Searched refs:infty (Results 1 – 3 of 3) sorted by relevance
1027 BN_ULONG infty; in ecp_nistz256_points_mul() local1083 infty = 0 - is_zero(infty); in ecp_nistz256_points_mul()1084 infty = ~infty; in ecp_nistz256_points_mul()1086 p.p.Z[0] = ONE[0] & infty; in ecp_nistz256_points_mul()1087 p.p.Z[1] = ONE[1] & infty; in ecp_nistz256_points_mul()1088 p.p.Z[2] = ONE[2] & infty; in ecp_nistz256_points_mul()1089 p.p.Z[3] = ONE[3] & infty; in ecp_nistz256_points_mul()1091 p.p.Z[4] = ONE[4] & infty; in ecp_nistz256_points_mul()1092 p.p.Z[5] = ONE[5] & infty; in ecp_nistz256_points_mul()1093 p.p.Z[6] = ONE[6] & infty; in ecp_nistz256_points_mul()[all …]
1883 … $\int_0^\infty[\exp(-ct)dt/(t)^{1/2}(1+t^2)]$ and Similar Integrals 480--481
14161 …title = "Recurrence Relations for the {Fresnel} Integral $\int_0^\infty[\exp(-ct)dt/(t)^{1/…14174 …abstract = "The class of functions defined by $\int_0^\infty[\exp(- cX)dt/(1+Y)(t^{1/2})^k]$ w…15440 …infty)$-stable formulas. Three criteria are given for A$(0)$-stability. It is shown that (1) for $…15633 …ut {\tt sum from i=0 to infinity x sub i=pi over 2} produces $\sum_{i=0}^\infty x_i = \pi/2$. The …