; return; } if (f->length == 2) { fmpz_mod_poly_factor_insert(res, f, 1); return; } fmpz_init(p); fmpz_set(p, &f->p); p_ui = fmpz_get_ui(p); deg = fmpz_mod_poly_degree(f); /* Step 1, look at f', if it is zero then we are done since f = h(x)^p for some particular h(x), clearly f(x) = sum a_k x^kp, k <= deg(f) */ fmpz_init(x); fmpz_mod_poly_init(g_1, p); fmpz_mod_poly_init(f_d, p); fmpz_mod_poly_init(g, p); fmpz_mod_poly_derivative(f_d, f); /* Case 1 */ if (fmpz_mod_poly_is_zero(f_d)) { fmpz_mod_poly_factor_t new_res; fmpz_mod_poly_t h; fmpz_mod_poly_init(h, p); for (i = 0; i <= deg / p_ui; i++) /* this will be an integer since f'=0 */ { fmpz_mod_poly_get_coeff_fmpz(x, f, i * p_ui); fmpz_mod_poly_set_coeff_fmpz(h, i, x); } /* Now run squarefree on h, and return it to the pth power */ fmpz_mod_poly_factor_init(new_res); fmpz_mod_poly_factor_squarefree(new_res, h); fmpz_mod_poly_factor_pow(new_res, p_ui); fmpz_mod_poly_factor_concat(res, new_res); fmpz_mod_poly_clear(h); fmpz_mod_poly_factor_clear(new_res); } else { fmpz_mod_poly_t h, z; fmpz_mod_poly_init(r, p); fmpz_mod_poly_gcd(g, f, f_d); fmpz_mod_poly_divrem(g_1, r, f, g); i = 1; fmpz_mod_poly_init(h, p); fmpz_mod_poly_init(z, p); /* Case 2 */ while (g_1->length > 1) { fmpz_mod_poly_gcd(h, g_1, g); fmpz_mod_poly_divrem(z, r, g_1, h); /* out <- out.z */ if (z->length > 1) { fmpz_mod_poly_factor_insert(res, z, 1); fmpz_mod_poly_make_monic(res->poly + (res->num - 1), res->poly + (res->num - 1)); if (res->num) res->exp[res->num - 1] *= i; } i++; fmpz_mod_poly_set(g_1, h); fmpz_mod_poly_divrem(g, r, g, h); } fmpz_mod_poly_clear(h); fmpz_mod_poly_clear(z); fmpz_mod_poly_clear(r); fmpz_mod_poly_make_monic(g, g); if (g->length > 1) { /* so now we multiply res with squarefree(g^1/p) ^ p */ fmpz_mod_poly_t g_p; /* g^(1/p) */ fmpz_mod_poly_factor_t new_res_2; fmpz_mod_poly_init(g_p, p); for (i = 0; i <= fmpz_mod_poly_degree(g) / p_ui; i++) { fmpz_mod_poly_get_coeff_fmpz(x, g, i * p_ui); fmpz_mod_poly_set_coeff_fmpz(g_p, i, x); } fmpz_mod_poly_factor_init(new_res_2); /* squarefree(g^(1/p)) */ fmpz_mod_poly_factor_squarefree(new_res_2, g_p); fmpz_mod_poly_factor_pow(new_res_2, p_ui); fmpz_mod_poly_factor_concat(res, new_res_2); fmpz_mod_poly_clear(g_p); fmpz_mod_poly_factor_clear(new_res_2); } } fmpz_clear(p); fmpz_clear(x); fmpz_mod_poly_clear(g_1); fmpz_mod_poly_clear(f_d); fmpz_mod_poly_clear(g); }