/*============================================================================= 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) 2010 Sebastian Pancratz Copyright (C) 2011 Fredrik Johansson ******************************************************************************/ #include #include "flint.h" #include "fmpz.h" #include "fmpz_vec.h" #include "fmpz_poly.h" #include "fmpq_poly.h" void _fmpq_poly_compose_series_horner(fmpz * res, fmpz_t den, const fmpz * poly1, const fmpz_t den1, slong len1, const fmpz * poly2, const fmpz_t den2, slong len2, slong n) { if (fmpz_is_one(den2)) { _fmpz_poly_compose_series(res, poly1, len1, poly2, len2, n); fmpz_set(den, den1); _fmpq_poly_canonicalise(res, den, n); } else if (n == 1) { fmpz_set(res, poly1); fmpz_set(den, den1); _fmpq_poly_canonicalise(res, den, 1); } else { slong i = len1 - 1; slong lenr; fmpz_t tden; fmpz * t = _fmpz_vec_init(n); fmpz_init(tden); _fmpz_vec_zero(res, n); lenr = len2; _fmpq_poly_scalar_mul_fmpz(res, den, poly2, den2, len2, poly1 + i); _fmpq_poly_scalar_div_fmpz(res, den, res, den, len2, den1); i--; _fmpq_poly_add(res, den, res, den, len2, poly1 + i, den1, 1); _fmpq_poly_canonicalise(res, den, lenr); while (i > 0) { i--; if (lenr + len2 - 1 < n) { _fmpq_poly_mul(t, tden, res, den, lenr, poly2, den2, len2); lenr = lenr + len2 - 1; } else { _fmpq_poly_mullow(t, tden, res, den, lenr, poly2, den2, len2, n); lenr = n; } _fmpq_poly_canonicalise(t, tden, lenr); _fmpq_poly_add(res, den, t, tden, lenr, poly1 + i, den1, 1); } _fmpq_poly_canonicalise(res, den, n); _fmpz_vec_clear(t, n); fmpz_clear(tden); } } void fmpq_poly_compose_series_horner(fmpq_poly_t res, const fmpq_poly_t poly1, const fmpq_poly_t poly2, slong n) { slong len1 = poly1->length; slong len2 = poly2->length; slong lenr; if (len2 != 0 && !fmpz_is_zero(poly2->coeffs)) { flint_printf("Exception (fmpq_poly_compose_series_horner). Inner polynomial \n" "must have zero constant term.\n"); abort(); } if (len1 == 0 || n == 0) { fmpq_poly_zero(res); return; } if (len2 == 0 || len1 == 1) { fmpq_poly_fit_length(res, 1); fmpz_set(res->coeffs, poly1->coeffs); fmpz_set(res->den, poly1->den); { fmpz_t d; fmpz_init(d); fmpz_gcd(d, res->coeffs, res->den); if (!fmpz_is_one(d)) { fmpz_divexact(res->coeffs, res->coeffs, d); fmpz_divexact(res->den, res->den, d); } fmpz_clear(d); } _fmpq_poly_set_length(res, 1); _fmpq_poly_normalise(res); return; } lenr = FLINT_MIN((len1 - 1) * (len2 - 1) + 1, n); len1 = FLINT_MIN(len1, lenr); len2 = FLINT_MIN(len2, lenr); if ((res != poly1) && (res != poly2)) { fmpq_poly_fit_length(res, lenr); _fmpq_poly_compose_series_horner(res->coeffs, res->den, poly1->coeffs, poly1->den, len1, poly2->coeffs, poly2->den, len2, lenr); _fmpq_poly_set_length(res, lenr); _fmpq_poly_normalise(res); } else { fmpq_poly_t t; fmpq_poly_init2(t, lenr); _fmpq_poly_compose_series_horner(t->coeffs, t->den, poly1->coeffs, poly1->den, len1, poly2->coeffs, poly2->den, len2, lenr); _fmpq_poly_set_length(t, lenr); _fmpq_poly_normalise(t); fmpq_poly_swap(res, t); fmpq_poly_clear(t); } }