/dports/math/cm/cm-0.3.1/lib/class/ |
H A D | pari.c | 178 power = diviuexact (pm, *n); in good_root_of_unity() 226 expo = diviuexact (subis (powiu (pp, (unsigned long int) deg_factor), 1), in cm_pari_onefactor()
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/dports/math/pari/pari-2.13.3/src/basemath/ |
H A D | FlxqE.c | 1071 q = diviuexact(q,p); N--; in Flxq_ellcard_Harley() 1289 m = diviuexact(subiu(powuu(p,n), 1), p-1); in Flxq_ellcard_Shanks() 1469 W = Flxq_pow(a6,diviuexact(shifti(q,-1), 3),T,p); in Flxq_ellcardj() 1478 GEN u = shifti(t,-1), v = sqrtint(diviuexact(subii(q,sqri(u)),3)); in Flxq_ellcardj()
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H A D | F2xqE.c | 805 u = F2xq_pow(a3,diviuexact(subiu(shifti(q,1), 1), 3),T); in F2xq_elltracej() 816 if (F2x_degree(F2xq_pow(a3,diviuexact(subiu(q, 1), 3),T))==0) in F2xq_elltracej()
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H A D | bibli2.c | 196 a = diviuexact(muluui(n-2*m+2, n-2*m+1, a), 4*m); in polhermite() 1043 gel(C,k) = gerepileuptoint(av, diviuexact(mului(n-k+1, gel(C,k-1)), k)); in vecbinomial() 1068 bmk = diviuexact(mului(m-k+1, bmk), k); in stirling2() 1083 bmk = diviuexact(mului(k+1, bmk), k); in stirling2()
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H A D | zetamult.c | 242 C = diviuexact(muliu(C, m-n+1), h+n); in zetamult_Zagier() 295 C = diviuexact(muliu(C, j-u), u+1); in zetamult_interpolate2_i()
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H A D | ZX.c | 193 for(i=2; i<l; i++) gel(z,i) = diviuexact(gel(y,i),x); in ZX_divuexact() 401 gel(C,k+2) = diviuexact(mului(n-k+1, gel(C,k+1)), k); in Z_Xpm1_powu()
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H A D | FpE.c | 1230 e = diviuexact(shifti(p,-1), 3); /* (p-1) / 6 */ in ap_j0() 1932 W = FpXQ_pow(a6,diviuexact(shifti(q,-1), 3),T,p); in FpXQ_ellcardj() 1941 GEN u = shifti(t,-1), v = sqrtint(diviuexact(subii(q,sqri(u)),3)); in FpXQ_ellcardj()
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H A D | lfunquad.c | 45 c = diviuexact(muliu(c, t - 2*k), 2*k + 2); in vecRCpol()
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H A D | gen1.c | 393 gel(q,1) = diviuexact(x,t); in Qdivii() 394 gel(q,2) = diviuexact(y,t); in Qdivii() 425 retmkfrac(diviuexact(x,t), utoipos(y / t)); in Qdiviu() 451 if (t != 1) { x = diviuexact(x,t); y /= t; } else x = icopy(x); in Qdivis()
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H A D | Qfb.c | 1183 c = diviuexact(shifti(subii(sqru(b), x), -2), p); in primeform_u() 1278 C = addii(b, N); if (aN > 1) C = diviuexact(C, aN); in normforms()
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H A D | alglin2.c | 242 C = diviuexact(mulsi(k-n,C), k+1); /* (-1)^k binomial(n,k) */ in caract() 996 bin = diviuexact(muliu(bin, k), n-k+1); in charpoly_bound()
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H A D | FpX_factor.c | 565 power = diviuexact (pm, n); in good_root_of_unity() 595 expo = diviuexact(subiu(p, 1), n); in FpX_oneroot_split()
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H A D | ecpp.c | 576 GEN n = diviuexact(subiu(N, 1), 3); in j0_find_g()
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H A D | arith1.c | 246 z = Fp_pow(z, diviuexact(subiu(p,1), n), p); /* prim. n-th root of 1 */ in rootsof1u_Fp() 3147 ulong a = Fl_inv(umodiu(diviuexact(gel(y,i),x[i]), x[i]), x[i]); in ZV_invdivexact() 4795 a = diviuexact(addii(shifti(a,1),b), 5); in fibo() 6124 s = shifti(diviuexact(s, 3), 6); in tauprime()
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H A D | ZV.c | 894 { pari_APPLY_type(t_COL, diviuexact(gel(x,i), c)) } in ZC_u_divexact()
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H A D | polarit3.c | 3121 return gerepileuptoint(av, diviuexact(s, n)); in ffnbirred() 3143 t = gerepileuptoint(av2, addii(t, diviuexact(s, i))); in ffsumnbirred()
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H A D | elliptic.c | 3182 M->b4 = diviuexact(subui(b22, M->c4), 24); in min_set_b() 3183 M->b6 = diviuexact(subii(mulsi(b2, subiu(mului(36,M->b4),b22)), M->c6), 216); in min_set_b() 3246 r = diviuexact(subii(mulis(M->u2,M->b2), ell_get_b2(E)), 12); in min_get_v()
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H A D | FpXX.c | 1838 gel(y,i) = Fp_divu(diviuexact(xi, upowuu(pp, v)), j, p); in ZlXX_integXn()
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H A D | modsym.c | 3709 GEN powb = Fp_powers(diviuexact(subui(a, gel(teich,a)), p), n, pn); in mspadicinit() 4923 GEN D = diviuexact(ZV_lcm(identity_ZV(n+1)), n+1); in binomial_init()
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/dports/math/pari/pari-2.13.3/src/kernel/gmp/ |
H A D | mp.c | 1096 diviuexact(GEN x, ulong y) in diviuexact() function 1142 if (!hiremainder) return diviuexact(x, t); in diviuuexact()
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/dports/math/pari/pari-2.13.3/src/kernel/none/ |
H A D | mp.c | 1116 diviuexact(GEN x, ulong y) in diviuexact() function 1234 if (!hiremainder) return diviuexact(x, t); in diviuuexact()
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/dports/math/p5-Math-Pari/pari-2.3.5/src/kernel/gmp/ |
H A D | mp.c | 1058 diviuexact(GEN x, ulong y) in diviuexact() function
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/dports/math/p5-Math-Pari/pari-2.3.5/src/basemath/ |
H A D | Qfb.c | 1002 c = diviuexact(shifti(subii(sqru(b), x), -2), p); in primeform_u()
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/dports/math/p5-Math-Pari/pari-2.3.5/src/kernel/none/ |
H A D | mp.c | 1081 diviuexact(GEN x, ulong y) in diviuexact() function
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/dports/math/p5-Math-Pari/pari-2.3.5/src/modules/ |
H A D | elliptic.c | 1568 r = negi( diviuexact(r, 3) ); in localred_p() 2883 e = diviuexact(shifti(p,-1), 3); /* (p-1) / 6 */ in ap_j0()
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