/* mpfr_rem1 -- internal function mpfr_fmod -- compute the floating-point remainder of x/y mpfr_remquo and mpfr_remainder -- argument reduction functions Copyright 2007-2019 Free Software Foundation, Inc. Contributed by the AriC and Caramba projects, INRIA. This file is part of the GNU MPFR Library. The GNU MPFR Library is free software; you can redistribute it and/or modify it under the terms of the GNU Lesser General Public License as published by the Free Software Foundation; either version 3 of the License, or (at your option) any later version. The GNU MPFR Library 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 Lesser General Public License for more details. You should have received a copy of the GNU Lesser General Public License along with the GNU MPFR Library; see the file COPYING.LESSER. If not, see https://www.gnu.org/licenses/ or write to the Free Software Foundation, Inc., 51 Franklin St, Fifth Floor, Boston, MA 02110-1301, USA. */ # include "mpfr-impl.h" /* we return as many bits as we can, keeping just one bit for the sign */ # define WANTED_BITS (sizeof(long) * CHAR_BIT - 1) /* rem1 works as follows: The first rounding mode rnd_q indicate if we are actually computing a fmod (MPFR_RNDZ) or a remainder/remquo (MPFR_RNDN). Let q = x/y rounded to an integer in the direction rnd_q. Put x - q*y in rem, rounded according to rnd. If quo is not null, the value stored in *quo has the sign of q, and agrees with q with the 2^n low order bits. In other words, *quo = q (mod 2^n) and *quo q >= 0. If rem is zero, then it has the sign of x. The returned 'int' is the inexact flag giving the place of rem wrt x - q*y. If x or y is NaN: *quo is undefined, rem is NaN. If x is Inf, whatever y: *quo is undefined, rem is NaN. If y is Inf, x not NaN nor Inf: *quo is 0, rem is x. If y is 0, whatever x: *quo is undefined, rem is NaN. If x is 0, whatever y (not NaN nor 0): *quo is 0, rem is x. Otherwise if x and y are neither NaN, Inf nor 0, q is always defined, thus *quo is. Since |x - q*y| <= y/2, no overflow is possible. Only an underflow is possible when y is very small. */ static int mpfr_rem1 (mpfr_ptr rem, long *quo, mpfr_rnd_t rnd_q, mpfr_srcptr x, mpfr_srcptr y, mpfr_rnd_t rnd) { mpfr_exp_t ex, ey; int compare, inex, q_is_odd, sign, signx = MPFR_SIGN (x); mpz_t mx, my, r; int tiny = 0; MPFR_ASSERTD (rnd_q == MPFR_RNDN || rnd_q == MPFR_RNDZ); if (MPFR_UNLIKELY (MPFR_IS_SINGULAR (x) || MPFR_IS_SINGULAR (y))) { if (MPFR_IS_NAN (x) || MPFR_IS_NAN (y) || MPFR_IS_INF (x) || MPFR_IS_ZERO (y)) { /* for remquo, quo is undefined */ MPFR_SET_NAN (rem); MPFR_RET_NAN; } else /* either y is Inf and x is 0 or non-special, or x is 0 and y is non-special, in both cases the quotient is zero. */ { if (quo) *quo = 0; return mpfr_set (rem, x, rnd); } } /* now neither x nor y is NaN, Inf or zero */ mpz_init (mx); mpz_init (my); mpz_init (r); ex = mpfr_get_z_2exp (mx, x); /* x = mx*2^ex */ ey = mpfr_get_z_2exp (my, y); /* y = my*2^ey */ /* to get rid of sign problems, we compute it separately: quo(-x,-y) = quo(x,y), rem(-x,-y) = -rem(x,y) quo(-x,y) = -quo(x,y), rem(-x,y) = -rem(x,y) thus quo = sign(x/y)*quo(|x|,|y|), rem = sign(x)*rem(|x|,|y|) */ sign = (signx == MPFR_SIGN (y)) ? 1 : -1; mpz_abs (mx, mx); mpz_abs (my, my); q_is_odd = 0; /* divide my by 2^k if possible to make operations mod my easier */ { unsigned long k = mpz_scan1 (my, 0); ey += k; mpz_fdiv_q_2exp (my, my, k); } if (ex <= ey) { /* q = x/y = mx/(my*2^(ey-ex)) */ /* First detect cases where q=0, to avoid creating a huge number my*2^(ey-ex): if sx = mpz_sizeinbase (mx, 2) and sy = mpz_sizeinbase (my, 2), we have x < 2^(ex + sx) and y >= 2^(ey + sy - 1), thus if ex + sx <= ey + sy - 1 the quotient is 0 */ if (ex + (mpfr_exp_t) mpz_sizeinbase (mx, 2) < ey + (mpfr_exp_t) mpz_sizeinbase (my, 2)) { tiny = 1; mpz_set (r, mx); mpz_set_ui (mx, 0); } else { mpz_mul_2exp (my, my, ey - ex); /* divide mx by my*2^(ey-ex) */ /* since mx > 0 and my > 0, we can use mpz_tdiv_qr in all cases */ mpz_tdiv_qr (mx, r, mx, my); /* 0 <= |r| <= |my|, r has the same sign as mx */ } if (rnd_q == MPFR_RNDN) q_is_odd = mpz_tstbit (mx, 0); if (quo) /* mx is the quotient */ { mpz_tdiv_r_2exp (mx, mx, WANTED_BITS); *quo = mpz_get_si (mx); } } else /* ex > ey */ { if (quo) /* remquo case */ /* for remquo, to get the low WANTED_BITS more bits of the quotient, we first compute R = X mod Y*2^WANTED_BITS, where X and Y are defined below. Then the low WANTED_BITS of the quotient are floor(R/Y). */ mpz_mul_2exp (my, my, WANTED_BITS); /* 2^WANTED_BITS*Y */ else if (rnd_q == MPFR_RNDN) /* remainder case */ /* Let X = mx*2^(ex-ey) and Y = my. Then both X and Y are integers. Assume X = R mod Y, then x = X*2^ey = R*2^ey mod (Y*2^ey=y). To be able to perform the rounding, we need the least significant bit of the quotient, i.e., one more bit in the remainder, which is obtained by dividing by 2Y. */ mpz_mul_2exp (my, my, 1); /* 2Y */ mpz_set_ui (r, 2); mpz_powm_ui (r, r, ex - ey, my); /* 2^(ex-ey) mod my */ mpz_mul (r, r, mx); mpz_mod (r, r, my); if (quo) /* now 0 <= r < 2^WANTED_BITS*Y */ { mpz_fdiv_q_2exp (my, my, WANTED_BITS); /* back to Y */ mpz_tdiv_qr (mx, r, r, my); /* oldr = mx*my + newr */ *quo = mpz_get_si (mx); q_is_odd = *quo & 1; } else if (rnd_q == MPFR_RNDN) /* now 0 <= r < 2Y in the remainder case */ { mpz_fdiv_q_2exp (my, my, 1); /* back to Y */ /* least significant bit of q */ q_is_odd = mpz_cmpabs (r, my) >= 0; if (q_is_odd) mpz_sub (r, r, my); } /* now 0 <= |r| < |my|, and if needed, q_is_odd is the least significant bit of q */ } if (mpz_cmp_ui (r, 0) == 0) { inex = mpfr_set_ui (rem, 0, MPFR_RNDN); /* take into account sign of x */ if (signx < 0) mpfr_neg (rem, rem, MPFR_RNDN); } else { if (rnd_q == MPFR_RNDN) { /* FIXME: the comparison 2*r < my could be done more efficiently at the mpn level */ mpz_mul_2exp (r, r, 1); /* if tiny=1, we should compare r with my*2^(ey-ex) */ if (tiny) { if (ex + (mpfr_exp_t) mpz_sizeinbase (r, 2) < ey + (mpfr_exp_t) mpz_sizeinbase (my, 2)) compare = 0; /* r*2^ex < my*2^ey */ else { mpz_mul_2exp (my, my, ey - ex); compare = mpz_cmpabs (r, my); } } else compare = mpz_cmpabs (r, my); mpz_fdiv_q_2exp (r, r, 1); compare = ((compare > 0) || ((rnd_q == MPFR_RNDN) && (compare == 0) && q_is_odd)); /* if compare != 0, we need to subtract my to r, and add 1 to quo */ if (compare) { mpz_sub (r, r, my); if (quo && (rnd_q == MPFR_RNDN)) *quo += 1; } } /* take into account sign of x */ if (signx < 0) mpz_neg (r, r); inex = mpfr_set_z_2exp (rem, r, ex > ey ? ey : ex, rnd); } if (quo) *quo *= sign; mpz_clear (mx); mpz_clear (my); mpz_clear (r); return inex; } int mpfr_remainder (mpfr_ptr rem, mpfr_srcptr x, mpfr_srcptr y, mpfr_rnd_t rnd) { return mpfr_rem1 (rem, (long *) 0, MPFR_RNDN, x, y, rnd); } int mpfr_remquo (mpfr_ptr rem, long *quo, mpfr_srcptr x, mpfr_srcptr y, mpfr_rnd_t rnd) { return mpfr_rem1 (rem, quo, MPFR_RNDN, x, y, rnd); } int mpfr_fmod (mpfr_ptr rem, mpfr_srcptr x, mpfr_srcptr y, mpfr_rnd_t rnd) { return mpfr_rem1 (rem, (long *) 0, MPFR_RNDZ, x, y, rnd); } int mpfr_fmodquo (mpfr_ptr rem, long *quo, mpfr_srcptr x, mpfr_srcptr y, mpfr_rnd_t rnd) { return mpfr_rem1 (rem, quo, MPFR_RNDZ, x, y, rnd); }