/*============================================================================= 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, 2011 Sebastian Pancratz ******************************************************************************/ #include "fmpq_poly.h" #include "fmpz_poly_q.h" void fmpz_poly_q_div(fmpz_poly_q_t rop, const fmpz_poly_q_t op1, const fmpz_poly_q_t op2) { if (fmpz_poly_q_is_zero(op2)) { flint_printf("Exception (fmpz_poly_q_div). Division by zero.\n"); abort(); } if (fmpz_poly_q_is_zero(op1)) { fmpz_poly_q_zero(rop); return; } if (op1 == op2) { fmpz_poly_q_one(rop); return; } if (rop == op1 || rop == op2) { fmpz_poly_q_t t; fmpz_poly_q_init(t); fmpz_poly_q_div(t, op1, op2); fmpz_poly_q_swap(rop, t); fmpz_poly_q_clear(t); return; } /* From here on, we know that rop, op1 and op2 refer to distinct objects in memory, and that op1 and op2 are non-zero rational functions */ /* XXX: Do not maintain the remaining part of the function separately!!! Instead, note that this is the same as the corresponding part of the multiplication code, with op2->num and op2->den swapped. The only caveat to this is that we cannot assume the leading coefficient of op2->num to be positive, and thus check for this in the very end. */ /* Denominator/ numerator equal to one? */ if (fmpz_poly_is_one(op1->den) && fmpz_poly_is_one(op2->num)) { fmpz_poly_mul(rop->num, op1->num, op2->den); fmpz_poly_set_si(rop->den, 1); return; } fmpz_poly_gcd(rop->num, op1->num, op2->num); if (fmpz_poly_is_one(rop->num)) { fmpz_poly_gcd(rop->den, op2->den, op1->den); if (fmpz_poly_is_one(rop->den)) { fmpz_poly_mul(rop->num, op1->num, op2->den); fmpz_poly_mul(rop->den, op1->den, op2->num); } else { fmpz_poly_div(rop->num, op2->den, rop->den); fmpz_poly_mul(rop->num, op1->num, rop->num); fmpz_poly_div(rop->den, op1->den, rop->den); fmpz_poly_mul(rop->den, rop->den, op2->num); } } else { fmpz_poly_gcd(rop->den, op2->den, op1->den); if (fmpz_poly_is_one(rop->den)) { fmpz_poly_div(rop->den, op2->num, rop->num); fmpz_poly_mul(rop->den, op1->den, rop->den); fmpz_poly_div(rop->num, op1->num, rop->num); fmpz_poly_mul(rop->num, rop->num, op2->den); } else { fmpz_poly_t t, u; fmpz_poly_init(t); fmpz_poly_init(u); fmpz_poly_div(t, op1->num, rop->num); fmpz_poly_div(u, op2->num, rop->num); fmpz_poly_div(rop->num, op2->den, rop->den); fmpz_poly_mul(rop->num, t, rop->num); fmpz_poly_div(rop->den, op1->den, rop->den); fmpz_poly_mul(rop->den, rop->den, u); fmpz_poly_clear(t); fmpz_poly_clear(u); } } /* XXX: Check that the numerator has the appropriate sign. */ if (fmpz_sgn(fmpz_poly_lead(rop->den)) < 0) { fmpz_poly_neg(rop->num, rop->num); fmpz_poly_neg(rop->den, rop->den); } }