Searched refs:kappa (Results 1 – 11 of 11) sorted by relevance
191 int* kappa) { in RoundWeedCounted() argument223 (*kappa) += 1; in RoundWeedCounted()390 int* kappa) { in DigitGen() argument427 *kappa = divisor_exponent + 1; in DigitGen()433 while (*kappa > 0) { in DigitGen()438 (*kappa)--; in DigitGen()473 (*kappa)--; in DigitGen()515 int* kappa) { in DigitGenCounted() argument535 *kappa = divisor_exponent + 1; in DigitGenCounted()542 while (*kappa > 0) { in DigitGenCounted()[all …]
190 int* kappa) { in RoundWeedCounted() argument222 (*kappa) += 1; in RoundWeedCounted()391 int* kappa) { in DigitGen() argument428 *kappa = divisor_exponent + 1; in DigitGen()434 while (*kappa > 0) { in DigitGen()439 (*kappa)--; in DigitGen()474 (*kappa)--; in DigitGen()516 int* kappa) { in DigitGenCounted() argument536 *kappa = divisor_exponent + 1; in DigitGenCounted()543 while (*kappa > 0) { in DigitGenCounted()[all …]
901 ulong32 kappa[MAX_N]; in _anubis_setup() local933 kappa[i] = in _anubis_setup()947 K0 = T4[(kappa[N - 1] >> 24) & 0xff]; in _anubis_setup()948 K1 = T4[(kappa[N - 1] >> 16) & 0xff]; in _anubis_setup()949 K2 = T4[(kappa[N - 1] >> 8) & 0xff]; in _anubis_setup()950 K3 = T4[(kappa[N - 1] ) & 0xff]; in _anubis_setup()952 K0 = T4[(kappa[i] >> 24) & 0xff] ^ in _anubis_setup()957 K1 = T4[(kappa[i] >> 16) & 0xff] ^ in _anubis_setup()962 K2 = T4[(kappa[i] >> 8) & 0xff] ^ in _anubis_setup()967 K3 = T4[(kappa[i] ) & 0xff] ^ in _anubis_setup()[all …]
502 float kappa = 2.*KAPPA * sign * offset * angles[i]; in make_circle() local506 o->x2 = circle[i][0] - normals[i][1]*kappa; in make_circle()507 o->y2 = circle[i][1] + normals[i][0]*kappa; in make_circle()508 o->x3 = circle[i+1][0] + normals[i+1][1]*kappa; in make_circle()509 o->y3 = circle[i+1][1] - normals[i+1][0]*kappa; in make_circle()
169 # kappa 954
129 def : NCR<"kappa", 0x003BA>;
606 more importantly, it can be shown that :math:`\kappa(S)\leq607 \kappa(H)`. Cseres implements PCG on :math:`S` as the650 :math:`\sqrt{\kappa(H)}`, where, :math:`\kappa(H)` is the condition652 :math:`\kappa(H)` is high and a direct application of Conjugate661 matrix :math:`\kappa(M^{-1}A)`.667 so that the condition number :math:`\kappa(HM^{-1})` is low, and the669 preconditioner would be one for which :math:`\kappa(M^{-1}A)
1214 "kappa;","U+003BA"
15535 kappa kap@