/*============================================================================= 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 Copyright (C) 2013 Martin Lee ******************************************************************************/ #undef ulong #define ulong ulongxx/* interferes with system includes */ #include #undef ulong #include #define ulong mp_limb_t #include "nmod_poly.h" int nmod_poly_is_irreducible_ddf(const nmod_poly_t poly) { nmod_poly_t f, v, vinv, reducedH0, tmp; nmod_poly_t *h, *H, *I; slong i, j, l, m, n, d; double beta; int result= 1; n = nmod_poly_degree(poly); if (n < 2) return 1; if (!nmod_poly_is_squarefree(poly)) return 0; beta = 0.5 * (1. - (log(2) / log(n))); l = ceil(pow (n, beta)); m = ceil(0.5 * n / l); /* initialization */ nmod_poly_init_preinv(f, poly->mod.n, poly->mod.ninv); nmod_poly_init_preinv(v, poly->mod.n, poly->mod.ninv); nmod_poly_init_preinv(vinv, poly->mod.n, poly->mod.ninv); nmod_poly_init_preinv(reducedH0, poly->mod.n, poly->mod.ninv); nmod_poly_init_preinv(tmp, poly->mod.n, poly->mod.ninv); if (!(h = flint_malloc((2 * m + l + 1) * sizeof(nmod_poly_struct)))) { flint_printf("Exception (nmod_poly_is_irreducible_ddf):\n"); flint_printf("Not enough memory.\n"); abort(); } H = h + (l + 1); I = H + m; for (i = 0; i < l + 1; i++) nmod_poly_init_preinv(h[i], poly->mod.n, poly->mod.ninv); for (i = 0; i < m; i++) { nmod_poly_init_preinv(H[i], poly->mod.n, poly->mod.ninv); nmod_poly_init_preinv(I[i], poly->mod.n, poly->mod.ninv); } nmod_poly_make_monic(v, poly); nmod_poly_reverse(vinv, v, v->length); nmod_poly_inv_series(vinv, vinv, v->length); /* compute baby steps: h[i]=x^{p^i}mod v */ nmod_poly_set_coeff_ui(h[0], 1, 1); for (i = 1; i < l + 1; i++) nmod_poly_powmod_ui_binexp_preinv(h[i], h[i - 1], poly->mod.n, v, vinv); /* may be for large l use compose_mod instead */ /* compute coarse distinct-degree factorisation */ nmod_poly_set(H[0], h[l]); nmod_poly_set(reducedH0, H[0]); d= 1; for (j = 0; j < m; j++) { /* compute giant steps: H[j]=x^{p^(lj)}mod s */ if (j > 0) { nmod_poly_rem (reducedH0, reducedH0, v); nmod_poly_rem (tmp, H[j - 1], v); nmod_poly_compose_mod_brent_kung_preinv(H[j], tmp, reducedH0, v, vinv); } /* compute interval polynomials */ nmod_poly_set_coeff_ui(I[j], 0, 1); for (i = l - 1; (i >= 0) && (2 * d <= v->length - 1); i--, d++) { nmod_poly_rem(tmp, h[i], v); nmod_poly_sub(tmp, H[j], tmp); nmod_poly_mulmod_preinv (I[j], tmp, I[j], v, vinv); } /* compute F_j=f^{[j*l+1]} * ... * f^{[j*l+l]} */ /* F_j is stored on the place of I_j */ nmod_poly_gcd(I[j], v, I[j]); if (I[j]->length > 1) { result= 0; break; } } nmod_poly_clear(f); nmod_poly_clear(reducedH0); nmod_poly_clear(v); nmod_poly_clear(vinv); nmod_poly_clear(tmp); for (i = 0; i < l + 1; i++) nmod_poly_clear(h[i]); for (i = 0; i < m; i++) { nmod_poly_clear(H[i]); nmod_poly_clear(I[i]); } flint_free (h); return result; }