| /dports/math/p5-Math-Pari/pari-2.3.5/src/functions/symbolic_operators/ |
| H A D | pp | 10 (*pol):pol:parens $1 = gaddgs($1, 1)
11 (*gen):gen:parens $1 = gaddgs($1, 1)
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| H A D | adde | 12 (*pol, small):gen:parens $1 = gaddgs($1, $2)
15 (*gen, small):gen:parens $1 = gaddgs($1, $2)
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| H A D | add | 19 (gen, small):gen gaddgs($1, $2)
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| /dports/math/pari/pari-2.13.3/src/functions/symbolic_operators/ |
| H A D | pp | 13 (*pol):pol:parens $1 = gaddgs($1, 1)
14 (*gen):gen:parens $1 = gaddgs($1, 1)
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| H A D | adde | 15 (*pol, small):gen:parens $1 = gaddgs($1, $2)
18 (*gen, small):gen:parens $1 = gaddgs($1, $2)
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| H A D | add | 20 (gen, small):gen gaddgs($1, $2)
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| /dports/math/pari/pari-2.13.3/src/basemath/ |
| H A D | hypergeom.c | 202 GEN w = gadd(gmul(gaddgs(a,k-1),u), gmul(gaddgs(qmb,1-k),v)); in hyperu_i()
882 c2 = gaddgs(bma, 1); in F21taylor1()
892 v1 = mkvec2(a, gsub(c, gaddgs(a, m))); in F21taylor1()
918 GEN F = F21taylor4(gaddgs(a,m), gaddgs(b,m), gaddgs(gadd(a,b), m), z, prec); in F21taylor4()
921 v2 = g1 = mkvec2(gaddgs(a,m), gaddgs(b,m)); in F21taylor4()
952 tmp = F21taylor5(gaddgs(a,m), gaddgs(b,m), c, z, prec); in F21taylor5()
955 g1 = mkvec2(gaddgs(a,m), gaddgs(b,m)); in F21taylor5()
975 b1 = gaddgs(gsub(a,c), 1); in F21taylor6()
978 b2 = gaddgs(gsub(b,c), 1); in F21taylor6()
979 c2 = gaddgs(bma, 1); in F21taylor6()
[all …]
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| H A D | trans3.c | 374 a = gtofp(gaddgs(gshift(nu,1), 1), prec); in kbessel2()
708 av2 = avma; S = gaddgs(q, 1); in eint1_asymp()
872 ms = gaddgs(ms, 2); in incgam_cf()
890 S = gaddgs(S,1); in incgam_cf()
976 S = gaddgs(q, 1); in incgam_asymp()
1008 S = gaddgs(q, 1); in incgam_asymp_partial()
1036 sk = gaddgs(s, k); /* |Re(sk)| <= 1/2 */ in incgamspec()
1046 GEN sj = gaddgs(s, j); in incgamspec()
2069 x2j = x2 = gsqr(x); S = gaddgs(S,1); in hurwitzp_i()
2087 GEN t = (j > 1 || fls) ? gmul(gaddgs(s, 2*j-3), gaddgs(s, 2*j-2)) : s; in init_cache()
[all …]
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| H A D | trans2.c | 529 t = gdivsg(-2, gaddgs(t,1)); in gtanh()
535 t = gdivsg(-2, gaddgs(t,1)); in gtanh()
795 av = avma; z = glog( gaddgs(gdivsg(2,gsubsg(1,x)),-1), prec ); in gatanh()
1156 for (i=1; i < N; i++) y0 = gadd(y0, garg(gaddgs(s0,i), prec0)); in cxgamma()
1165 nnx = gaddgs(s, N); a = ginv(nnx); in cxgamma()
1330 t = gmul(t, gaddgs(x, k-1)); in gadw()
1360 for (j = 1; j < k; ++j) p1 = gmul(p1, gaddgs(x_k, j)); in Qp_gamma_Dwork()
1437 if (valp(y) > 0) return gdiv(gexp(glngamma(gaddgs(y,1),prec),prec),y); in sergamma()
1444 if (!s) return gdiv(gexp(glngamma(gaddgs(y,1),prec),prec),y); in sergamma()
1914 a = gdiv(unr, gaddgs(s, nn)); /* 1 / (s+n) */ in cxpsi()
[all …]
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| H A D | trans1.c | 1635 y = gdiv(gaddgs(x,-1), gaddgs(x,1)); in palogaux()
1981 z = gdiv(y, gaddgs(gmulsg(n1, y), n2)); in sqrtnof1()
2272 GEN e1 = gexpm1(gel(y,2), prec), e = gaddgs(e1,1); in gexpm1()
2378 if (gequal0(x)) return gaddgs(x,1); in Qp_exp_safe()
2401 if (gequal0(x)) return gaddgs(x,1); in cos_p()
2701 r = gsqrt(gdiv(gmul(a1,gaddgs(r, 1)),gadd(r, x)), prec); in zellagmcx()
3292 if (prec >= LOGAGMCX_LIMIT) return logagmcx(gaddgs(x,1), prec); in cxlog1p()
3298 gel(z,2) = garg(gaddgs(x,1),prec); return z; in cxlog1p()
3307 case t_PADIC: return Qp_log(gaddgs(x,1)); in log1p_i()
3317 return glog(gaddgs(y,1),prec); in log1p_i()
[all …]
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| H A D | mellininv.c | 247 for (i = 1; i <= m; i++, mj = gaddgs(mj,1)) in Kderivsmallinit()
255 gel(M,j) = gaddgs(mj,2); in Kderivsmallinit()
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| H A D | bibli2.c | 404 if (flag) retmkvec2(gsub(gaddgs(a,1),x), gen_1); in pollaguerre_eval0()
405 return gsub(gaddgs(a,1),x); in pollaguerre_eval0()
407 av = avma; v = gen_1; u = gsub(gaddgs(a,1),x); in pollaguerre_eval0()
478 if (n == 2) return gerepileupto(av, gaddgs(x,1)); in polcyclo_eval()
1010 return gerepileupto(av, gdiv(ggamma(gaddgs(n,1), prec), gmul(A,B))); in binomial()
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| H A D | bern.c | 260 gel(B,e+2) = gaddgs(gel(B,e+2), 1); /* add x^e, in place */ in faulhaber()
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| H A D | dirichlet.c | 424 c12 = gaddgs(c2, 1); in dirpowerssum()
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| /dports/math/p5-Math-Pari/pari-2.3.5/src/basemath/ |
| H A D | trans2.c | 491 t = gdivsg(-2, gaddgs(t,1)); in gth()
498 t = gdivsg(-2, gaddgs(t,1)); in gth()
681 av = avma; p1 = glog( gaddgs(gdivsg(2,gsubsg(1,x)),-1), prec ); in gath()
1107 y = gmul(y, gaddgs(s,i)); in cxgamma()
1121 y = gadd(y, glog(gaddgs(s,i), prec)); in cxgamma()
1131 nnx = gaddgs(s, nn); in cxgamma()
1281 t = gmul(t, gaddgs(x, k-1)); in gadw()
1307 p1 = gmul(p1, gaddgs(gmulsg(p, x), j)); in gammap_Dwork()
1504 a = gdiv(unr, gaddgs(s, nn)); /* 1 / (s+n) */ in cxpsi()
1508 sum = gadd(sum, gdiv(unr, gaddgs(s, k))); in cxpsi()
[all …]
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| H A D | trans3.c | 89 p2 = gdiv(gpow(gmul2n(z,-1),n,prec), ggamma(gaddgs(n,1),prec)); in jbesselintern()
589 p1=gdivgs(gmul(gmul(gaddgs(a,k),gaddgs(a1,k)),zz),k+1); in hyperu()
626 p1=gdivgs(gmul(gmul(gaddgs(a,k),gaddgs(a1,k)),zz),k+1); in hyperu()
706 S = gdiv(gaddsg(-n,s), gaddgs(x_s,n<<1)); in incgam2()
709 S = gdiv(gaddsg(-i,s), gadd(gaddgs(x_s,i<<1),gmulsg(i,S))); in incgam2()
1439 s5 = gmul(invn2, gadd(s2, gmulsg(lim2, gaddgs(s1, lim2)))); in czeta()
1494 Ax = gsubgs(gpowgs(gaddgs(x, 1), f), 1); in twistpartialzeta()
1763 GEN t = gmul(gaddgs(s, 2*j-3), gaddgs(s, 2*j-2)); in init_cache()
2324 p1 = gdiv(trueeta(gmul2n(gaddgs(x,1),-1),prec),trueeta(x,prec)); in weberf()
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| H A D | trans1.c | 1326 if (gcmp0(x)) return gaddgs(x,1); in exp_p()
1340 if (gcmp0(x)) return gaddgs(x,1); in cos_p()
1359 if (gcmp0(x)) return gaddgs(x,1); in sin_p()
1785 y = gdiv(gaddgs(x,-1), gaddgs(x,1)); in palogaux()
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| /dports/math/p5-Math-Pari/pari-2.3.5/src/headers/ |
| H A D | paricom.h | 300 #define gaddgs(y,s) gaddsg((s),(y)) macro
309 #define gsubgs(y,s) gaddgs((y), -(s))
312 #define gaddgsz(y,s,z) gopgsz(gaddgs,(y),(s),(z))
326 #define gsubgsz(y,s,z) gopgsz(gaddgs,(y),-(s),(z))
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| H A D | pariold.h | 131 #define laddgs (long)gaddgs
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| /dports/math/p5-Math-Pari/pari-2.3.5/src/language/ |
| H A D | sumiter.c | 231 v[i] = gaddgs(v[i], 1); in forvec_next()
273 v[i] = gaddgs(v[i], 1); in forvec_next_le()
284 v[i] = gaddgs(v[i], 1); in forvec_next_le()
337 v[i] = gaddgs(v[i], 1); in forvec_next_lt()
355 v[i] = gaddgs(v[i], 1); in forvec_next_lt()
527 return gerepileupto(av0, gaddgs(x,-1)); in suminf()
621 p2 = eval(a, E); p1 = gaddgs(p2,1); x = gmul(x,p1); a = incloop(a); in prodinf1()
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| /dports/math/pari/pari-2.13.3/src/language/ |
| H A D | sumiter.c | 75 a = gaddgs(a,1); in forparii()
98 a = get_lex(-1); a = gaddgs(a,1); in forpari()
438 d->a[i] = gaddgs(d->a[i], 1); in _next()
478 d->a[i] = gaddgs(d->a[i], 1); in _next_le()
533 d->a[i] = gaddgs(d->a[i], 1); in _next_lt()
857 p2 = eval(E, a); p1 = gaddgs(p2,1); in prodinf1()
1861 return gadd(glog(x,prec), intnum((void*)A, _gi, gen_0, gaddgs(x,1), T, prec)); in _g()
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| /dports/math/pari/pari-2.13.3/src/headers/ |
| H A D | pariold.h | 292 #define laddgs (long)gaddgs
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| /dports/math/gp2c/gp2c-0.0.12/doc/ |
| H A D | gp2c.tex | 574 x = gmod(gaddgs(gsqr(x), 1), n);
575 y = gmod(gaddgs(gsqr(y), 1), n);
576 y = gmod(gaddgs(gsqr(y), 1), n);
582 The functions \pari{gsqr}, \pari{gaddgs}, \pari{gmod}, \pari{ggcd} are generic
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| /dports/math/gp2c/gp2c-0.0.12/desc/ |
| H A D | func23.dsc | 855 ${1 code} = gaddgs(${1 code}, 1)
861 ${1 code} = gaddgs(${1 code}, 1)
927 ${1 code} = gaddgs(${1 code}, ${2 code})
948 ${1 code} = gaddgs(${1 code}, ${2 code})
1048 gaddgs(${1 code}, ${2 code})
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| H A D | func25.dsc | 961 ${1 code} = gaddgs(${1 code}, 1)
967 ${1 code} = gaddgs(${1 code}, 1)
1038 ${1 code} = gaddgs(${1 code}, ${2 code})
1059 ${1 code} = gaddgs(${1 code}, ${2 code})
1164 gaddgs(${1 code}, ${2 code})
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