#if !defined(TORCH_STABLE_ONLY) && !defined(TORCH_TARGET_VERSION) #pragma once #include #include #include using namespace c10::metal; using namespace metal; namespace c10 { namespace metal { template inline float log_gamma(const T); inline float expm1f(float a); template float erfc(T x); } // namespace metal } // namespace c10 namespace { template inline float lgamma(const T a) { return log_gamma(a); } inline float expm1(float a) { return expm1f(a); } // NOTE: The following code was ported directly from the CUDA implementation in // `aten/src/ATen/native/cuda/IGammaKernel.cu` /* * This implementation of the regularized incomplete gamma functions and * their helper functions are derived from the implementation of SciPy's * gammainc, Cephes's igam and igamc, and Boost's Lanczos approximations. * See NOTICE for the licenses. */ // regularized lower & upper incomplete gamma template scalar_t ratevl( scalar_t x, const scalar_t num[], int64_t M, const scalar_t denom[], int64_t N) { // evaluating rational function, i.e., the ratio of two polynomials // the coefficients for numerator are given by `num` while coeffs for // denumerator are given by `denom` using accscalar_t = opmath_t; int64_t i, dir; accscalar_t y, num_ans, denom_ans; accscalar_t absx = ::fabs(x); thread const accscalar_t* p; if (absx > 1) { /* Evaluate as a polynomial in 1/x. */ dir = -1; p = num + M; y = 1 / x; } else { dir = 1; p = num; y = x; } /* Evaluate the numerator */ num_ans = *p; p += dir; for (i = 1; i <= M; i++) { num_ans = num_ans * y + *p; p += dir; } /* Evaluate the denominator */ if (absx > 1) { p = denom + N; } else { p = denom; } denom_ans = *p; p += dir; for (i = 1; i <= N; i++) { denom_ans = denom_ans * y + *p; p += dir; } if (absx > 1) { i = N - M; return ::pow(x, static_cast(i)) * num_ans / denom_ans; } else { return num_ans / denom_ans; } } template scalar_t lanczos_sum_expg_scaled(scalar_t x) { // lanczos approximation using accscalar_t = opmath_t; const accscalar_t lanczos_sum_expg_scaled_num[13] = { 0.006061842346248906525783753964555936883222, 0.5098416655656676188125178644804694509993, 19.51992788247617482847860966235652136208, 449.9445569063168119446858607650988409623, 6955.999602515376140356310115515198987526, 75999.29304014542649875303443598909137092, 601859.6171681098786670226533699352302507, 3481712.15498064590882071018964774556468, 14605578.08768506808414169982791359218571, 43338889.32467613834773723740590533316085, 86363131.28813859145546927288977868422342, 103794043.1163445451906271053616070238554, 56906521.91347156388090791033559122686859}; const accscalar_t lanczos_sum_expg_scaled_denom[13] = { 1., 66., 1925., 32670., 357423., 2637558., 13339535., 45995730., 105258076., 150917976., 120543840., 39916800., 0}; return ratevl( static_cast(x), lanczos_sum_expg_scaled_num, sizeof(lanczos_sum_expg_scaled_num) / sizeof(lanczos_sum_expg_scaled_num[0]) - 1, lanczos_sum_expg_scaled_denom, sizeof(lanczos_sum_expg_scaled_denom) / sizeof(lanczos_sum_expg_scaled_denom[0]) - 1); } template scalar_t _igam_helper_fac(scalar_t a, scalar_t x) { // compute x^a * exp(-a) / gamma(a) // corrected from (15) and (16) in [igam2] by replacing exp(x - a) with // exp(a - x). using accscalar_t = opmath_t; accscalar_t ax, fac, res, num, numfac; const accscalar_t MAXLOG = 88.72283905206835; const accscalar_t EXP1 = 2.718281828459045; const accscalar_t lanczos_g = 6.024680040776729583740234375; if (::fabs(a - x) > 0.4 * ::fabs(a)) { ax = a * ::log(x) - x - ::lgamma(a); if (ax < -MAXLOG) { return 0.0; } return ::exp(ax); } fac = a + lanczos_g - 0.5; res = ::sqrt(fac / EXP1) / lanczos_sum_expg_scaled(a); if ((a < 200) && (x < 200)) { res *= ::exp(a - x) * ::pow(x / fac, a); } else { num = x - a - lanczos_g + 0.5; numfac = num / fac; res *= ::exp(a * (::log1p(numfac) - numfac) + x * (0.5 - lanczos_g) / fac); } return res; } template scalar_t _igam_helper_series(scalar_t a, scalar_t x) { // Compute igam using DLMF 8.11.4. [igam1] using accscalar_t = opmath_t; const accscalar_t MACHEP = 5.9604644775390625E-8; const int MAXITER = 2000; int i; accscalar_t ans, ax, c, r; ax = _igam_helper_fac(a, x); if (ax == 0.0) { return 0.0; } /* power series */ r = a; c = 1.0; ans = 1.0; for (i = 0; i < MAXITER; i++) { r += 1.0; c *= x / r; ans += c; if (c <= MACHEP * ans) { break; } } return (ans * ax / a); } template scalar_t _igamc_helper_series(scalar_t a, scalar_t x) { // Compute igamc using DLMF 8.7.3 [igam1]. This is related to the series in // _igam_helper_series but extra care is taken to avoid cancellation. using accscalar_t = opmath_t; int n; accscalar_t fac = 1; accscalar_t sum = 0; accscalar_t term, logx; const int MAXITER = 2000; const accscalar_t MACHEP = 5.9604644775390625E-8; for (n = 1; n < MAXITER; n++) { fac *= -x / n; term = fac / (a + n); sum += term; if (::fabs(term) <= MACHEP * ::fabs(sum)) { break; } } logx = ::log(x); term = -::expm1(a * logx - ::lgamma(1 + a)); return term - ::exp(a * logx - ::lgamma(a)) * sum; } template scalar_t _igam_helper_asymptotic_series(scalar_t a, scalar_t x, bool igam) { // Compute igam/igamc using DLMF 8.12.3/8.12.4 [igam1] using accscalar_t = opmath_t; const accscalar_t d[25][25] = { {-3.3333333333333333e-1, 8.3333333333333333e-2, -1.4814814814814815e-2, 1.1574074074074074e-3, 3.527336860670194e-4, -1.7875514403292181e-4, 3.9192631785224378e-5, -2.1854485106799922e-6, -1.85406221071516e-6, 8.296711340953086e-7, -1.7665952736826079e-7, 6.7078535434014986e-9, 1.0261809784240308e-8, -4.3820360184533532e-9, 9.1476995822367902e-10, -2.551419399494625e-11, -5.8307721325504251e-11, 2.4361948020667416e-11, -5.0276692801141756e-12, 1.1004392031956135e-13, 3.3717632624009854e-13, -1.3923887224181621e-13, 2.8534893807047443e-14, -5.1391118342425726e-16, -1.9752288294349443e-15}, {-1.8518518518518519e-3, -3.4722222222222222e-3, 2.6455026455026455e-3, -9.9022633744855967e-4, 2.0576131687242798e-4, -4.0187757201646091e-7, -1.8098550334489978e-5, 7.6491609160811101e-6, -1.6120900894563446e-6, 4.6471278028074343e-9, 1.378633446915721e-7, -5.752545603517705e-8, 1.1951628599778147e-8, -1.7543241719747648e-11, -1.0091543710600413e-9, 4.1627929918425826e-10, -8.5639070264929806e-11, 6.0672151016047586e-14, 7.1624989648114854e-12, -2.9331866437714371e-12, 5.9966963656836887e-13, -2.1671786527323314e-16, -4.9783399723692616e-14, 2.0291628823713425e-14, -4.13125571381061e-15}, {4.1335978835978836e-3, -2.6813271604938272e-3, 7.7160493827160494e-4, 2.0093878600823045e-6, -1.0736653226365161e-4, 5.2923448829120125e-5, -1.2760635188618728e-5, 3.4235787340961381e-8, 1.3721957309062933e-6, -6.298992138380055e-7, 1.4280614206064242e-7, -2.0477098421990866e-10, -1.4092529910867521e-8, 6.228974084922022e-9, -1.3670488396617113e-9, 9.4283561590146782e-13, 1.2872252400089318e-10, -5.5645956134363321e-11, 1.1975935546366981e-11, -4.1689782251838635e-15, -1.0940640427884594e-12, 4.6622399463901357e-13, -9.905105763906906e-14, 1.8931876768373515e-17, 8.8592218725911273e-15}, {6.4943415637860082e-4, 2.2947209362139918e-4, -4.6918949439525571e-4, 2.6772063206283885e-4, -7.5618016718839764e-5, -2.3965051138672967e-7, 1.1082654115347302e-5, -5.6749528269915966e-6, 1.4230900732435884e-6, -2.7861080291528142e-11, -1.6958404091930277e-7, 8.0994649053880824e-8, -1.9111168485973654e-8, 2.3928620439808118e-12, 2.0620131815488798e-9, -9.4604966618551322e-10, 2.1541049775774908e-10, -1.388823336813903e-14, -2.1894761681963939e-11, 9.7909989511716851e-12, -2.1782191880180962e-12, 6.2088195734079014e-17, 2.126978363279737e-13, -9.3446887915174333e-14, 2.0453671226782849e-14}, {-8.618882909167117e-4, 7.8403922172006663e-4, -2.9907248030319018e-4, -1.4638452578843418e-6, 6.6414982154651222e-5, -3.9683650471794347e-5, 1.1375726970678419e-5, 2.5074972262375328e-10, -1.6954149536558306e-6, 8.9075075322053097e-7, -2.2929348340008049e-7, 2.956794137544049e-11, 2.8865829742708784e-8, -1.4189739437803219e-8, 3.4463580499464897e-9, -2.3024517174528067e-13, -3.9409233028046405e-10, 1.8602338968504502e-10, -4.356323005056618e-11, 1.2786001016296231e-15, 4.6792750266579195e-12, -2.1492464706134829e-12, 4.9088156148096522e-13, -6.3385914848915603e-18, -5.0453320690800944e-14}, {-3.3679855336635815e-4, -6.9728137583658578e-5, 2.7727532449593921e-4, -1.9932570516188848e-4, 6.7977804779372078e-5, 1.419062920643967e-7, -1.3594048189768693e-5, 8.0184702563342015e-6, -2.2914811765080952e-6, -3.252473551298454e-10, 3.4652846491085265e-7, -1.8447187191171343e-7, 4.8240967037894181e-8, -1.7989466721743515e-14, -6.3061945000135234e-9, 3.1624176287745679e-9, -7.8409242536974293e-10, 5.1926791652540407e-15, 9.3589442423067836e-11, -4.5134262161632782e-11, 1.0799129993116827e-11, -3.661886712685252e-17, -1.210902069055155e-12, 5.6807435849905643e-13, -1.3249659916340829e-13}, {5.3130793646399222e-4, -5.9216643735369388e-4, 2.7087820967180448e-4, 7.9023532326603279e-7, -8.1539693675619688e-5, 5.6116827531062497e-5, -1.8329116582843376e-5, -3.0796134506033048e-9, 3.4651553688036091e-6, -2.0291327396058604e-6, 5.7887928631490037e-7, 2.338630673826657e-13, -8.8286007463304835e-8, 4.7435958880408128e-8, -1.2545415020710382e-8, 8.6496488580102925e-14, 1.6846058979264063e-9, -8.5754928235775947e-10, 2.1598224929232125e-10, -7.6132305204761539e-16, -2.6639822008536144e-11, 1.3065700536611057e-11, -3.1799163902367977e-12, 4.7109761213674315e-18, 3.6902800842763467e-13}, {3.4436760689237767e-4, 5.1717909082605922e-5, -3.3493161081142236e-4, 2.812695154763237e-4, -1.0976582244684731e-4, -1.2741009095484485e-7, 2.7744451511563644e-5, -1.8263488805711333e-5, 5.7876949497350524e-6, 4.9387589339362704e-10, -1.0595367014026043e-6, 6.1667143761104075e-7, -1.7562973359060462e-7, -1.2974473287015439e-12, 2.695423606288966e-8, -1.4578352908731271e-8, 3.887645959386175e-9, -3.8810022510194121e-17, -5.3279941738772867e-10, 2.7437977643314845e-10, -6.9957960920705679e-11, 2.5899863874868481e-17, 8.8566890996696381e-12, -4.403168815871311e-12, 1.0865561947091654e-12}, {-6.5262391859530942e-4, 8.3949872067208728e-4, -4.3829709854172101e-4, -6.969091458420552e-7, 1.6644846642067548e-4, -1.2783517679769219e-4, 4.6299532636913043e-5, 4.5579098679227077e-9, -1.0595271125805195e-5, 6.7833429048651666e-6, -2.1075476666258804e-6, -1.7213731432817145e-11, 3.7735877416110979e-7, -2.1867506700122867e-7, 6.2202288040189269e-8, 6.5977038267330006e-16, -9.5903864974256858e-9, 5.2132144922808078e-9, -1.3991589583935709e-9, 5.382058999060575e-16, 1.9484714275467745e-10, -1.0127287556389682e-10, 2.6077347197254926e-11, -5.0904186999932993e-18, -3.3721464474854592e-12}, {-5.9676129019274625e-4, -7.2048954160200106e-5, 6.7823088376673284e-4, -6.4014752602627585e-4, 2.7750107634328704e-4, 1.8197008380465151e-7, -8.4795071170685032e-5, 6.105192082501531e-5, -2.1073920183404862e-5, -8.8585890141255994e-10, 4.5284535953805377e-6, -2.8427815022504408e-6, 8.7082341778646412e-7, 3.6886101871706965e-12, -1.5344695190702061e-7, 8.862466778790695e-8, -2.5184812301826817e-8, -1.0225912098215092e-14, 3.8969470758154777e-9, -2.1267304792235635e-9, 5.7370135528051385e-10, -1.887749850169741e-19, -8.0931538694657866e-11, 4.2382723283449199e-11, -1.1002224534207726e-11}, {1.3324454494800656e-3, -1.9144384985654775e-3, 1.1089369134596637e-3, 9.932404122642299e-7, -5.0874501293093199e-4, 4.2735056665392884e-4, -1.6858853767910799e-4, -8.1301893922784998e-9, 4.5284402370562147e-5, -3.127053674781734e-5, 1.044986828530338e-5, 4.8435226265680926e-11, -2.1482565873456258e-6, 1.329369701097492e-6, -4.0295693092101029e-7, -1.7567877666323291e-13, 7.0145043163668257e-8, -4.040787734999483e-8, 1.1474026743371963e-8, 3.9642746853563325e-18, -1.7804938269892714e-9, 9.7480262548731646e-10, -2.6405338676507616e-10, 5.794875163403742e-18, 3.7647749553543836e-11}, {1.579727660730835e-3, 1.6251626278391582e-4, -2.0633421035543276e-3, 2.1389686185689098e-3, -1.0108559391263003e-3, -3.9912705529919201e-7, 3.6235025084764691e-4, -2.8143901463712154e-4, 1.0449513336495887e-4, 2.1211418491830297e-9, -2.5779417251947842e-5, 1.7281818956040463e-5, -5.6413773872904282e-6, -1.1024320105776174e-11, 1.1223224418895175e-6, -6.8693396379526735e-7, 2.0653236975414887e-7, 4.6714772409838506e-14, -3.5609886164949055e-8, 2.0470855345905963e-8, -5.8091738633283358e-9, -1.332821287582869e-16, 9.0354604391335133e-10, -4.9598782517330834e-10, 1.3481607129399749e-10}, {-4.0725121195140166e-3, 6.4033628338080698e-3, -4.0410161081676618e-3, -2.183732802866233e-6, 2.1740441801254639e-3, -1.9700440518418892e-3, 8.3595469747962458e-4, 1.9445447567109655e-8, -2.5779387120421696e-4, 1.9009987368139304e-4, -6.7696499937438965e-5, -1.4440629666426572e-10, 1.5712512518742269e-5, -1.0304008744776893e-5, 3.304517767401387e-6, 7.9829760242325709e-13, -6.4097794149313004e-7, 3.8894624761300056e-7, -1.1618347644948869e-7, -2.816808630596451e-15, 1.9878012911297093e-8, -1.1407719956357511e-8, 3.2355857064185555e-9, 4.1759468293455945e-20, -5.0423112718105824e-10}, {-5.9475779383993003e-3, -5.4016476789260452e-4, 8.7910413550767898e-3, -9.8576315587856125e-3, 5.0134695031021538e-3, 1.2807521786221875e-6, -2.0626019342754683e-3, 1.7109128573523058e-3, -6.7695312714133799e-4, -6.9011545676562133e-9, 1.8855128143995902e-4, -1.3395215663491969e-4, 4.6263183033528039e-5, 4.0034230613321351e-11, -1.0255652921494033e-5, 6.612086372797651e-6, -2.0913022027253008e-6, -2.0951775649603837e-13, 3.9756029041993247e-7, 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1.5109265210467774e-2}, {-9.8959643098322368e+2, 2.1925555360905233e+3, -1.9283586782723356e+3, -1.5925738122215253e-1, 1.9569985945919857e+3, -2.4072514765081556e+3, 1.3756149959336496e+3, 1.2920735237496668e-3, -7.525941715948055e+2, 7.3171668742208716e+2, -3.4137023466220065e+2, -9.9857390260608043e-6, 1.3356313181291573e+2, -1.1276295161252794e+2, 4.6310396098204458e+1, -7.9237387133614756e-6, -1.4510726927018646e+1, 1.1111771248100563e+1, -4.1690817945270892, 3.1008219800117808e-3, 1.1220095449981468, -7.6052379926149916e-1, 3.6262236505085254e-1, 2.216867741940747e-1, 4.8683443692930507e-1}}; int k, n, sgn; int maxpow = 0; const accscalar_t MACHEP = 5.9604644775390625E-8; accscalar_t lambda = x / a; accscalar_t sigma = (x - a) / a; accscalar_t eta, res, ck, ckterm, term, absterm; accscalar_t absoldterm = INFINITY; accscalar_t etapow[25] = {1}; accscalar_t sum = 0; accscalar_t afac = 1; if (igam) { sgn = -1; } else { sgn = 1; } if (lambda > 1) { eta = ::sqrt(-2 * (::log1p(sigma) - sigma)); } else if (lambda < 1) { eta = -::sqrt(-2 * (::log1p(sigma) - sigma)); } else { eta = 0; } res = 0.5 * ::erfc(sgn * eta * ::sqrt(a / 2)); for (k = 0; k < 25; k++) { ck = d[k][0]; for (n = 1; n < 25; n++) { if (n > maxpow) { etapow[n] = eta * etapow[n - 1]; maxpow += 1; } ckterm = d[k][n] * etapow[n]; ck += ckterm; if (::fabs(ckterm) < MACHEP * ::fabs(ck)) { break; } } term = ck * afac; absterm = ::fabs(term); if (absterm > absoldterm) { break; } sum += term; if (absterm < MACHEP * ::fabs(sum)) { break; } absoldterm = absterm; afac /= a; } res += sgn * ::exp(-0.5 * a * eta * eta) * sum / ::sqrt(2 * 3.1415926535 * a); return res; } template scalar_t _igamc_helper_continued_fraction(scalar_t a, scalar_t x) { // Compute igamc using DLMF 8.9.2. [igam1] using accscalar_t = opmath_t; int i; accscalar_t ans, ax, c, yc, r, t, y, z; accscalar_t pk, pkm1, pkm2, qk, qkm1, qkm2; const int MAXITER = 2000; const accscalar_t MACHEP = 5.9604644775390625E-8; const accscalar_t BIG = 16777216.; const accscalar_t BIGINV = 5.9604644775390625E-8; ax = _igam_helper_fac(a, x); if (ax == 0.0) { return 0.0; } /* continued fraction */ y = 1.0 - a; z = x + y + 1.0; c = 0.0; pkm2 = 1.0; qkm2 = x; pkm1 = x + 1.0; qkm1 = z * x; ans = pkm1 / qkm1; for (i = 0; i < MAXITER; i++) { c += 1.0; y += 1.0; z += 2.0; yc = y * c; pk = pkm1 * z - pkm2 * yc; qk = qkm1 * z - qkm2 * yc; if (qk != 0) { r = pk / qk; t = ::fabs((ans - r) / r); ans = r; } else { t = 1.0; } pkm2 = pkm1; pkm1 = pk; qkm2 = qkm1; qkm1 = qk; if (::fabs(pk) > BIG) { pkm2 *= BIGINV; pkm1 *= BIGINV; qkm2 *= BIGINV; qkm1 *= BIGINV; } if (t <= MACHEP) { break; } } return ans * ax; } template scalar_t calc_igammac(scalar_t a, scalar_t x) { /* the calculation of the regularized upper incomplete gamma function * is done differently based on the values of a and x: * - if x and/or a is at the boundary of defined region, then assign the * result at the boundary * - if a is large and a ~ x, then using Uniform Asymptotic Expansions for * Large Parameter (see DLMF 8.12.4 [igam1]) * - if x > 1.1 and x < a, using the subtraction from the regularized lower * incomplete gamma * - otherwise, calculate the series from [igam2] eq (5) */ using accscalar_t = opmath_t; accscalar_t absxma_a; const accscalar_t SMALL = 20.0; const accscalar_t LARGE = 200.0; const accscalar_t SMALLRATIO = 0.3; const accscalar_t LARGERATIO = 4.5; if ((x < 0) || (a < 0)) { // out of defined-region of the function return NAN; } else if (a == 0) { if (x > 0) { return 0.0; } else { return NAN; } } else if (x == 0) { return 1.0; } else if (isinf(a)) { if (isinf(x)) { return NAN; } return 1.0; } else if (isinf(x)) { return 0.0; } absxma_a = ::fabs(x - a) / a; if ((a > SMALL) && (a < LARGE) && (absxma_a < SMALLRATIO)) { return _igam_helper_asymptotic_series(a, x, 0); } else if ((a > LARGE) && (absxma_a < LARGERATIO / ::sqrt(a))) { return _igam_helper_asymptotic_series(a, x, 0); } if (x > 1.1) { if (x < a) { return 1.0 - _igam_helper_series(a, x); } else { return _igamc_helper_continued_fraction(a, x); } } else if (x <= 0.5) { if (-0.4 / ::log(x) < a) { return 1.0 - _igam_helper_series(a, x); } else { return _igamc_helper_series(a, x); } } else { if (x * 1.1 < a) { return 1.0 - _igam_helper_series(a, x); } else { return _igamc_helper_series(a, x); } } } template scalar_t calc_igamma(scalar_t a, scalar_t x) { /* the calculation of the regularized lower incomplete gamma function * is done differently based on the values of a and x: * - if x and/or a is at the boundary of defined region, then assign the * result at the boundary * - if a is large and a ~ x, then using Uniform Asymptotic Expansions for * Large Parameter (see DLMF 8.12.3 [igam1]) * - if x > 1 and x > a, using the subtraction from the regularized upper * incomplete gamma * - otherwise, calculate the series from [igam2] eq (4) */ using accscalar_t = opmath_t; accscalar_t absxma_a; const accscalar_t SMALL = 20.0; const accscalar_t LARGE = 200.0; const accscalar_t SMALLRATIO = 0.3; const accscalar_t LARGERATIO = 4.5; // boundary values following SciPy if ((x < 0) || (a < 0)) { // out of defined-region of the function return NAN; } else if (a == 0) { if (x > 0) { return 1.0; } else { return NAN; } } else if (x == 0) { return 0.0; // zero integration limit } else if (isinf(a)) { if (isinf(x)) { return NAN; } return 0.0; } else if (isinf(x)) { return 1.0; } /* Asymptotic regime where a ~ x. */ absxma_a = ::fabs(x - a) / a; if ((a > SMALL) && (a < LARGE) && (absxma_a < SMALLRATIO)) { return _igam_helper_asymptotic_series(a, x, 1); } else if ((a > LARGE) && (absxma_a < LARGERATIO / ::sqrt(a))) { return _igam_helper_asymptotic_series(a, x, 1); } if ((x > 1.0) && (x > a)) { return 1.0 - calc_igammac(a, x); } return _igam_helper_series(a, x); } } // namespace // end of regularized lower & upper incomplete gamma namespace c10 { namespace metal { template inline T igamma(T a, T b) { return calc_igamma(a, b); } template inline T igammac(T a, T b) { return calc_igammac(a, b); } } // namespace metal } // namespace c10 #else #error "This file should not be included when either TORCH_STABLE_ONLY or TORCH_TARGET_VERSION is defined." #endif // !defined(TORCH_STABLE_ONLY) && !defined(TORCH_TARGET_VERSION)