| /dports/math/p5-Math-Pari/pari-2.3.5/src/modules/ |
| H A D | part.c | 128 p1 = divri (shiftr(p1,-2), n); in estim()
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| H A D | thue.c | 345 l0 = subrr(ql, addrr(mulrr(qd, *B0), divri(dbltor(0.1),kappa))); in CF_1stPass()
375 gcoeff(lllmat, 1, 1) = grndtoi(divri(B0, BS -> Ind), &e); in LLL_1stPass()
391 l0 = divri(subrr(sqrtr(l0), l1), C); in LLL_1stPass()
745 l0 = divri(subrr(errnum(BS->delta, q), ep), absi(gel(Q,3))); in get_Bx_LLL()
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| /dports/math/p5-Math-Pari/pari-2.3.5/src/headers/ |
| H A D | pariport.h | 115 #define divriz(x,y,z) gopggz(divri,(x),(y),(z))
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| H A D | pariold.h | 174 #define ldivri (long)divri
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| H A D | paricom.h | 258 #define divriz(x,y,z) gopggz(divri,(x),(y),(z))
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| /dports/math/pari/pari-2.13.3/src/modules/ |
| H A D | part.c | 88 p1 = divri (shiftr(p1,-2), n); in estim()
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| H A D | thue.c | 354 l0 = subrr(ql, addrr(mulrr(qd, *B0), divri(dbltor(0.1),kappa))); in CF_1stPass()
390 gcoeff(lllmat, 1, 1) = grndtoi(divri(B0, BS->Ind), &e); in LLL_1stPass()
408 l0 = divri(subrr(sqrtr(l0), l1), C); in LLL_1stPass()
985 l0 = divri(subrr(errnum(BS->delta, q), ep), Q2); in get_Bx_LLL()
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| /dports/math/pari/pari-2.13.3/src/headers/ |
| H A D | pariold.h | 334 #define ldivri (long)divri
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| /dports/math/pari/pari-2.13.3/src/kernel/none/ |
| H A D | level1.h | 930 affir(x,z); affrr(divri(z, y), z); in rdiviiz()
1112 return (typ(y)==t_INT) ? divri(x,y) : divrr(x,y); in mpdiv()
1405 { pari_sp av = avma; affrr(divri(x,y),z); set_avma(av); } in divriz()
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| /dports/math/pari/pari-2.13.3/src/basemath/ |
| H A D | gen1.c | 117 z = divri(x, b); if (signe(a) < 0) togglesign(z); in mulrfrac()
121 return gerepileuptoleaf(av, divri(mulri(x,a), b)); in mulrfrac()
1066 return gerepile(av,tetpil,divri(z,gel(y,2))); in gadd()
2593 case t_INT: return divri(x,y); in gdiv()
2595 av = avma; z = divri(mulri(x,gel(y,2)), gel(y,1)); in gdiv()
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| H A D | ellanal.c | 476 affrr(addrr(gel(bb->sum, j), divri(mulri(ex, a), n)), gel(bb->sum, j)); in heegner_L1()
691 return mkcomplex(gdiv(negi(b),a2),divri(vDi,a2)); in qfb_root()
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| H A D | trans3.c | 404 GEN ak = divri(addri(nu2, sqru(k2)), mulss(n2<<2, -k)); in kbessel1()
1354 GEN S = divri(mulrr(en, rX_s_eval(polsh, -n)), powuu(n,j)); in mpveceint1()
1758 invn2 = divri(real_1(prec), sqru(nn)); lim2 = lim<<1; in czeta()
2535 z = divri(mppi(l), mpfact(m-1)); setsigne(z, sx); in polylog()
2785 return expIr(divri(mulri(mppi(prec), n), d)); in expIPifrac()
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| H A D | prime.c | 737 GEN r = divri(itor(f,LOWDEFAULTPREC), N); in isprimePL()
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| H A D | zetamult.c | 316 GEN b0 = divri(_1, powuu(i, avec[n])), z; in zetamult_interpolate2_i()
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| H A D | QX_factor.c | 142 s = addrr(s, divri(itor(sqri(c), prec), gel(bin,i+1))); in Beauzamy_bound()
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| H A D | arith1.c | 5523 R = mulrr(R, divri(addir(u1,rsqd),v)); in quadregulator()
5531 R = mulrr(R, divri(addir(u1,rsqd),v)); in quadregulator()
5541 R = logr_abs(divri(R,v)); in quadregulator()
5970 p4 = divri(Pi,d); in classno2()
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| /dports/math/p5-Math-Pari/pari-2.3.5/src/basemath/ |
| H A D | gen1.c | 825 return gerepile(av,tetpil,divri(z,gel(y,2))); in gadd()
1411 return gerepileuptoleaf(av, divri(mulri(x,gel(y,1)), gel(y,2))); in gmul()
2099 case t_INT: return divri(x,y); in gdiv()
2101 av = avma; z = divri(mulri(x,gel(y,2)), gel(y,1)); in gdiv()
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| H A D | arith1.c | 2645 reg = mulrr(reg, divri(addir(u1,rsqd),v)); in regula()
2656 if (fl) reg = mulrr(reg, divri(addir(u1,rsqd),v)); in regula()
2657 y = logr_abs(divri(reg,v)); in regula()
2962 p4 = divri(Pi,d); in classno2()
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| H A D | trans3.c | 1413 invn2 = divri(unr, mulss(nn,nn)); lim2 = lim<<1; in czeta()
1913 z = pureimag( divri(mppi(l), mpfact(m-1)) ); in polylog()
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| H A D | trans2.c | 1214 z = divri(z,p1); v = -v; in gammahs()
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| /dports/math/giacxcas/giac-1.6.0/ |
| H A D | pariinl.h | 852 return (typ(y)==t_INT) ? divri(x,y) : divrr(x,y);
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| /dports/math/p5-Math-Pari/pari-2.3.5/src/kernel/gmp/ |
| H A D | mp.c | 735 divri(GEN x, GEN y) in divri() function
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| /dports/math/pari/pari-2.13.3/src/kernel/gmp/ |
| H A D | mp.c | 711 divri(GEN x, GEN y) in divri() function
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| /dports/math/p5-Math-Pari/pari-2.3.5/src/kernel/none/ |
| H A D | level1.h | 991 return (typ(y)==t_INT) ? divri(x,y) : divrr(x,y); in mpdiv()
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| /dports/math/p5-Math-Pari/pari-2.3.5/src/language/ |
| H A D | sumiter.c | 1059 k2 = k+k; b = divri(mulri(b,mulss(d2-k2+1,d2-k2)), mulss(k2,k2+1)); in polzagreel()
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