Annotation of OpenXM_contrib2/asir2000/builtin/pdiv.c, Revision 1.1
1.1 ! noro 1: /* $OpenXM: OpenXM/src/asir99/builtin/pdiv.c,v 1.1.1.1 1999/11/10 08:12:26 noro Exp $ */
! 2: #include "ca.h"
! 3: #include "parse.h"
! 4:
! 5: void Psdiv(), Psrem(), Ptdiv(), Psqr(), Pinva_mod();
! 6: void Psdiv_gf2n(), Psrem_gf2n();
! 7: void Psdivm(), Psremm(), Psqrm();
! 8: void Psrem_mod();
! 9: void Pugcd();
! 10: void Purem();
! 11: void Pudiv();
! 12:
! 13: struct ftab pdiv_tab[] = {
! 14: {"sdiv",Psdiv,-3},
! 15: {"srem",Psrem,-3},
! 16: {"sdiv_gf2n",Psdiv_gf2n,2},
! 17: {"srem_gf2n",Psrem_gf2n,2},
! 18: {"sqr",Psqr,-3},
! 19: {"tdiv",Ptdiv,2},
! 20: {"udiv",Pudiv,2},
! 21: {"sdivm",Psdivm,-4},
! 22: {"sremm",Psremm,-4},
! 23: {"sqrm",Psqrm,-4},
! 24: {"inva_mod",Pinva_mod,3},
! 25: {"srem_mod",Psrem_mod,3},
! 26: {"ugcd",Pugcd,2},
! 27: {"urem",Purem,2},
! 28: {0,0,0},
! 29: };
! 30:
! 31: void Psdiv(arg,rp)
! 32: NODE arg;
! 33: Obj *rp;
! 34: {
! 35: P q,r,dnd,dnd1,dvr,dvr1;
! 36: V v;
! 37: VL vl;
! 38:
! 39: asir_assert(ARG0(arg),O_P,"sdiv");
! 40: asir_assert(ARG1(arg),O_P,"sdiv");
! 41: dnd = (P)ARG0(arg); dvr = (P)ARG1(arg);
! 42: if ( argc(arg) == 3 ) {
! 43: v = VR((P)ARG2(arg));
! 44: change_mvar(CO,dnd,v,&dnd1); change_mvar(CO,dvr,v,&dvr1);
! 45: reordvar(CO,v,&vl);
! 46: divsrp(vl,dnd1,dvr1,&q,&r);
! 47: restore_mvar(CO,q,v,(P *)rp);
! 48: } else
! 49: divsrp(CO,dnd,dvr,(P *)rp,&r);
! 50: }
! 51:
! 52: void Psrem(arg,rp)
! 53: NODE arg;
! 54: Obj *rp;
! 55: {
! 56: P q,r,dnd,dnd1,dvr,dvr1;
! 57: V v;
! 58: VL vl;
! 59:
! 60: asir_assert(ARG0(arg),O_P,"srem");
! 61: asir_assert(ARG1(arg),O_P,"srem");
! 62: dnd = (P)ARG0(arg); dvr = (P)ARG1(arg);
! 63: if ( argc(arg) == 3 ) {
! 64: v = VR((P)ARG2(arg));
! 65: change_mvar(CO,dnd,v,&dnd1); change_mvar(CO,dvr,v,&dvr1);
! 66: reordvar(CO,v,&vl);
! 67: divsrp(vl,dnd1,dvr1,&q,&r);
! 68: restore_mvar(CO,r,v,(P *)rp);
! 69: } else
! 70: divsrp(CO,dnd,dvr,&q,(P *)rp);
! 71: }
! 72:
! 73: void Psqr(arg,rp)
! 74: NODE arg;
! 75: LIST *rp;
! 76: {
! 77: P q,q1,r,r1,dnd,dnd1,dvr,dvr1;
! 78: NODE n,tn;
! 79: V v;
! 80: VL vl;
! 81:
! 82: asir_assert(ARG0(arg),O_P,"sqr");
! 83: asir_assert(ARG1(arg),O_P,"sqr");
! 84: dnd = (P)ARG0(arg); dvr = (P)ARG1(arg);
! 85: if ( argc(arg) == 3 ) {
! 86: v = VR((P)ARG2(arg));
! 87: change_mvar(CO,dnd,v,&dnd1); change_mvar(CO,dvr,v,&dvr1);
! 88: reordvar(CO,v,&vl);
! 89: divsrp(vl,dnd1,dvr1,&q1,&r1);
! 90: restore_mvar(CO,q1,v,&q); restore_mvar(CO,r1,v,&r);
! 91: } else
! 92: divsrp(CO,dnd,dvr,&q,&r);
! 93: MKNODE(tn,r,0); MKNODE(n,q,tn); MKLIST(*rp,n);
! 94: }
! 95:
! 96: void Psdiv_gf2n(arg,rp)
! 97: NODE arg;
! 98: GF2N *rp;
! 99: {
! 100: GF2N dnd,dvr;
! 101: UP2 q,r;
! 102:
! 103: dnd = (GF2N)ARG0(arg); dvr = (GF2N)ARG1(arg);
! 104: if ( !dvr )
! 105: error("sdiv_gf2n : division by 0");
! 106: else if ( !dnd )
! 107: *rp = 0;
! 108: else {
! 109: qrup2(dnd->body,dvr->body,&q,&r);
! 110: MKGF2N(q,*rp);
! 111: }
! 112: }
! 113:
! 114: void Psrem_gf2n(arg,rp)
! 115: NODE arg;
! 116: GF2N *rp;
! 117: {
! 118: GF2N dnd,dvr;
! 119: UP2 q,r;
! 120:
! 121: dnd = (GF2N)ARG0(arg); dvr = (GF2N)ARG1(arg);
! 122: if ( !dvr )
! 123: error("srem_gf2n : division by 0");
! 124: else if ( !dnd )
! 125: *rp = 0;
! 126: else {
! 127: qrup2(dnd->body,dvr->body,&q,&r);
! 128: MKGF2N(r,*rp);
! 129: }
! 130: }
! 131:
! 132: void Ptdiv(arg,rp)
! 133: NODE arg;
! 134: P *rp;
! 135: {
! 136: P p1,p2,q1,q2,q,c1,c2,c;
! 137:
! 138: p1 = (P)ARG0(arg); p2 = (P)ARG1(arg);
! 139: asir_assert(p1,O_P,"tdiv");
! 140: asir_assert(p2,O_P,"tdiv");
! 141: if ( !p1 || !p2 )
! 142: *rp = 0;
! 143: else if ( (OID(p1) > O_P) || (OID(p2) > O_P ) )
! 144: *rp = 0;
! 145: else {
! 146: ptozp(p1,1,(Q *)&c1,&q1); ptozp(p2,1,(Q *)&c2,&q2);
! 147: if ( divtpz(CO,q1,q2,&q) ) {
! 148: divq((Q)c1,(Q)c2,(Q *)&c); mulp(CO,q,c,rp);
! 149: } else
! 150: *rp = 0;
! 151: }
! 152: }
! 153:
! 154: void Pudiv(arg,rp)
! 155: NODE arg;
! 156: LIST *rp;
! 157: {
! 158: P q,r,dnd,dvr;
! 159: NODE n,tn;
! 160:
! 161: asir_assert(ARG0(arg),O_P,"udiv");
! 162: asir_assert(ARG1(arg),O_P,"udiv");
! 163: dnd = (P)ARG0(arg); dvr = (P)ARG1(arg);
! 164: udivpz(dnd,dvr,&q,&r);
! 165: MKNODE(tn,r,0); MKNODE(n,q,tn); MKLIST(*rp,n);
! 166: }
! 167:
! 168: void Psdivm(arg,rp)
! 169: NODE arg;
! 170: Obj *rp;
! 171: {
! 172: P q,r,dnd,dnd1,dndm,dvr,dvr1,dvrm,t;
! 173: V v;
! 174: VL vl;
! 175: int m;
! 176:
! 177: asir_assert(ARG0(arg),O_P,"sdivm");
! 178: asir_assert(ARG1(arg),O_P,"sdivm");
! 179: asir_assert(ARG2(arg),O_N,"sdivm");
! 180: dnd = (P)ARG0(arg); dvr = (P)ARG1(arg); m = QTOS((Q)ARG2(arg));
! 181: if ( argc(arg) == 4 ) {
! 182: v = VR((P)ARG3(arg));
! 183: change_mvar(CO,dnd,v,&dnd1); change_mvar(CO,dvr,v,&dvr1);
! 184: reordvar(CO,v,&vl);
! 185: ptomp(m,dnd1,&dndm); ptomp(m,dvr1,&dvrm);
! 186: divsrmp(vl,m,dndm,dvrm,&t,&r); mptop(t,&q);
! 187: restore_mvar(CO,q,v,(P *)rp);
! 188: } else {
! 189: ptomp(m,dnd,&dndm); ptomp(m,dvr,&dvrm);
! 190: divsrmp(CO,m,dndm,dvrm,&t,&r); mptop(t,(P *)rp);
! 191: }
! 192: }
! 193:
! 194: void Psremm(arg,rp)
! 195: NODE arg;
! 196: Obj *rp;
! 197: {
! 198: P q,r,dnd,dnd1,dndm,dvr,dvr1,dvrm,t;
! 199: V v;
! 200: VL vl;
! 201: int m;
! 202:
! 203: asir_assert(ARG0(arg),O_P,"sremm");
! 204: asir_assert(ARG1(arg),O_P,"sremm");
! 205: asir_assert(ARG2(arg),O_N,"sremm");
! 206: dnd = (P)ARG0(arg); dvr = (P)ARG1(arg); m = QTOS((Q)ARG2(arg));
! 207: if ( argc(arg) == 4 ) {
! 208: v = VR((P)ARG3(arg));
! 209: change_mvar(CO,dnd,v,&dnd1); change_mvar(CO,dvr,v,&dvr1);
! 210: reordvar(CO,v,&vl);
! 211: ptomp(m,dnd1,&dndm); ptomp(m,dvr1,&dvrm);
! 212: divsrmp(vl,m,dndm,dvrm,&q,&t); mptop(t,&r);
! 213: restore_mvar(CO,r,v,(P *)rp);
! 214: } else {
! 215: ptomp(m,dnd,&dndm); ptomp(m,dvr,&dvrm);
! 216: divsrmp(CO,m,dndm,dvrm,&q,&t); mptop(t,(P *)rp);
! 217: }
! 218: }
! 219:
! 220: void Psqrm(arg,rp)
! 221: NODE arg;
! 222: LIST *rp;
! 223: {
! 224: P q,q1,r,r1,dnd,dnd1,dndm,dvr,dvr1,dvrm;
! 225: NODE n,tn;
! 226: V v;
! 227: VL vl;
! 228: int m;
! 229:
! 230: asir_assert(ARG0(arg),O_P,"sqrm");
! 231: asir_assert(ARG1(arg),O_P,"sqrm");
! 232: asir_assert(ARG2(arg),O_N,"sqrm");
! 233: dnd = (P)ARG0(arg); dvr = (P)ARG1(arg); m = QTOS((Q)ARG2(arg));
! 234: if ( argc(arg) == 4 ) {
! 235: v = VR((P)ARG3(arg));
! 236: change_mvar(CO,dnd,v,&dnd1); change_mvar(CO,dvr,v,&dvr1);
! 237: reordvar(CO,v,&vl);
! 238: ptomp(m,dnd1,&dndm); ptomp(m,dvr1,&dvrm);
! 239: divsrp(vl,dndm,dvrm,&q,&r); mptop(q,&q1); mptop(r,&r1);
! 240: restore_mvar(CO,q1,v,&q); restore_mvar(CO,r1,v,&r);
! 241: } else {
! 242: ptomp(m,dnd,&dndm); ptomp(m,dvr,&dvrm);
! 243: divsrp(CO,dnd,dvr,&q1,&r1); mptop(q1,&q); mptop(r1,&r);
! 244: }
! 245: MKNODE(tn,r,0); MKNODE(n,q,tn); MKLIST(*rp,n);
! 246: }
! 247:
! 248: void Pinva_mod(arg,rp)
! 249: NODE arg;
! 250: P *rp;
! 251: {
! 252: P dp,f;
! 253: Q q;
! 254: int n,i;
! 255: int mod;
! 256: V v;
! 257: UM wf,wdp,winv;
! 258:
! 259: asir_assert(ARG0(arg),O_P,"gcda_mod");
! 260: asir_assert(ARG1(arg),O_N,"gcda_mod");
! 261: asir_assert(ARG2(arg),O_P,"gcda_mod");
! 262: dp = (P)ARG0(arg);
! 263: mod = QTOS((Q)ARG1(arg));
! 264: f = (P)ARG2(arg);
! 265: if ( NUM(f) ) {
! 266: i = invm(rem(NM((Q)f),mod),mod);
! 267: STOQ(i,q); *rp = (P)q;
! 268: } else {
! 269: v = VR(dp);
! 270: n = MAX(UDEG(dp),UDEG(f));
! 271: wf = W_UMALLOC(n); wdp = W_UMALLOC(n);
! 272: winv = W_UMALLOC(n);
! 273: ptoum(mod,f,wf); ptoum(mod,dp,wdp);
! 274: invum(mod,wdp,wf,winv);
! 275: if ( DEG(winv) < 0 )
! 276: *rp = 0;
! 277: else {
! 278: umtop(v,winv,rp);
! 279: }
! 280: }
! 281: }
! 282:
! 283: void Psrem_mod(arg,rp)
! 284: NODE arg;
! 285: P *rp;
! 286: {
! 287: P p1,p2;
! 288: int n,dr;
! 289: int mod;
! 290: V v;
! 291: UM wp1,wp2,q;
! 292:
! 293: asir_assert(ARG0(arg),O_P,"srem_mod");
! 294: asir_assert(ARG1(arg),O_P,"srem_mod");
! 295: asir_assert(ARG2(arg),O_N,"srem_mod");
! 296: p1 = (P)ARG0(arg); p2 = (P)ARG1(arg); mod = QTOS((Q)ARG2(arg));
! 297: if ( !p1 || NUM(p1) )
! 298: *rp = p1;
! 299: else {
! 300: v = VR(p1);
! 301: n = MAX(UDEG(p1),UDEG(p2));
! 302: wp1 = W_UMALLOC(n); wp2 = W_UMALLOC(n); q = W_UMALLOC(n);
! 303: ptoum(mod,p1,wp1); ptoum(mod,p2,wp2);
! 304: dr = divum(mod,wp1,wp2,q);
! 305: if ( ( DEG(wp1) = dr ) == -1 )
! 306: *rp = 0;
! 307: else
! 308: umtop(v,wp1,rp);
! 309: }
! 310: }
! 311:
! 312: void Purem(arg,rp)
! 313: NODE arg;
! 314: P *rp;
! 315: {
! 316: asir_assert(ARG0(arg),O_P,"urem");
! 317: asir_assert(ARG1(arg),O_P,"urem");
! 318: uremp((P)ARG0(arg),(P)ARG1(arg),rp);
! 319: }
! 320:
! 321: void Pugcd(arg,rp)
! 322: NODE arg;
! 323: P *rp;
! 324: {
! 325: asir_assert(ARG0(arg),O_P,"ugcd");
! 326: asir_assert(ARG1(arg),O_P,"ugcd");
! 327: ugcdp((P)ARG0(arg),(P)ARG1(arg),rp);
! 328: }
! 329:
! 330: void invum(mod,dp,f,inv)
! 331: int mod;
! 332: UM dp,f,inv;
! 333: {
! 334: UM g1,g2,a1,a2,a3,wm,q,tum;
! 335: int d,dr;
! 336:
! 337: d = DEG(dp)+DEG(f)+10;
! 338: g1 = W_UMALLOC(d); g2 = W_UMALLOC(d); a1 = W_UMALLOC(d);
! 339: a2 = W_UMALLOC(d); a3 = W_UMALLOC(d); wm = W_UMALLOC(d);
! 340: q = W_UMALLOC(d);
! 341: DEG(a1) = 0; COEF(a1)[0] = 1; DEG(a2) = -1;
! 342: cpyum(f,g1); cpyum(dp,g2);
! 343: while ( 1 ) {
! 344: dr = divum(mod,g1,g2,q); tum = g1; g1 = g2; g2 = tum;
! 345: if ( ( DEG(g2) = dr ) == -1 )
! 346: break;
! 347: mulum(mod,a2,q,wm); subum(mod,a1,wm,a3); dr = divum(mod,a3,dp,q);
! 348: tum = a1; a1 = a2; a2 = a3; a3 = tum; DEG(a3) = dr;
! 349: }
! 350: if ( DEG(g1) != 0 )
! 351: DEG(inv) = -1;
! 352: else if ( COEF(g1)[0] != 1 )
! 353: mulsum(mod,a2,invm(COEF(g1)[0],mod),inv);
! 354: else
! 355: cpyum(a2,inv);
! 356: }
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