/* glpgmp.c */ /*********************************************************************** * This code is part of GLPK (GNU Linear Programming Kit). * * Copyright (C) 2000, 2001, 2002, 2003, 2004, 2005, 2006, 2007, 2008, * 2009, 2010 Andrew Makhorin, Department for Applied Informatics, * Moscow Aviation Institute, Moscow, Russia. All rights reserved. * E-mail: . * * GLPK 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 3 of the License, or * (at your option) any later version. * * GLPK 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 GLPK. If not, see . ***********************************************************************/ #define _GLPSTD_STDIO #include "glpdmp.h" #include "glpgmp.h" #define xfault xerror #ifdef HAVE_GMP /* use GNU MP bignum library */ int gmp_pool_count(void) { return 0; } void gmp_free_mem(void) { return; } #else /* use GLPK bignum module */ static DMP *gmp_pool = NULL; static int gmp_size = 0; static unsigned short *gmp_work = NULL; void *gmp_get_atom(int size) { if (gmp_pool == NULL) gmp_pool = dmp_create_pool(); return dmp_get_atom(gmp_pool, size); } void gmp_free_atom(void *ptr, int size) { xassert(gmp_pool != NULL); dmp_free_atom(gmp_pool, ptr, size); return; } int gmp_pool_count(void) { if (gmp_pool == NULL) return 0; else return dmp_in_use(gmp_pool).lo; } unsigned short *gmp_get_work(int size) { xassert(size > 0); if (gmp_size < size) { if (gmp_size == 0) { xassert(gmp_work == NULL); gmp_size = 100; } else { xassert(gmp_work != NULL); xfree(gmp_work); } while (gmp_size < size) gmp_size += gmp_size; gmp_work = xcalloc(gmp_size, sizeof(unsigned short)); } return gmp_work; } void gmp_free_mem(void) { if (gmp_pool != NULL) dmp_delete_pool(gmp_pool); if (gmp_work != NULL) xfree(gmp_work); gmp_pool = NULL; gmp_size = 0; gmp_work = NULL; return; } /*====================================================================*/ mpz_t _mpz_init(void) { /* initialize x, and set its value to 0 */ mpz_t x; x = gmp_get_atom(sizeof(struct mpz)); x->val = 0; x->ptr = NULL; return x; } void mpz_clear(mpz_t x) { /* free the space occupied by x */ mpz_set_si(x, 0); xassert(x->ptr == NULL); /* free the number descriptor */ gmp_free_atom(x, sizeof(struct mpz)); return; } void mpz_set(mpz_t z, mpz_t x) { /* set the value of z from x */ struct mpz_seg *e, *ee, *es; if (z != x) { mpz_set_si(z, 0); z->val = x->val; xassert(z->ptr == NULL); for (e = x->ptr, es = NULL; e != NULL; e = e->next) { ee = gmp_get_atom(sizeof(struct mpz_seg)); memcpy(ee->d, e->d, 12); ee->next = NULL; if (z->ptr == NULL) z->ptr = ee; else es->next = ee; es = ee; } } return; } void mpz_set_si(mpz_t x, int val) { /* set the value of x to val */ struct mpz_seg *e; /* free existing segments, if any */ while (x->ptr != NULL) { e = x->ptr; x->ptr = e->next; gmp_free_atom(e, sizeof(struct mpz_seg)); } /* assign new value */ if (val == 0x80000000) { /* long format is needed */ x->val = -1; x->ptr = e = gmp_get_atom(sizeof(struct mpz_seg)); memset(e->d, 0, 12); e->d[1] = 0x8000; e->next = NULL; } else { /* short format is enough */ x->val = val; } return; } double mpz_get_d(mpz_t x) { /* convert x to a double, truncating if necessary */ struct mpz_seg *e; int j; double val, deg; if (x->ptr == NULL) val = (double)x->val; else { xassert(x->val != 0); val = 0.0; deg = 1.0; for (e = x->ptr; e != NULL; e = e->next) { for (j = 0; j <= 5; j++) { val += deg * (double)((int)e->d[j]); deg *= 65536.0; } } if (x->val < 0) val = - val; } return val; } double mpz_get_d_2exp(int *exp, mpz_t x) { /* convert x to a double, truncating if necessary (i.e. rounding towards zero), and returning the exponent separately; the return value is in the range 0.5 <= |d| < 1 and the exponent is stored to *exp; d*2^exp is the (truncated) x value; if x is zero, the return is 0.0 and 0 is stored to *exp; this is similar to the standard C frexp function */ struct mpz_seg *e; int j, n, n1; double val; if (x->ptr == NULL) val = (double)x->val, n = 0; else { xassert(x->val != 0); val = 0.0, n = 0; for (e = x->ptr; e != NULL; e = e->next) { for (j = 0; j <= 5; j++) { val += (double)((int)e->d[j]); val /= 65536.0, n += 16; } } if (x->val < 0) val = - val; } val = frexp(val, &n1); *exp = n + n1; return val; } void mpz_swap(mpz_t x, mpz_t y) { /* swap the values x and y efficiently */ int val; void *ptr; val = x->val, ptr = x->ptr; x->val = y->val, x->ptr = y->ptr; y->val = val, y->ptr = ptr; return; } static void normalize(mpz_t x) { /* normalize integer x that includes removing non-significant (leading) zeros and converting to short format, if possible */ struct mpz_seg *es, *e; /* if the integer is in short format, it remains unchanged */ if (x->ptr == NULL) { xassert(x->val != 0x80000000); goto done; } xassert(x->val == +1 || x->val == -1); /* find the last (most significant) non-zero segment */ es = NULL; for (e = x->ptr; e != NULL; e = e->next) { if (e->d[0] || e->d[1] || e->d[2] || e->d[3] || e->d[4] || e->d[5]) es = e; } /* if all segments contain zeros, the integer is zero */ if (es == NULL) { mpz_set_si(x, 0); goto done; } /* remove non-significant (leading) zero segments */ while (es->next != NULL) { e = es->next; es->next = e->next; gmp_free_atom(e, sizeof(struct mpz_seg)); } /* convert the integer to short format, if possible */ e = x->ptr; if (e->next == NULL && e->d[1] <= 0x7FFF && !e->d[2] && !e->d[3] && !e->d[4] && !e->d[5]) { int val; val = (int)e->d[0] + ((int)e->d[1] << 16); if (x->val < 0) val = - val; mpz_set_si(x, val); } done: return; } void mpz_add(mpz_t z, mpz_t x, mpz_t y) { /* set z to x + y */ static struct mpz_seg zero = { { 0, 0, 0, 0, 0, 0 }, NULL }; struct mpz_seg dumx, dumy, *ex, *ey, *ez, *es, *ee; int k, sx, sy, sz; unsigned int t; /* if [x] = 0 then [z] = [y] */ if (x->val == 0) { xassert(x->ptr == NULL); mpz_set(z, y); goto done; } /* if [y] = 0 then [z] = [x] */ if (y->val == 0) { xassert(y->ptr == NULL); mpz_set(z, x); goto done; } /* special case when both [x] and [y] are in short format */ if (x->ptr == NULL && y->ptr == NULL) { int xval = x->val, yval = y->val, zval = x->val + y->val; xassert(xval != 0x80000000 && yval != 0x80000000); if (!(xval > 0 && yval > 0 && zval <= 0 || xval < 0 && yval < 0 && zval >= 0)) { mpz_set_si(z, zval); goto done; } } /* convert [x] to long format, if necessary */ if (x->ptr == NULL) { xassert(x->val != 0x80000000); if (x->val >= 0) { sx = +1; t = (unsigned int)(+ x->val); } else { sx = -1; t = (unsigned int)(- x->val); } ex = &dumx; ex->d[0] = (unsigned short)t; ex->d[1] = (unsigned short)(t >> 16); ex->d[2] = ex->d[3] = ex->d[4] = ex->d[5] = 0; ex->next = NULL; } else { sx = x->val; xassert(sx == +1 || sx == -1); ex = x->ptr; } /* convert [y] to long format, if necessary */ if (y->ptr == NULL) { xassert(y->val != 0x80000000); if (y->val >= 0) { sy = +1; t = (unsigned int)(+ y->val); } else { sy = -1; t = (unsigned int)(- y->val); } ey = &dumy; ey->d[0] = (unsigned short)t; ey->d[1] = (unsigned short)(t >> 16); ey->d[2] = ey->d[3] = ey->d[4] = ey->d[5] = 0; ey->next = NULL; } else { sy = y->val; xassert(sy == +1 || sy == -1); ey = y->ptr; } /* main fragment */ sz = sx; ez = es = NULL; if (sx > 0 && sy > 0 || sx < 0 && sy < 0) { /* [x] and [y] have identical signs -- addition */ t = 0; for (; ex || ey; ex = ex->next, ey = ey->next) { if (ex == NULL) ex = &zero; if (ey == NULL) ey = &zero; ee = gmp_get_atom(sizeof(struct mpz_seg)); for (k = 0; k <= 5; k++) { t += (unsigned int)ex->d[k]; t += (unsigned int)ey->d[k]; ee->d[k] = (unsigned short)t; t >>= 16; } ee->next = NULL; if (ez == NULL) ez = ee; else es->next = ee; es = ee; } if (t) { /* overflow -- one extra digit is needed */ ee = gmp_get_atom(sizeof(struct mpz_seg)); ee->d[0] = 1; ee->d[1] = ee->d[2] = ee->d[3] = ee->d[4] = ee->d[5] = 0; ee->next = NULL; xassert(es != NULL); es->next = ee; } } else { /* [x] and [y] have different signs -- subtraction */ t = 1; for (; ex || ey; ex = ex->next, ey = ey->next) { if (ex == NULL) ex = &zero; if (ey == NULL) ey = &zero; ee = gmp_get_atom(sizeof(struct mpz_seg)); for (k = 0; k <= 5; k++) { t += (unsigned int)ex->d[k]; t += (0xFFFF - (unsigned int)ey->d[k]); ee->d[k] = (unsigned short)t; t >>= 16; } ee->next = NULL; if (ez == NULL) ez = ee; else es->next = ee; es = ee; } if (!t) { /* |[x]| < |[y]| -- result in complement coding */ sz = - sz; t = 1; for (ee = ez; ee != NULL; ee = ee->next) for (k = 0; k <= 5; k++) { t += (0xFFFF - (unsigned int)ee->d[k]); ee->d[k] = (unsigned short)t; t >>= 16; } } } /* contruct and normalize result */ mpz_set_si(z, 0); z->val = sz; z->ptr = ez; normalize(z); done: return; } void mpz_sub(mpz_t z, mpz_t x, mpz_t y) { /* set z to x - y */ if (x == y) mpz_set_si(z, 0); else { y->val = - y->val; mpz_add(z, x, y); if (y != z) y->val = - y->val; } return; } void mpz_mul(mpz_t z, mpz_t x, mpz_t y) { /* set z to x * y */ struct mpz_seg dumx, dumy, *ex, *ey, *es, *e; int sx, sy, k, nx, ny, n; unsigned int t; unsigned short *work, *wx, *wy; /* if [x] = 0 then [z] = 0 */ if (x->val == 0) { xassert(x->ptr == NULL); mpz_set_si(z, 0); goto done; } /* if [y] = 0 then [z] = 0 */ if (y->val == 0) { xassert(y->ptr == NULL); mpz_set_si(z, 0); goto done; } /* special case when both [x] and [y] are in short format */ if (x->ptr == NULL && y->ptr == NULL) { int xval = x->val, yval = y->val, sz = +1; xassert(xval != 0x80000000 && yval != 0x80000000); if (xval < 0) xval = - xval, sz = - sz; if (yval < 0) yval = - yval, sz = - sz; if (xval <= 0x7FFFFFFF / yval) { mpz_set_si(z, sz * (xval * yval)); goto done; } } /* convert [x] to long format, if necessary */ if (x->ptr == NULL) { xassert(x->val != 0x80000000); if (x->val >= 0) { sx = +1; t = (unsigned int)(+ x->val); } else { sx = -1; t = (unsigned int)(- x->val); } ex = &dumx; ex->d[0] = (unsigned short)t; ex->d[1] = (unsigned short)(t >> 16); ex->d[2] = ex->d[3] = ex->d[4] = ex->d[5] = 0; ex->next = NULL; } else { sx = x->val; xassert(sx == +1 || sx == -1); ex = x->ptr; } /* convert [y] to long format, if necessary */ if (y->ptr == NULL) { xassert(y->val != 0x80000000); if (y->val >= 0) { sy = +1; t = (unsigned int)(+ y->val); } else { sy = -1; t = (unsigned int)(- y->val); } ey = &dumy; ey->d[0] = (unsigned short)t; ey->d[1] = (unsigned short)(t >> 16); ey->d[2] = ey->d[3] = ey->d[4] = ey->d[5] = 0; ey->next = NULL; } else { sy = y->val; xassert(sy == +1 || sy == -1); ey = y->ptr; } /* determine the number of digits of [x] */ nx = n = 0; for (e = ex; e != NULL; e = e->next) for (k = 0; k <= 5; k++) { n++; if (e->d[k]) nx = n; } xassert(nx > 0); /* determine the number of digits of [y] */ ny = n = 0; for (e = ey; e != NULL; e = e->next) for (k = 0; k <= 5; k++) { n++; if (e->d[k]) ny = n; } xassert(ny > 0); /* we need working array containing at least nx+ny+ny places */ work = gmp_get_work(nx+ny+ny); /* load digits of [x] */ wx = &work[0]; for (n = 0; n < nx; n++) wx[ny+n] = 0; for (n = 0, e = ex; e != NULL; e = e->next) for (k = 0; k <= 5; k++, n++) if (e->d[k]) wx[ny+n] = e->d[k]; /* load digits of [y] */ wy = &work[nx+ny]; for (n = 0; n < ny; n++) wy[n] = 0; for (n = 0, e = ey; e != NULL; e = e->next) for (k = 0; k <= 5; k++, n++) if (e->d[k]) wy[n] = e->d[k]; /* compute [x] * [y] */ bigmul(nx, ny, wx, wy); /* construct and normalize result */ mpz_set_si(z, 0); z->val = sx * sy; es = NULL; k = 6; for (n = 0; n < nx+ny; n++) { if (k > 5) { e = gmp_get_atom(sizeof(struct mpz_seg)); e->d[0] = e->d[1] = e->d[2] = 0; e->d[3] = e->d[4] = e->d[5] = 0; e->next = NULL; if (z->ptr == NULL) z->ptr = e; else es->next = e; es = e; k = 0; } es->d[k++] = wx[n]; } normalize(z); done: return; } void mpz_neg(mpz_t z, mpz_t x) { /* set z to 0 - x */ mpz_set(z, x); z->val = - z->val; return; } void mpz_abs(mpz_t z, mpz_t x) { /* set z to the absolute value of x */ mpz_set(z, x); if (z->val < 0) z->val = - z->val; return; } void mpz_div(mpz_t q, mpz_t r, mpz_t x, mpz_t y) { /* divide x by y, forming quotient q and/or remainder r if q = NULL then quotient is not stored; if r = NULL then remainder is not stored the sign of quotient is determined as in algebra while the sign of remainder is the same as the sign of dividend: +26 : +7 = +3, remainder is +5 -26 : +7 = -3, remainder is -5 +26 : -7 = -3, remainder is +5 -26 : -7 = +3, remainder is -5 */ struct mpz_seg dumx, dumy, *ex, *ey, *es, *e; int sx, sy, k, nx, ny, n; unsigned int t; unsigned short *work, *wx, *wy; /* divide by zero is not allowed */ if (y->val == 0) { xassert(y->ptr == NULL); xfault("mpz_div: divide by zero not allowed\n"); } /* if [x] = 0 then [q] = [r] = 0 */ if (x->val == 0) { xassert(x->ptr == NULL); if (q != NULL) mpz_set_si(q, 0); if (r != NULL) mpz_set_si(r, 0); goto done; } /* special case when both [x] and [y] are in short format */ if (x->ptr == NULL && y->ptr == NULL) { int xval = x->val, yval = y->val; xassert(xval != 0x80000000 && yval != 0x80000000); if (q != NULL) mpz_set_si(q, xval / yval); if (r != NULL) mpz_set_si(r, xval % yval); goto done; } /* convert [x] to long format, if necessary */ if (x->ptr == NULL) { xassert(x->val != 0x80000000); if (x->val >= 0) { sx = +1; t = (unsigned int)(+ x->val); } else { sx = -1; t = (unsigned int)(- x->val); } ex = &dumx; ex->d[0] = (unsigned short)t; ex->d[1] = (unsigned short)(t >> 16); ex->d[2] = ex->d[3] = ex->d[4] = ex->d[5] = 0; ex->next = NULL; } else { sx = x->val; xassert(sx == +1 || sx == -1); ex = x->ptr; } /* convert [y] to long format, if necessary */ if (y->ptr == NULL) { xassert(y->val != 0x80000000); if (y->val >= 0) { sy = +1; t = (unsigned int)(+ y->val); } else { sy = -1; t = (unsigned int)(- y->val); } ey = &dumy; ey->d[0] = (unsigned short)t; ey->d[1] = (unsigned short)(t >> 16); ey->d[2] = ey->d[3] = ey->d[4] = ey->d[5] = 0; ey->next = NULL; } else { sy = y->val; xassert(sy == +1 || sy == -1); ey = y->ptr; } /* determine the number of digits of [x] */ nx = n = 0; for (e = ex; e != NULL; e = e->next) for (k = 0; k <= 5; k++) { n++; if (e->d[k]) nx = n; } xassert(nx > 0); /* determine the number of digits of [y] */ ny = n = 0; for (e = ey; e != NULL; e = e->next) for (k = 0; k <= 5; k++) { n++; if (e->d[k]) ny = n; } xassert(ny > 0); /* if nx < ny then [q] = 0 and [r] = [x] */ if (nx < ny) { if (r != NULL) mpz_set(r, x); if (q != NULL) mpz_set_si(q, 0); goto done; } /* we need working array containing at least nx+ny+1 places */ work = gmp_get_work(nx+ny+1); /* load digits of [x] */ wx = &work[0]; for (n = 0; n < nx; n++) wx[n] = 0; for (n = 0, e = ex; e != NULL; e = e->next) for (k = 0; k <= 5; k++, n++) if (e->d[k]) wx[n] = e->d[k]; /* load digits of [y] */ wy = &work[nx+1]; for (n = 0; n < ny; n++) wy[n] = 0; for (n = 0, e = ey; e != NULL; e = e->next) for (k = 0; k <= 5; k++, n++) if (e->d[k]) wy[n] = e->d[k]; /* compute quotient and remainder */ xassert(wy[ny-1] != 0); bigdiv(nx-ny, ny, wx, wy); /* construct and normalize quotient */ if (q != NULL) { mpz_set_si(q, 0); q->val = sx * sy; es = NULL; k = 6; for (n = ny; n <= nx; n++) { if (k > 5) { e = gmp_get_atom(sizeof(struct mpz_seg)); e->d[0] = e->d[1] = e->d[2] = 0; e->d[3] = e->d[4] = e->d[5] = 0; e->next = NULL; if (q->ptr == NULL) q->ptr = e; else es->next = e; es = e; k = 0; } es->d[k++] = wx[n]; } normalize(q); } /* construct and normalize remainder */ if (r != NULL) { mpz_set_si(r, 0); r->val = sx; es = NULL; k = 6; for (n = 0; n < ny; n++) { if (k > 5) { e = gmp_get_atom(sizeof(struct mpz_seg)); e->d[0] = e->d[1] = e->d[2] = 0; e->d[3] = e->d[4] = e->d[5] = 0; e->next = NULL; if (r->ptr == NULL) r->ptr = e; else es->next = e; es = e; k = 0; } es->d[k++] = wx[n]; } normalize(r); } done: return; } void mpz_gcd(mpz_t z, mpz_t x, mpz_t y) { /* set z to the greatest common divisor of x and y */ /* in case of arbitrary integers GCD(x, y) = GCD(|x|, |y|), and, in particular, GCD(0, 0) = 0 */ mpz_t u, v, r; mpz_init(u); mpz_init(v); mpz_init(r); mpz_abs(u, x); mpz_abs(v, y); while (mpz_sgn(v)) { mpz_div(NULL, r, u, v); mpz_set(u, v); mpz_set(v, r); } mpz_set(z, u); mpz_clear(u); mpz_clear(v); mpz_clear(r); return; } int mpz_cmp(mpz_t x, mpz_t y) { /* compare x and y; return a positive value if x > y, zero if x = y, or a nefative value if x < y */ static struct mpz_seg zero = { { 0, 0, 0, 0, 0, 0 }, NULL }; struct mpz_seg dumx, dumy, *ex, *ey; int cc, sx, sy, k; unsigned int t; if (x == y) { cc = 0; goto done; } /* special case when both [x] and [y] are in short format */ if (x->ptr == NULL && y->ptr == NULL) { int xval = x->val, yval = y->val; xassert(xval != 0x80000000 && yval != 0x80000000); cc = (xval > yval ? +1 : xval < yval ? -1 : 0); goto done; } /* special case when [x] and [y] have different signs */ if (x->val > 0 && y->val <= 0 || x->val == 0 && y->val < 0) { cc = +1; goto done; } if (x->val < 0 && y->val >= 0 || x->val == 0 && y->val > 0) { cc = -1; goto done; } /* convert [x] to long format, if necessary */ if (x->ptr == NULL) { xassert(x->val != 0x80000000); if (x->val >= 0) { sx = +1; t = (unsigned int)(+ x->val); } else { sx = -1; t = (unsigned int)(- x->val); } ex = &dumx; ex->d[0] = (unsigned short)t; ex->d[1] = (unsigned short)(t >> 16); ex->d[2] = ex->d[3] = ex->d[4] = ex->d[5] = 0; ex->next = NULL; } else { sx = x->val; xassert(sx == +1 || sx == -1); ex = x->ptr; } /* convert [y] to long format, if necessary */ if (y->ptr == NULL) { xassert(y->val != 0x80000000); if (y->val >= 0) { sy = +1; t = (unsigned int)(+ y->val); } else { sy = -1; t = (unsigned int)(- y->val); } ey = &dumy; ey->d[0] = (unsigned short)t; ey->d[1] = (unsigned short)(t >> 16); ey->d[2] = ey->d[3] = ey->d[4] = ey->d[5] = 0; ey->next = NULL; } else { sy = y->val; xassert(sy == +1 || sy == -1); ey = y->ptr; } /* main fragment */ xassert(sx > 0 && sy > 0 || sx < 0 && sy < 0); cc = 0; for (; ex || ey; ex = ex->next, ey = ey->next) { if (ex == NULL) ex = &zero; if (ey == NULL) ey = &zero; for (k = 0; k <= 5; k++) { if (ex->d[k] > ey->d[k]) cc = +1; if (ex->d[k] < ey->d[k]) cc = -1; } } if (sx < 0) cc = - cc; done: return cc; } int mpz_sgn(mpz_t x) { /* return +1 if x > 0, 0 if x = 0, and -1 if x < 0 */ int s; s = (x->val > 0 ? +1 : x->val < 0 ? -1 : 0); return s; } int mpz_out_str(void *_fp, int base, mpz_t x) { /* output x on stream fp, as a string in given base; the base may vary from 2 to 36; return the number of bytes written, or if an error occurred, return 0 */ FILE *fp = _fp; mpz_t b, y, r; int n, j, nwr = 0; unsigned char *d; static char *set = "0123456789ABCDEFGHIJKLMNOPQRSTUVWXYZ"; if (!(2 <= base && base <= 36)) xfault("mpz_out_str: base = %d; invalid base\n", base); mpz_init(b); mpz_set_si(b, base); mpz_init(y); mpz_init(r); /* determine the number of digits */ mpz_abs(y, x); for (n = 0; mpz_sgn(y) != 0; n++) mpz_div(y, NULL, y, b); if (n == 0) n = 1; /* compute the digits */ d = xmalloc(n); mpz_abs(y, x); for (j = 0; j < n; j++) { mpz_div(y, r, y, b); xassert(0 <= r->val && r->val < base && r->ptr == NULL); d[j] = (unsigned char)r->val; } /* output the integer to the stream */ if (fp == NULL) fp = stdout; if (mpz_sgn(x) < 0) fputc('-', fp), nwr++; for (j = n-1; j >= 0; j--) fputc(set[d[j]], fp), nwr++; if (ferror(fp)) nwr = 0; mpz_clear(b); mpz_clear(y); mpz_clear(r); xfree(d); return nwr; } /*====================================================================*/ mpq_t _mpq_init(void) { /* initialize x, and set its value to 0/1 */ mpq_t x; x = gmp_get_atom(sizeof(struct mpq)); x->p.val = 0; x->p.ptr = NULL; x->q.val = 1; x->q.ptr = NULL; return x; } void mpq_clear(mpq_t x) { /* free the space occupied by x */ mpz_set_si(&x->p, 0); xassert(x->p.ptr == NULL); mpz_set_si(&x->q, 0); xassert(x->q.ptr == NULL); /* free the number descriptor */ gmp_free_atom(x, sizeof(struct mpq)); return; } void mpq_canonicalize(mpq_t x) { /* remove any factors that are common to the numerator and denominator of x, and make the denominator positive */ mpz_t f; xassert(x->q.val != 0); if (x->q.val < 0) { mpz_neg(&x->p, &x->p); mpz_neg(&x->q, &x->q); } mpz_init(f); mpz_gcd(f, &x->p, &x->q); if (!(f->val == 1 && f->ptr == NULL)) { mpz_div(&x->p, NULL, &x->p, f); mpz_div(&x->q, NULL, &x->q, f); } mpz_clear(f); return; } void mpq_set(mpq_t z, mpq_t x) { /* set the value of z from x */ if (z != x) { mpz_set(&z->p, &x->p); mpz_set(&z->q, &x->q); } return; } void mpq_set_si(mpq_t x, int p, unsigned int q) { /* set the value of x to p/q */ if (q == 0) xfault("mpq_set_si: zero denominator not allowed\n"); mpz_set_si(&x->p, p); xassert(q <= 0x7FFFFFFF); mpz_set_si(&x->q, q); return; } double mpq_get_d(mpq_t x) { /* convert x to a double, truncating if necessary */ int np, nq; double p, q; p = mpz_get_d_2exp(&np, &x->p); q = mpz_get_d_2exp(&nq, &x->q); return ldexp(p / q, np - nq); } void mpq_set_d(mpq_t x, double val) { /* set x to val; there is no rounding, the conversion is exact */ int s, n, d, j; double f; mpz_t temp; xassert(-DBL_MAX <= val && val <= +DBL_MAX); mpq_set_si(x, 0, 1); if (val > 0.0) s = +1; else if (val < 0.0) s = -1; else goto done; f = frexp(fabs(val), &n); /* |val| = f * 2^n, where 0.5 <= f < 1.0 */ mpz_init(temp); while (f != 0.0) { f *= 16.0, n -= 4; d = (int)f; xassert(0 <= d && d <= 15); f -= (double)d; /* x := 16 * x + d */ mpz_set_si(temp, 16); mpz_mul(&x->p, &x->p, temp); mpz_set_si(temp, d); mpz_add(&x->p, &x->p, temp); } mpz_clear(temp); /* x := x * 2^n */ if (n > 0) { for (j = 1; j <= n; j++) mpz_add(&x->p, &x->p, &x->p); } else if (n < 0) { for (j = 1; j <= -n; j++) mpz_add(&x->q, &x->q, &x->q); mpq_canonicalize(x); } if (s < 0) mpq_neg(x, x); done: return; } void mpq_add(mpq_t z, mpq_t x, mpq_t y) { /* set z to x + y */ mpz_t p, q; mpz_init(p); mpz_init(q); mpz_mul(p, &x->p, &y->q); mpz_mul(q, &x->q, &y->p); mpz_add(p, p, q); mpz_mul(q, &x->q, &y->q); mpz_set(&z->p, p); mpz_set(&z->q, q); mpz_clear(p); mpz_clear(q); mpq_canonicalize(z); return; } void mpq_sub(mpq_t z, mpq_t x, mpq_t y) { /* set z to x - y */ mpz_t p, q; mpz_init(p); mpz_init(q); mpz_mul(p, &x->p, &y->q); mpz_mul(q, &x->q, &y->p); mpz_sub(p, p, q); mpz_mul(q, &x->q, &y->q); mpz_set(&z->p, p); mpz_set(&z->q, q); mpz_clear(p); mpz_clear(q); mpq_canonicalize(z); return; } void mpq_mul(mpq_t z, mpq_t x, mpq_t y) { /* set z to x * y */ mpz_mul(&z->p, &x->p, &y->p); mpz_mul(&z->q, &x->q, &y->q); mpq_canonicalize(z); return; } void mpq_div(mpq_t z, mpq_t x, mpq_t y) { /* set z to x / y */ mpz_t p, q; if (mpq_sgn(y) == 0) xfault("mpq_div: zero divisor not allowed\n"); mpz_init(p); mpz_init(q); mpz_mul(p, &x->p, &y->q); mpz_mul(q, &x->q, &y->p); mpz_set(&z->p, p); mpz_set(&z->q, q); mpz_clear(p); mpz_clear(q); mpq_canonicalize(z); return; } void mpq_neg(mpq_t z, mpq_t x) { /* set z to 0 - x */ mpq_set(z, x); mpz_neg(&z->p, &z->p); return; } void mpq_abs(mpq_t z, mpq_t x) { /* set z to the absolute value of x */ mpq_set(z, x); mpz_abs(&z->p, &z->p); xassert(mpz_sgn(&x->q) > 0); return; } int mpq_cmp(mpq_t x, mpq_t y) { /* compare x and y; return a positive value if x > y, zero if x = y, or a nefative value if x < y */ mpq_t temp; int s; mpq_init(temp); mpq_sub(temp, x, y); s = mpq_sgn(temp); mpq_clear(temp); return s; } int mpq_sgn(mpq_t x) { /* return +1 if x > 0, 0 if x = 0, and -1 if x < 0 */ int s; s = mpz_sgn(&x->p); xassert(mpz_sgn(&x->q) > 0); return s; } int mpq_out_str(void *_fp, int base, mpq_t x) { /* output x on stream fp, as a string in given base; the base may vary from 2 to 36; output is in the form 'num/den' or if the denominator is 1 then just 'num'; if the parameter fp is a null pointer, stdout is assumed; return the number of bytes written, or if an error occurred, return 0 */ FILE *fp = _fp; int nwr; if (!(2 <= base && base <= 36)) xfault("mpq_out_str: base = %d; invalid base\n", base); if (fp == NULL) fp = stdout; nwr = mpz_out_str(fp, base, &x->p); if (x->q.val == 1 && x->q.ptr == NULL) ; else { fputc('/', fp), nwr++; nwr += mpz_out_str(fp, base, &x->q); } if (ferror(fp)) nwr = 0; return nwr; } #endif /* eof */