// This file is part of Eigen, a lightweight C++ template library // for linear algebra. // // Copyright (C) 2015 Eugene Brevdo // // This Source Code Form is subject to the terms of the Mozilla // Public License v. 2.0. If a copy of the MPL was not distributed // with this file, You can obtain one at http://mozilla.org/MPL/2.0/. #ifndef EIGEN_SPECIAL_FUNCTIONS_H #define EIGEN_SPECIAL_FUNCTIONS_H // IWYU pragma: private #include "./InternalHeaderCheck.h" namespace Eigen { namespace internal { // Parts of this code are based on the Cephes Math Library. // // Cephes Math Library Release 2.8: June, 2000 // Copyright 1984, 1987, 1992, 2000 by Stephen L. Moshier // // Permission has been kindly provided by the original author // to incorporate the Cephes software into the Eigen codebase: // // From: Stephen Moshier // To: Eugene Brevdo // Subject: Re: Permission to wrap several cephes functions in Eigen // // Hello Eugene, // // Thank you for writing. // // If your licensing is similar to BSD, the formal way that has been // handled is simply to add a statement to the effect that you are incorporating // the Cephes software by permission of the author. // // Good luck with your project, // Steve /**************************************************************************** * Implementation of lgamma, requires C++11/C99 * ****************************************************************************/ template struct lgamma_impl { EIGEN_STATIC_ASSERT((internal::is_same::value == false), THIS_TYPE_IS_NOT_SUPPORTED) EIGEN_DEVICE_FUNC static EIGEN_STRONG_INLINE Scalar run(const Scalar) { return Scalar(0); } }; template struct lgamma_retval { typedef Scalar type; }; #if EIGEN_HAS_C99_MATH // Since glibc 2.19 #if defined(__GLIBC__) && ((__GLIBC__ >= 2 && __GLIBC_MINOR__ >= 19) || __GLIBC__ > 2) && \ (defined(_DEFAULT_SOURCE) || defined(_BSD_SOURCE) || defined(_SVID_SOURCE)) #define EIGEN_HAS_LGAMMA_R #endif // Glibc versions before 2.19 #if defined(__GLIBC__) && ((__GLIBC__ == 2 && __GLIBC_MINOR__ < 19) || __GLIBC__ < 2) && \ (defined(_BSD_SOURCE) || defined(_SVID_SOURCE)) #define EIGEN_HAS_LGAMMA_R #endif template <> struct lgamma_impl { EIGEN_DEVICE_FUNC static EIGEN_STRONG_INLINE float run(float x) { #if !defined(EIGEN_GPU_COMPILE_PHASE) && defined(EIGEN_HAS_LGAMMA_R) && !defined(__APPLE__) int dummy; return ::lgammaf_r(x, &dummy); #elif defined(SYCL_DEVICE_ONLY) return cl::sycl::lgamma(x); #else return ::lgammaf(x); #endif } }; template <> struct lgamma_impl { EIGEN_DEVICE_FUNC static EIGEN_STRONG_INLINE double run(double x) { #if !defined(EIGEN_GPU_COMPILE_PHASE) && defined(EIGEN_HAS_LGAMMA_R) && !defined(__APPLE__) int dummy; return ::lgamma_r(x, &dummy); #elif defined(SYCL_DEVICE_ONLY) return cl::sycl::lgamma(x); #else return ::lgamma(x); #endif } }; #undef EIGEN_HAS_LGAMMA_R #endif /**************************************************************************** * Implementation of digamma (psi), based on Cephes * ****************************************************************************/ template struct digamma_retval { typedef Scalar type; }; /* * * Polynomial evaluation helper for the Psi (digamma) function. * * digamma_impl_maybe_poly::run(s) evaluates the asymptotic Psi expansion for * input Scalar s, assuming s is above 10.0. * * If s is above a certain threshold for the given Scalar type, zero * is returned. Otherwise the polynomial is evaluated with enough * coefficients for results matching Scalar machine precision. * * */ template struct digamma_impl_maybe_poly { EIGEN_STATIC_ASSERT((internal::is_same::value == false), THIS_TYPE_IS_NOT_SUPPORTED) EIGEN_DEVICE_FUNC static EIGEN_STRONG_INLINE Scalar run(const Scalar) { return Scalar(0); } }; template <> struct digamma_impl_maybe_poly { EIGEN_DEVICE_FUNC static EIGEN_STRONG_INLINE float run(const float s) { constexpr float A[] = {-4.16666666666666666667E-3f, 3.96825396825396825397E-3f, -8.33333333333333333333E-3f, 8.33333333333333333333E-2f}; float z; if (s < 1.0e8f) { z = 1.0f / (s * s); return z * internal::ppolevl::run(z, A); } else return 0.0f; } }; template <> struct digamma_impl_maybe_poly { EIGEN_DEVICE_FUNC static EIGEN_STRONG_INLINE double run(const double s) { constexpr double A[] = {8.33333333333333333333E-2, -2.10927960927960927961E-2, 7.57575757575757575758E-3, -4.16666666666666666667E-3, 3.96825396825396825397E-3, -8.33333333333333333333E-3, 8.33333333333333333333E-2}; double z; if (s < 1.0e17) { z = 1.0 / (s * s); return z * internal::ppolevl::run(z, A); } else return 0.0; } }; template struct digamma_impl { EIGEN_DEVICE_FUNC static Scalar run(Scalar x) { /* * * Psi (digamma) function (modified for Eigen) * * * SYNOPSIS: * * double x, y, psi(); * * y = psi( x ); * * * DESCRIPTION: * * d - * psi(x) = -- ln | (x) * dx * * is the logarithmic derivative of the gamma function. * For integer x, * n-1 * - * psi(n) = -EUL + > 1/k. * - * k=1 * * If x is negative, it is transformed to a positive argument by the * reflection formula psi(1-x) = psi(x) + pi cot(pi x). * For general positive x, the argument is made greater than 10 * using the recurrence psi(x+1) = psi(x) + 1/x. * Then the following asymptotic expansion is applied: * * inf. B * - 2k * psi(x) = log(x) - 1/2x - > ------- * - 2k * k=1 2k x * * where the B2k are Bernoulli numbers. * * ACCURACY (float): * Relative error (except absolute when |psi| < 1): * arithmetic domain # trials peak rms * IEEE 0,30 30000 1.3e-15 1.4e-16 * IEEE -30,0 40000 1.5e-15 2.2e-16 * * ACCURACY (double): * Absolute error, relative when |psi| > 1 : * arithmetic domain # trials peak rms * IEEE -33,0 30000 8.2e-7 1.2e-7 * IEEE 0,33 100000 7.3e-7 7.7e-8 * * ERROR MESSAGES: * message condition value returned * psi singularity x integer <=0 INFINITY */ Scalar p, q, nz, s, w, y; bool negative = false; const Scalar nan = NumTraits::quiet_NaN(); const Scalar m_pi = Scalar(EIGEN_PI); const Scalar zero = Scalar(0); const Scalar one = Scalar(1); const Scalar half = Scalar(0.5); nz = zero; if (x <= zero) { negative = true; q = x; p = numext::floor(q); if (p == q) { return nan; } /* Remove the zeros of tan(m_pi x) * by subtracting the nearest integer from x */ nz = q - p; if (nz != half) { if (nz > half) { p += one; nz = q - p; } nz = m_pi / numext::tan(m_pi * nz); } else { nz = zero; } x = one - x; } /* use the recurrence psi(x+1) = psi(x) + 1/x. */ s = x; w = zero; while (s < Scalar(10)) { w += one / s; s += one; } y = digamma_impl_maybe_poly::run(s); y = numext::log(s) - (half / s) - y - w; return (negative) ? y - nz : y; } }; /*************************************************************************** * Implementation of erfc. ****************************************************************************/ template struct generic_fast_erfc { template static EIGEN_DEVICE_FUNC EIGEN_STRONG_INLINE T run(const T& x_in); }; template <> template EIGEN_DEVICE_FUNC EIGEN_STRONG_INLINE T generic_fast_erfc::run(const T& x_in) { constexpr float kClamp = 11.0f; const T x = pmin(pmax(x_in, pset1(-kClamp)), pset1(kClamp)); // erfc(x) = 1 + x * S(x^2), |x| <= 1. // // Coefficients for S and T generated with Rminimax command: // ./ratapprox --function="erfc(x)-1" --dom='[-1,1]' --type=[11,0] --num="odd" // --numF="[SG]" --denF="[SG]" --log --dispCoeff="dec" constexpr float alpha[] = {5.61802298761904239654541015625e-04, -4.91381669417023658752441406250e-03, 2.67075151205062866210937500000e-02, -1.12800106406211853027343750000e-01, 3.76122951507568359375000000000e-01, -1.12837910652160644531250000000e+00}; const T x2 = pmul(x, x); const T one = pset1(1.0f); const T erfc_small = pmadd(x, ppolevl::run(x2, alpha), one); // Return early if we don't need the more expensive approximation for any // entry in a. const T x_abs_gt_one_mask = pcmp_lt(one, x2); if (!predux_any(x_abs_gt_one_mask)) return erfc_small; // erfc(x) = exp(-x^2) * 1/x * P(1/x^2) / Q(1/x^2), 1 < x < 9. // // Coefficients for P and Q generated with Rminimax command: // ./ratapprox --function="erfc(1/sqrt(x))*exp(1/x)/sqrt(x)" // --dom='[0.01,1]' --type=[3,4] --numF="[SG]" --denF="[SG]" --log // --dispCoeff="dec" constexpr float gamma[] = {1.0208116471767425537109375e-01f, 4.2920666933059692382812500e-01f, 3.2379078865051269531250000e-01f, 5.3971976041793823242187500e-02f}; constexpr float delta[] = {1.7251677811145782470703125e-02f, 3.9137163758277893066406250e-01f, 1.0000000000000000000000000e+00f, 6.2173241376876831054687500e-01f, 9.5662862062454223632812500e-02f}; const T x2_lo = twoprod_low(x, x, x2); // Here we use that // exp(-x^2) = exp(-(x2+x2_lo)^2) ~= exp(-x2)*exp(-x2_lo) ~= exp(-x2)*(1-x2_lo) // since x2_lo < kClamp * eps << 1 in the region we care about. This trick reduces the max error // from 34 ulps to below 5 ulps. const T exp2_hi = pexp(pnegate(x2)); const T z = pnmadd(exp2_hi, x2_lo, exp2_hi); const T q2 = preciprocal(x2); const T num = ppolevl::run(q2, gamma); const T denom = pmul(x, ppolevl::run(q2, delta)); const T r = pdiv(num, denom); const T maybe_two = pand(pcmp_lt(x, pset1(0.0)), pset1(2.0)); const T erfc_large = pmadd(z, r, maybe_two); return pselect(x_abs_gt_one_mask, erfc_large, erfc_small); } // Computes erf(x)/x for |x| <= 1. Used by both erf and erfc implementations. // Takes x2 = x^2 as input. // // PRECONDITION: x2 <= 1. template EIGEN_DEVICE_FUNC EIGEN_STRONG_INLINE T erf_over_x_double_small(const T& x2) { // erf(x)/x = S(x^2) / T(x^2), x^2 <= 1. // // Coefficients for S and T generated with Rminimax command: // ./ratapprox --function="erf(x)" --dom='[-1,1]' --type=[9,10] // --num="odd" --numF="[D]" --den="even" --denF="[D]" --log --dispCoeff="dec" constexpr double alpha[] = {1.9493725660006057018823477644531294572516344487667083740234375e-04, 1.8272566210022942682217328425053892715368419885635375976562500e-03, 4.5303363351690106863856044583371840417385101318359375000000000e-02, 1.4215015503619179981775744181504705920815467834472656250000000e-01, 1.1283791670955125585606992899556644260883331298828125000000000e+00}; constexpr double beta[] = {2.0294484101083099089526257108317963684385176748037338256835938e-05, 6.8117805899186819641732970609382391558028757572174072265625000e-04, 1.0582026056098614921752165685120417037978768348693847656250000e-02, 9.3252603143757495374188692949246615171432495117187500000000000e-02, 4.5931062818368939559832142549566924571990966796875000000000000e-01, 1.0}; const T num_small = ppolevl::run(x2, alpha); const T denom_small = ppolevl::run(x2, beta); return pdiv(num_small, denom_small); } // erfc(x) = exp(-x^2) * 1/x * P(1/x^2) / Q(1/x^2), 1 < x < 28. // // Coefficients for P and Q generated with Rminimax command: // ./ratapprox --function="erfc(1/sqrt(x))*exp(1/x)/sqrt(x)" --dom='[0.0013717,1]' --type=[9,9] --numF="[D]" // --denF="[D]" --log --dispCoeff="dec" // // PRECONDITION: 1 < x < 28. template EIGEN_DEVICE_FUNC EIGEN_STRONG_INLINE T erfc_double_large(const T& x, const T& x2) { constexpr double gamma[] = {1.5252844933226974316088642158462107545346952974796295166015625e-04, 1.0909912393738931124520519233556115068495273590087890625000000e-02, 1.0628604636755033252537572252549580298364162445068359375000000e-01, 3.3492472973137982217295416376146022230386734008789062500000000e-01, 4.5065776215933289750026347064704168587923049926757812500000000e-01, 2.9433039130294824659017649537418037652969360351562500000000000e-01, 9.8792676360600226170838311645638896152377128601074218750000000e-02, 1.7095935395503719655962981960328761488199234008789062500000000e-02, 1.4249109729504577659398023570247460156679153442382812500000000e-03, 4.4567378313647954771875570045835956989321857690811157226562500e-05}; constexpr double delta[] = {2.041985103115789845773520028160419315099716186523437500000000e-03, 5.316030659946043707142493417450168635696172714233398437500000e-02, 3.426242193784684864077405563875799998641014099121093750000000e-01, 8.565637124308049799026321124983951449394226074218750000000000e-01, 1.000000000000000000000000000000000000000000000000000000000000e+00, 5.968805280570776972126623149961233139038085937500000000000000e-01, 1.890922854723317836356244470152887515723705291748046875000000e-01, 3.152505418656005586885981983868987299501895904541015625000000e-02, 2.565085751861882583380047861965067568235099315643310546875000e-03, 7.899362131678837697403017248376499992446042597293853759765625e-05}; // Compute exp(-x^2). const T x2_lo = twoprod_low(x, x, x2); // Here we use that // exp(-x^2) = exp(-(x2+x2_lo)^2) ~= exp(-x2)*exp(-x2_lo) ~= exp(-x2)*(1-x2_lo) // since x2_lo < kClamp *eps << 1 in the region we care about. This trick reduces the max error // from 258 ulps to below 7 ulps. const T exp2_hi = pexp(pnegate(x2)); const T z = pnmadd(exp2_hi, x2_lo, exp2_hi); // Compute r = P / Q. const T q2 = preciprocal(x2); const T num_large = ppolevl::run(q2, gamma); const T denom_large = pmul(x, ppolevl::run(q2, delta)); const T r = pdiv(num_large, denom_large); const T maybe_two = pand(pcmp_lt(x, pset1(0.0)), pset1(2.0)); return pmadd(z, r, maybe_two); } template <> template EIGEN_DEVICE_FUNC EIGEN_STRONG_INLINE T generic_fast_erfc::run(const T& x_in) { // Clamp x to [-28:28] beyond which erfc(x) is either two or zero (below the underflow threshold). // This avoids having to deal with twoprod(x,x) producing NaN for sufficiently large x. constexpr double kClamp = 28.0; const T x = pmin(pmax(x_in, pset1(-kClamp)), pset1(kClamp)); // For |x| < 1, we use erfc(x) = 1 - erf(x). const T x2 = pmul(x, x); const T one = pset1(1.0); const T erfc_small = pnmadd(x, erf_over_x_double_small(x2), one); // Return early if we don't need the more expensive approximation for any // entry in a. const T x_abs_gt_one_mask = pcmp_lt(one, x2); if (!predux_any(x_abs_gt_one_mask)) return erfc_small; const T erfc_large = erfc_double_large(x, x2); return pselect(x_abs_gt_one_mask, erfc_large, erfc_small); } template struct erfc_impl { typedef typename unpacket_traits::type Scalar; EIGEN_DEVICE_FUNC static EIGEN_STRONG_INLINE T run(const T& x) { return generic_fast_erfc::run(x); } }; template struct erfc_retval { typedef Scalar type; }; #if EIGEN_HAS_C99_MATH template <> struct erfc_impl { EIGEN_DEVICE_FUNC static EIGEN_STRONG_INLINE float run(const float x) { #if defined(SYCL_DEVICE_ONLY) return cl::sycl::erfc(x); #else return generic_fast_erfc::run(x); #endif } }; template <> struct erfc_impl { EIGEN_DEVICE_FUNC static EIGEN_STRONG_INLINE double run(const double x) { #if defined(SYCL_DEVICE_ONLY) return cl::sycl::erfc(x); #else return generic_fast_erfc::run(x); #endif } }; #endif // EIGEN_HAS_C99_MATH /**************************************************************************** * Implementation of erf. ****************************************************************************/ template struct generic_fast_erf { template static EIGEN_DEVICE_FUNC EIGEN_STRONG_INLINE T run(const T& x_in); }; /** \internal \returns the error function of \a a (coeff-wise) This uses a 11/10-degree rational interpolantand is accurate to 3 ulp for normalized floats. This implementation works on both scalars and SIMD "packets". */ template <> template EIGEN_DEVICE_FUNC EIGEN_STRONG_INLINE T generic_fast_erf::run(const T& x) { // The monomial coefficients of the numerator polynomial (odd). constexpr float alpha[] = {2.123732201653183437883853912353515625e-06f, 2.861979592125862836837768554687500000e-04f, 3.658048342913389205932617187500000000e-03f, 5.243302136659622192382812500000000000e-02f, 1.874160766601562500000000000000000000e-01f, 1.128379106521606445312500000000000000e+00f}; // The monomial coefficients of the denominator polynomial (even). constexpr float beta[] = {3.89185734093189239501953125000e-05f, 1.14329601638019084930419921875e-03f, 1.47520881146192550659179687500e-02f, 1.12945675849914550781250000000e-01f, 4.99425798654556274414062500000e-01f, 1.0f}; // Since the polynomials are odd/even, we need x^2. // Since erf(4) == 1 in float, we clamp x^2 to 16 to avoid // computing Inf/Inf below. const T x2 = pmin(pset1(16.0f), pmul(x, x)); // Evaluate the numerator polynomial p. T p = ppolevl::run(x2, alpha); p = pmul(x, p); // Evaluate the denominator polynomial p. T q = ppolevl::run(x2, beta); const T r = pdiv(p, q); // Clamp to [-1:1]. return pmax(pmin(r, pset1(1.0f)), pset1(-1.0f)); } template <> template EIGEN_DEVICE_FUNC EIGEN_STRONG_INLINE T generic_fast_erf::run(const T& x) { T x2 = pmul(x, x); T erf_small = pmul(x, erf_over_x_double_small(x2)); // Return early if we don't need the more expensive approximation for any // entry in a. const T one = pset1(1.0); const T x_abs_gt_one_mask = pcmp_lt(one, x2); if (!predux_any(x_abs_gt_one_mask)) return erf_small; // For |x| > 1, use erf(x) = 1 - erfc(x). const T erf_large = psub(one, erfc_double_large(x, x2)); return pselect(x_abs_gt_one_mask, erf_large, erf_small); } template struct erf_impl { typedef typename unpacket_traits::type Scalar; EIGEN_DEVICE_FUNC static EIGEN_STRONG_INLINE T run(const T& x) { return generic_fast_erf::run(x); } }; template struct erf_retval { typedef Scalar type; }; #if EIGEN_HAS_C99_MATH template <> struct erf_impl { EIGEN_DEVICE_FUNC static EIGEN_STRONG_INLINE float run(const float x) { #if defined(SYCL_DEVICE_ONLY) return cl::sycl::erf(x); #else return generic_fast_erf::run(x); #endif } }; template <> struct erf_impl { EIGEN_DEVICE_FUNC static EIGEN_STRONG_INLINE double run(const double x) { #if defined(SYCL_DEVICE_ONLY) return cl::sycl::erf(x); #else return generic_fast_erf::run(x); #endif } }; #endif // EIGEN_HAS_C99_MATH /*************************************************************************** * Implementation of ndtri. * ****************************************************************************/ /* Inverse of Normal distribution function (modified for Eigen). * * * SYNOPSIS: * * double x, y, ndtri(); * * x = ndtri( y ); * * * * DESCRIPTION: * * Returns the argument, x, for which the area under the * Gaussian probability density function (integrated from * minus infinity to x) is equal to y. * * * For small arguments 0 < y < exp(-2), the program computes * z = sqrt( -2.0 * log(y) ); then the approximation is * x = z - log(z)/z - (1/z) P(1/z) / Q(1/z). * There are two rational functions P/Q, one for 0 < y < exp(-32) * and the other for y up to exp(-2). For larger arguments, * w = y - 0.5, and x/sqrt(2pi) = w + w**3 R(w**2)/S(w**2)). * * * ACCURACY: * * Relative error: * arithmetic domain # trials peak rms * DEC 0.125, 1 5500 9.5e-17 2.1e-17 * DEC 6e-39, 0.135 3500 5.7e-17 1.3e-17 * IEEE 0.125, 1 20000 7.2e-16 1.3e-16 * IEEE 3e-308, 0.135 50000 4.6e-16 9.8e-17 * * * ERROR MESSAGES: * * message condition value returned * ndtri domain x == 0 -INF * ndtri domain x == 1 INF * ndtri domain x < 0, x > 1 NAN */ /* Cephes Math Library Release 2.2: June, 1992 Copyright 1985, 1987, 1992 by Stephen L. Moshier Direct inquiries to 30 Frost Street, Cambridge, MA 02140 */ // TODO: Add a cheaper approximation for float. template EIGEN_DEVICE_FUNC EIGEN_STRONG_INLINE T flipsign(const T& should_flipsign, const T& x) { typedef typename unpacket_traits::type Scalar; const T sign_mask = pset1(Scalar(-0.0)); T sign_bit = pand(should_flipsign, sign_mask); return pxor(sign_bit, x); } template <> EIGEN_DEVICE_FUNC EIGEN_STRONG_INLINE double flipsign(const double& should_flipsign, const double& x) { return should_flipsign == 0 ? x : -x; } template <> EIGEN_DEVICE_FUNC EIGEN_STRONG_INLINE float flipsign(const float& should_flipsign, const float& x) { return should_flipsign == 0 ? x : -x; } // We split this computation in to two so that in the scalar path // only one branch is evaluated (due to our template specialization of pselect // being an if statement.) template EIGEN_DEVICE_FUNC EIGEN_STRONG_INLINE T generic_ndtri_gt_exp_neg_two(const T& b) { const ScalarType p0[] = {ScalarType(-5.99633501014107895267e1), ScalarType(9.80010754185999661536e1), ScalarType(-5.66762857469070293439e1), ScalarType(1.39312609387279679503e1), ScalarType(-1.23916583867381258016e0)}; const ScalarType q0[] = {ScalarType(1.0), ScalarType(1.95448858338141759834e0), ScalarType(4.67627912898881538453e0), ScalarType(8.63602421390890590575e1), ScalarType(-2.25462687854119370527e2), ScalarType(2.00260212380060660359e2), ScalarType(-8.20372256168333339912e1), ScalarType(1.59056225126211695515e1), ScalarType(-1.18331621121330003142e0)}; const T sqrt2pi = pset1(ScalarType(2.50662827463100050242e0)); const T half = pset1(ScalarType(0.5)); T c, c2, ndtri_gt_exp_neg_two; c = psub(b, half); c2 = pmul(c, c); ndtri_gt_exp_neg_two = pmadd(c, pmul(c2, pdiv(internal::ppolevl::run(c2, p0), internal::ppolevl::run(c2, q0))), c); return pmul(ndtri_gt_exp_neg_two, sqrt2pi); } template EIGEN_DEVICE_FUNC EIGEN_STRONG_INLINE T generic_ndtri_lt_exp_neg_two(const T& b, const T& should_flipsign) { /* Approximation for interval z = sqrt(-2 log a ) between 2 and 8 * i.e., a between exp(-2) = .135 and exp(-32) = 1.27e-14. */ const ScalarType p1[] = {ScalarType(4.05544892305962419923e0), ScalarType(3.15251094599893866154e1), ScalarType(5.71628192246421288162e1), ScalarType(4.40805073893200834700e1), ScalarType(1.46849561928858024014e1), ScalarType(2.18663306850790267539e0), ScalarType(-1.40256079171354495875e-1), ScalarType(-3.50424626827848203418e-2), ScalarType(-8.57456785154685413611e-4)}; const ScalarType q1[] = {ScalarType(1.0), ScalarType(1.57799883256466749731e1), ScalarType(4.53907635128879210584e1), ScalarType(4.13172038254672030440e1), ScalarType(1.50425385692907503408e1), ScalarType(2.50464946208309415979e0), ScalarType(-1.42182922854787788574e-1), ScalarType(-3.80806407691578277194e-2), ScalarType(-9.33259480895457427372e-4)}; /* Approximation for interval z = sqrt(-2 log a ) between 8 and 64 * i.e., a between exp(-32) = 1.27e-14 and exp(-2048) = 3.67e-890. */ const ScalarType p2[] = {ScalarType(3.23774891776946035970e0), ScalarType(6.91522889068984211695e0), ScalarType(3.93881025292474443415e0), ScalarType(1.33303460815807542389e0), ScalarType(2.01485389549179081538e-1), ScalarType(1.23716634817820021358e-2), ScalarType(3.01581553508235416007e-4), ScalarType(2.65806974686737550832e-6), ScalarType(6.23974539184983293730e-9)}; const ScalarType q2[] = {ScalarType(1.0), ScalarType(6.02427039364742014255e0), ScalarType(3.67983563856160859403e0), ScalarType(1.37702099489081330271e0), ScalarType(2.16236993594496635890e-1), ScalarType(1.34204006088543189037e-2), ScalarType(3.28014464682127739104e-4), ScalarType(2.89247864745380683936e-6), ScalarType(6.79019408009981274425e-9)}; const T eight = pset1(ScalarType(8.0)); const T neg_two = pset1(ScalarType(-2)); T x, x0, x1, z; x = psqrt(pmul(neg_two, plog(b))); x0 = psub(x, pdiv(plog(x), x)); z = preciprocal(x); x1 = pmul(z, pselect(pcmp_lt(x, eight), pdiv(internal::ppolevl::run(z, p1), internal::ppolevl::run(z, q1)), pdiv(internal::ppolevl::run(z, p2), internal::ppolevl::run(z, q2)))); return flipsign(should_flipsign, psub(x0, x1)); } template EIGEN_DEVICE_FUNC EIGEN_ALWAYS_INLINE T generic_ndtri(const T& a) { const T maxnum = pset1(NumTraits::infinity()); const T neg_maxnum = pset1(-NumTraits::infinity()); const T zero = pset1(ScalarType(0)); const T one = pset1(ScalarType(1)); // exp(-2) const T exp_neg_two = pset1(ScalarType(0.13533528323661269189)); T b, ndtri, should_flipsign; should_flipsign = pcmp_le(a, psub(one, exp_neg_two)); b = pselect(should_flipsign, a, psub(one, a)); ndtri = pselect(pcmp_lt(exp_neg_two, b), generic_ndtri_gt_exp_neg_two(b), generic_ndtri_lt_exp_neg_two(b, should_flipsign)); return pselect(pcmp_eq(a, zero), neg_maxnum, pselect(pcmp_eq(one, a), maxnum, ndtri)); } template struct ndtri_retval { typedef Scalar type; }; #if !EIGEN_HAS_C99_MATH template struct ndtri_impl { EIGEN_STATIC_ASSERT((internal::is_same::value == false), THIS_TYPE_IS_NOT_SUPPORTED) EIGEN_DEVICE_FUNC static EIGEN_STRONG_INLINE Scalar run(const Scalar) { return Scalar(0); } }; #else template struct ndtri_impl { EIGEN_DEVICE_FUNC static EIGEN_STRONG_INLINE Scalar run(const Scalar x) { return generic_ndtri(x); } }; #endif // EIGEN_HAS_C99_MATH /************************************************************************************************************** * Implementation of igammac (complemented incomplete gamma integral), based on Cephes but requires C++11/C99 * **************************************************************************************************************/ template struct igammac_retval { typedef Scalar type; }; // NOTE: cephes_helper is also used to implement zeta template struct cephes_helper { EIGEN_DEVICE_FUNC static EIGEN_STRONG_INLINE Scalar machep() { eigen_assert(false && "machep not supported for this type"); return 0.0; } EIGEN_DEVICE_FUNC static EIGEN_STRONG_INLINE Scalar big() { eigen_assert(false && "big not supported for this type"); return 0.0; } EIGEN_DEVICE_FUNC static EIGEN_STRONG_INLINE Scalar biginv() { eigen_assert(false && "biginv not supported for this type"); return 0.0; } }; template <> struct cephes_helper { EIGEN_DEVICE_FUNC static EIGEN_STRONG_INLINE float machep() { return NumTraits::epsilon() / 2; // 1.0 - machep == 1.0 } EIGEN_DEVICE_FUNC static EIGEN_STRONG_INLINE float big() { // use epsneg (1.0 - epsneg == 1.0) return 1.0f / (NumTraits::epsilon() / 2); } EIGEN_DEVICE_FUNC static EIGEN_STRONG_INLINE float biginv() { // epsneg return machep(); } }; template <> struct cephes_helper { EIGEN_DEVICE_FUNC static EIGEN_STRONG_INLINE double machep() { return NumTraits::epsilon() / 2; // 1.0 - machep == 1.0 } EIGEN_DEVICE_FUNC static EIGEN_STRONG_INLINE double big() { return 1.0 / NumTraits::epsilon(); } EIGEN_DEVICE_FUNC static EIGEN_STRONG_INLINE double biginv() { // inverse of eps return NumTraits::epsilon(); } }; enum IgammaComputationMode { VALUE, DERIVATIVE, SAMPLE_DERIVATIVE }; template EIGEN_DEVICE_FUNC static EIGEN_STRONG_INLINE Scalar main_igamma_term(Scalar a, Scalar x) { /* Compute x**a * exp(-x) / gamma(a) */ Scalar logax = a * numext::log(x) - x - lgamma_impl::run(a); if (logax < -numext::log(NumTraits::highest()) || // Assuming x and a aren't Nan. (numext::isnan)(logax)) { return Scalar(0); } return numext::exp(logax); } template EIGEN_DEVICE_FUNC int igamma_num_iterations() { /* Returns the maximum number of internal iterations for igamma computation. */ if (mode == VALUE) { return 2000; } if (internal::is_same::value) { return 200; } else if (internal::is_same::value) { return 500; } else { return 2000; } } template struct igammac_cf_impl { /* Computes igamc(a, x) or derivative (depending on the mode) * using the continued fraction expansion of the complementary * incomplete Gamma function. * * Preconditions: * a > 0 * x >= 1 * x >= a */ EIGEN_DEVICE_FUNC static Scalar run(Scalar a, Scalar x) { const Scalar zero = 0; const Scalar one = 1; const Scalar two = 2; const Scalar machep = cephes_helper::machep(); const Scalar big = cephes_helper::big(); const Scalar biginv = cephes_helper::biginv(); if ((numext::isinf)(x)) { return zero; } Scalar ax = main_igamma_term(a, x); // This is independent of mode. If this value is zero, // then the function value is zero. If the function value is zero, // then we are in a neighborhood where the function value evaluates to zero, // so the derivative is zero. if (ax == zero) { return zero; } // continued fraction Scalar y = one - a; Scalar z = x + y + one; Scalar c = zero; Scalar pkm2 = one; Scalar qkm2 = x; Scalar pkm1 = x + one; Scalar qkm1 = z * x; Scalar ans = pkm1 / qkm1; Scalar dpkm2_da = zero; Scalar dqkm2_da = zero; Scalar dpkm1_da = zero; Scalar dqkm1_da = -x; Scalar dans_da = (dpkm1_da - ans * dqkm1_da) / qkm1; for (int i = 0; i < igamma_num_iterations(); i++) { c += one; y += one; z += two; Scalar yc = y * c; Scalar pk = pkm1 * z - pkm2 * yc; Scalar qk = qkm1 * z - qkm2 * yc; Scalar dpk_da = dpkm1_da * z - pkm1 - dpkm2_da * yc + pkm2 * c; Scalar dqk_da = dqkm1_da * z - qkm1 - dqkm2_da * yc + qkm2 * c; if (qk != zero) { Scalar ans_prev = ans; ans = pk / qk; Scalar dans_da_prev = dans_da; dans_da = (dpk_da - ans * dqk_da) / qk; if (mode == VALUE) { if (numext::abs(ans_prev - ans) <= machep * numext::abs(ans)) { break; } } else { if (numext::abs(dans_da - dans_da_prev) <= machep) { break; } } } pkm2 = pkm1; pkm1 = pk; qkm2 = qkm1; qkm1 = qk; dpkm2_da = dpkm1_da; dpkm1_da = dpk_da; dqkm2_da = dqkm1_da; dqkm1_da = dqk_da; if (numext::abs(pk) > big) { pkm2 *= biginv; pkm1 *= biginv; qkm2 *= biginv; qkm1 *= biginv; dpkm2_da *= biginv; dpkm1_da *= biginv; dqkm2_da *= biginv; dqkm1_da *= biginv; } } /* Compute x**a * exp(-x) / gamma(a) */ Scalar dlogax_da = numext::log(x) - digamma_impl::run(a); Scalar dax_da = ax * dlogax_da; switch (mode) { case VALUE: return ans * ax; case DERIVATIVE: return ans * dax_da + dans_da * ax; case SAMPLE_DERIVATIVE: default: // this is needed to suppress clang warning return -(dans_da + ans * dlogax_da) * x; } } }; template struct igamma_series_impl { /* Computes igam(a, x) or its derivative (depending on the mode) * using the series expansion of the incomplete Gamma function. * * Preconditions: * x > 0 * a > 0 * !(x > 1 && x > a) */ EIGEN_DEVICE_FUNC static Scalar run(Scalar a, Scalar x) { const Scalar zero = 0; const Scalar one = 1; const Scalar machep = cephes_helper::machep(); Scalar ax = main_igamma_term(a, x); // This is independent of mode. If this value is zero, // then the function value is zero. If the function value is zero, // then we are in a neighborhood where the function value evaluates to zero, // so the derivative is zero. if (ax == zero) { return zero; } ax /= a; /* power series */ Scalar r = a; Scalar c = one; Scalar ans = one; Scalar dc_da = zero; Scalar dans_da = zero; for (int i = 0; i < igamma_num_iterations(); i++) { r += one; Scalar term = x / r; Scalar dterm_da = -x / (r * r); dc_da = term * dc_da + dterm_da * c; dans_da += dc_da; c *= term; ans += c; if (mode == VALUE) { if (c <= machep * ans) { break; } } else { if (numext::abs(dc_da) <= machep * numext::abs(dans_da)) { break; } } } Scalar dlogax_da = numext::log(x) - digamma_impl::run(a + one); Scalar dax_da = ax * dlogax_da; switch (mode) { case VALUE: return ans * ax; case DERIVATIVE: return ans * dax_da + dans_da * ax; case SAMPLE_DERIVATIVE: default: // this is needed to suppress clang warning return -(dans_da + ans * dlogax_da) * x / a; } } }; #if !EIGEN_HAS_C99_MATH template struct igammac_impl { EIGEN_STATIC_ASSERT((internal::is_same::value == false), THIS_TYPE_IS_NOT_SUPPORTED) EIGEN_DEVICE_FUNC static Scalar run(Scalar a, Scalar x) { return Scalar(0); } }; #else template struct igammac_impl { EIGEN_DEVICE_FUNC static Scalar run(Scalar a, Scalar x) { /* igamc() * * Incomplete gamma integral (modified for Eigen) * * * * SYNOPSIS: * * double a, x, y, igamc(); * * y = igamc( a, x ); * * DESCRIPTION: * * The function is defined by * * * igamc(a,x) = 1 - igam(a,x) * * inf. * - * 1 | | -t a-1 * = ----- | e t dt. * - | | * | (a) - * x * * * In this implementation both arguments must be positive. * The integral is evaluated by either a power series or * continued fraction expansion, depending on the relative * values of a and x. * * ACCURACY (float): * * Relative error: * arithmetic domain # trials peak rms * IEEE 0,30 30000 7.8e-6 5.9e-7 * * * ACCURACY (double): * * Tested at random a, x. * a x Relative error: * arithmetic domain domain # trials peak rms * IEEE 0.5,100 0,100 200000 1.9e-14 1.7e-15 * IEEE 0.01,0.5 0,100 200000 1.4e-13 1.6e-15 * */ /* Cephes Math Library Release 2.2: June, 1992 Copyright 1985, 1987, 1992 by Stephen L. Moshier Direct inquiries to 30 Frost Street, Cambridge, MA 02140 */ const Scalar zero = 0; const Scalar one = 1; const Scalar nan = NumTraits::quiet_NaN(); if ((x < zero) || (a <= zero)) { // domain error return nan; } if ((numext::isnan)(a) || (numext::isnan)(x)) { // propagate nans return nan; } if ((x < one) || (x < a)) { return (one - igamma_series_impl::run(a, x)); } return igammac_cf_impl::run(a, x); } }; #endif // EIGEN_HAS_C99_MATH /************************************************************************************************ * Implementation of igamma (incomplete gamma integral), based on Cephes but requires C++11/C99 * ************************************************************************************************/ #if !EIGEN_HAS_C99_MATH template struct igamma_generic_impl { EIGEN_STATIC_ASSERT((internal::is_same::value == false), THIS_TYPE_IS_NOT_SUPPORTED) EIGEN_DEVICE_FUNC static EIGEN_STRONG_INLINE Scalar run(Scalar a, Scalar x) { return Scalar(0); } }; #else template struct igamma_generic_impl { EIGEN_DEVICE_FUNC static Scalar run(Scalar a, Scalar x) { /* Depending on the mode, returns * - VALUE: incomplete Gamma function igamma(a, x) * - DERIVATIVE: derivative of incomplete Gamma function d/da igamma(a, x) * - SAMPLE_DERIVATIVE: implicit derivative of a Gamma random variable * x ~ Gamma(x | a, 1), dx/da = -1 / Gamma(x | a, 1) * d igamma(a, x) / dx * * Derivatives are implemented by forward-mode differentiation. */ const Scalar zero = 0; const Scalar one = 1; const Scalar nan = NumTraits::quiet_NaN(); if (x == zero) return zero; if ((x < zero) || (a <= zero)) { // domain error return nan; } if ((numext::isnan)(a) || (numext::isnan)(x)) { // propagate nans return nan; } if ((x > one) && (x > a)) { Scalar ret = igammac_cf_impl::run(a, x); if (mode == VALUE) { return one - ret; } else { return -ret; } } return igamma_series_impl::run(a, x); } }; #endif // EIGEN_HAS_C99_MATH template struct igamma_retval { typedef Scalar type; }; template struct igamma_impl : igamma_generic_impl { /* igam() * Incomplete gamma integral. * * The CDF of Gamma(a, 1) random variable at the point x. * * Accuracy estimation. For each a in [10^-2, 10^-1...10^3] we sample * 50 Gamma random variables x ~ Gamma(x | a, 1), a total of 300 points. * The ground truth is computed by mpmath. Mean absolute error: * float: 1.26713e-05 * double: 2.33606e-12 * * Cephes documentation below. * * SYNOPSIS: * * double a, x, y, igam(); * * y = igam( a, x ); * * DESCRIPTION: * * The function is defined by * * x * - * 1 | | -t a-1 * igam(a,x) = ----- | e t dt. * - | | * | (a) - * 0 * * * In this implementation both arguments must be positive. * The integral is evaluated by either a power series or * continued fraction expansion, depending on the relative * values of a and x. * * ACCURACY (double): * * Relative error: * arithmetic domain # trials peak rms * IEEE 0,30 200000 3.6e-14 2.9e-15 * IEEE 0,100 300000 9.9e-14 1.5e-14 * * * ACCURACY (float): * * Relative error: * arithmetic domain # trials peak rms * IEEE 0,30 20000 7.8e-6 5.9e-7 * */ /* Cephes Math Library Release 2.2: June, 1992 Copyright 1985, 1987, 1992 by Stephen L. Moshier Direct inquiries to 30 Frost Street, Cambridge, MA 02140 */ /* left tail of incomplete gamma function: * * inf. k * a -x - x * x e > ---------- * - - * k=0 | (a+k+1) * */ }; template struct igamma_der_a_retval : igamma_retval {}; template struct igamma_der_a_impl : igamma_generic_impl { /* Derivative of the incomplete Gamma function with respect to a. * * Computes d/da igamma(a, x) by forward differentiation of the igamma code. * * Accuracy estimation. For each a in [10^-2, 10^-1...10^3] we sample * 50 Gamma random variables x ~ Gamma(x | a, 1), a total of 300 points. * The ground truth is computed by mpmath. Mean absolute error: * float: 6.17992e-07 * double: 4.60453e-12 * * Reference: * R. Moore. "Algorithm AS 187: Derivatives of the incomplete gamma * integral". Journal of the Royal Statistical Society. 1982 */ }; template struct gamma_sample_der_alpha_retval : igamma_retval {}; template struct gamma_sample_der_alpha_impl : igamma_generic_impl { /* Derivative of a Gamma random variable sample with respect to alpha. * * Consider a sample of a Gamma random variable with the concentration * parameter alpha: sample ~ Gamma(alpha, 1). The reparameterization * derivative that we want to compute is dsample / dalpha = * d igammainv(alpha, u) / dalpha, where u = igamma(alpha, sample). * However, this formula is numerically unstable and expensive, so instead * we use implicit differentiation: * * igamma(alpha, sample) = u, where u ~ Uniform(0, 1). * Apply d / dalpha to both sides: * d igamma(alpha, sample) / dalpha * + d igamma(alpha, sample) / dsample * dsample/dalpha = 0 * d igamma(alpha, sample) / dalpha * + Gamma(sample | alpha, 1) dsample / dalpha = 0 * dsample/dalpha = - (d igamma(alpha, sample) / dalpha) * / Gamma(sample | alpha, 1) * * Here Gamma(sample | alpha, 1) is the PDF of the Gamma distribution * (note that the derivative of the CDF w.r.t. sample is the PDF). * See the reference below for more details. * * The derivative of igamma(alpha, sample) is computed by forward * differentiation of the igamma code. Division by the Gamma PDF is performed * in the same code, increasing the accuracy and speed due to cancellation * of some terms. * * Accuracy estimation. For each alpha in [10^-2, 10^-1...10^3] we sample * 50 Gamma random variables sample ~ Gamma(sample | alpha, 1), a total of 300 * points. The ground truth is computed by mpmath. Mean absolute error: * float: 2.1686e-06 * double: 1.4774e-12 * * Reference: * M. Figurnov, S. Mohamed, A. Mnih "Implicit Reparameterization Gradients". * 2018 */ }; /***************************************************************************** * Implementation of Riemann zeta function of two arguments, based on Cephes * *****************************************************************************/ template struct zeta_retval { typedef Scalar type; }; template struct zeta_impl_series { EIGEN_STATIC_ASSERT((internal::is_same::value == false), THIS_TYPE_IS_NOT_SUPPORTED) EIGEN_DEVICE_FUNC static EIGEN_STRONG_INLINE Scalar run(const Scalar) { return Scalar(0); } }; template <> struct zeta_impl_series { EIGEN_DEVICE_FUNC static EIGEN_STRONG_INLINE bool run(float& a, float& b, float& s, const float x, const float machep) { int i = 0; while (i < 9) { i += 1; a += 1.0f; b = numext::pow(a, -x); s += b; if (numext::abs(b / s) < machep) return true; } // Return whether we are done return false; } }; template <> struct zeta_impl_series { EIGEN_DEVICE_FUNC static EIGEN_STRONG_INLINE bool run(double& a, double& b, double& s, const double x, const double machep) { int i = 0; while ((i < 9) || (a <= 9.0)) { i += 1; a += 1.0; b = numext::pow(a, -x); s += b; if (numext::abs(b / s) < machep) return true; } // Return whether we are done return false; } }; template struct zeta_impl { EIGEN_DEVICE_FUNC static Scalar run(Scalar x, Scalar q) { /* zeta.c * * Riemann zeta function of two arguments * * * * SYNOPSIS: * * double x, q, y, zeta(); * * y = zeta( x, q ); * * * * DESCRIPTION: * * * * inf. * - -x * zeta(x,q) = > (k+q) * - * k=0 * * where x > 1 and q is not a negative integer or zero. * The Euler-Maclaurin summation formula is used to obtain * the expansion * * n * - -x * zeta(x,q) = > (k+q) * - * k=1 * * 1-x inf. B x(x+1)...(x+2j) * (n+q) 1 - 2j * + --------- - ------- + > -------------------- * x-1 x - x+2j+1 * 2(n+q) j=1 (2j)! (n+q) * * where the B2j are Bernoulli numbers. Note that (see zetac.c) * zeta(x,1) = zetac(x) + 1. * * * * ACCURACY: * * Relative error for single precision: * arithmetic domain # trials peak rms * IEEE 0,25 10000 6.9e-7 1.0e-7 * * Large arguments may produce underflow in powf(), in which * case the results are inaccurate. * * REFERENCE: * * Gradshteyn, I. S., and I. M. Ryzhik, Tables of Integrals, * Series, and Products, p. 1073; Academic Press, 1980. * */ int i; Scalar p, r, a, b, k, s, t, w; const Scalar A[] = { Scalar(12.0), Scalar(-720.0), Scalar(30240.0), Scalar(-1209600.0), Scalar(47900160.0), Scalar(-1.8924375803183791606e9), /*1.307674368e12/691*/ Scalar(7.47242496e10), Scalar(-2.950130727918164224e12), /*1.067062284288e16/3617*/ Scalar(1.1646782814350067249e14), /*5.109094217170944e18/43867*/ Scalar(-4.5979787224074726105e15), /*8.028576626982912e20/174611*/ Scalar(1.8152105401943546773e17), /*1.5511210043330985984e23/854513*/ Scalar(-7.1661652561756670113e18) /*1.6938241367317436694528e27/236364091*/ }; const Scalar maxnum = NumTraits::infinity(); const Scalar zero = Scalar(0.0), half = Scalar(0.5), one = Scalar(1.0); const Scalar machep = cephes_helper::machep(); const Scalar nan = NumTraits::quiet_NaN(); if (x == one) return maxnum; if (x < one) { return nan; } if (q <= zero) { if (q == numext::floor(q)) { if (x == numext::floor(x) && long(x) % 2 == 0) { return maxnum; } else { return nan; } } p = x; r = numext::floor(p); if (p != r) return nan; } /* Permit negative q but continue sum until n+q > +9 . * This case should be handled by a reflection formula. * If q<0 and x is an integer, there is a relation to * the polygamma function. */ s = numext::pow(q, -x); a = q; b = zero; // Run the summation in a helper function that is specific to the floating precision if (zeta_impl_series::run(a, b, s, x, machep)) { return s; } // If b is zero, then the tail sum will also end up being zero. // Exiting early here can prevent NaNs for some large inputs, where // the tail sum computed below has term `a` which can overflow to `inf`. if (numext::equal_strict(b, zero)) { return s; } w = a; s += b * w / (x - one); s -= half * b; a = one; k = zero; for (i = 0; i < 12; i++) { a *= x + k; b /= w; t = a * b / A[i]; s = s + t; t = numext::abs(t / s); if (t < machep) { break; } k += one; a *= x + k; b /= w; k += one; } return s; } }; /**************************************************************************** * Implementation of polygamma function, requires C++11/C99 * ****************************************************************************/ template struct polygamma_retval { typedef Scalar type; }; #if !EIGEN_HAS_C99_MATH template struct polygamma_impl { EIGEN_STATIC_ASSERT((internal::is_same::value == false), THIS_TYPE_IS_NOT_SUPPORTED) EIGEN_DEVICE_FUNC static EIGEN_STRONG_INLINE Scalar run(Scalar n, Scalar x) { return Scalar(0); } }; #else template struct polygamma_impl { EIGEN_DEVICE_FUNC static Scalar run(Scalar n, Scalar x) { Scalar zero = 0.0, one = 1.0; Scalar nplus = n + one; const Scalar nan = NumTraits::quiet_NaN(); // Check that n is a non-negative integer if (numext::floor(n) != n || n < zero) { return nan; } // Just return the digamma function for n = 0 else if (n == zero) { return digamma_impl::run(x); } // Use the same implementation as scipy else { Scalar factorial = numext::exp(lgamma_impl::run(nplus)); return numext::pow(-one, nplus) * factorial * zeta_impl::run(nplus, x); } } }; #endif // EIGEN_HAS_C99_MATH /************************************************************************************************ * Implementation of betainc (incomplete beta integral), based on Cephes but requires C++11/C99 * ************************************************************************************************/ template struct betainc_retval { typedef Scalar type; }; #if !EIGEN_HAS_C99_MATH template struct betainc_impl { EIGEN_STATIC_ASSERT((internal::is_same::value == false), THIS_TYPE_IS_NOT_SUPPORTED) EIGEN_DEVICE_FUNC static EIGEN_STRONG_INLINE Scalar run(Scalar a, Scalar b, Scalar x) { return Scalar(0); } }; #else template struct betainc_impl { EIGEN_STATIC_ASSERT((internal::is_same::value == false), THIS_TYPE_IS_NOT_SUPPORTED) EIGEN_DEVICE_FUNC static EIGEN_STRONG_INLINE Scalar run(Scalar, Scalar, Scalar) { /* betaincf.c * * Incomplete beta integral * * * SYNOPSIS: * * float a, b, x, y, betaincf(); * * y = betaincf( a, b, x ); * * * DESCRIPTION: * * Returns incomplete beta integral of the arguments, evaluated * from zero to x. The function is defined as * * x * - - * | (a+b) | | a-1 b-1 * ----------- | t (1-t) dt. * - - | | * | (a) | (b) - * 0 * * The domain of definition is 0 <= x <= 1. In this * implementation a and b are restricted to positive values. * The integral from x to 1 may be obtained by the symmetry * relation * * 1 - betainc( a, b, x ) = betainc( b, a, 1-x ). * * The integral is evaluated by a continued fraction expansion. * If a < 1, the function calls itself recursively after a * transformation to increase a to a+1. * * ACCURACY (float): * * Tested at random points (a,b,x) with a and b in the indicated * interval and x between 0 and 1. * * arithmetic domain # trials peak rms * Relative error: * IEEE 0,30 10000 3.7e-5 5.1e-6 * IEEE 0,100 10000 1.7e-4 2.5e-5 * The useful domain for relative error is limited by underflow * of the single precision exponential function. * Absolute error: * IEEE 0,30 100000 2.2e-5 9.6e-7 * IEEE 0,100 10000 6.5e-5 3.7e-6 * * Larger errors may occur for extreme ratios of a and b. * * ACCURACY (double): * arithmetic domain # trials peak rms * IEEE 0,5 10000 6.9e-15 4.5e-16 * IEEE 0,85 250000 2.2e-13 1.7e-14 * IEEE 0,1000 30000 5.3e-12 6.3e-13 * IEEE 0,10000 250000 9.3e-11 7.1e-12 * IEEE 0,100000 10000 8.7e-10 4.8e-11 * Outputs smaller than the IEEE gradual underflow threshold * were excluded from these statistics. * * ERROR MESSAGES: * message condition value returned * incbet domain x<0, x>1 nan * incbet underflow nan */ return Scalar(0); } }; /* Continued fraction expansion #1 for incomplete beta integral (small_branch = True) * Continued fraction expansion #2 for incomplete beta integral (small_branch = False) */ template struct incbeta_cfe { EIGEN_STATIC_ASSERT((internal::is_same::value || internal::is_same::value), THIS_TYPE_IS_NOT_SUPPORTED) EIGEN_DEVICE_FUNC static EIGEN_STRONG_INLINE Scalar run(Scalar a, Scalar b, Scalar x, bool small_branch) { const Scalar big = cephes_helper::big(); const Scalar machep = cephes_helper::machep(); const Scalar biginv = cephes_helper::biginv(); const Scalar zero = 0; const Scalar one = 1; const Scalar two = 2; Scalar xk, pk, pkm1, pkm2, qk, qkm1, qkm2; Scalar k1, k2, k3, k4, k5, k6, k7, k8, k26update; Scalar ans; int n; const int num_iters = (internal::is_same::value) ? 100 : 300; const Scalar thresh = (internal::is_same::value) ? machep : Scalar(3) * machep; Scalar r = (internal::is_same::value) ? zero : one; if (small_branch) { k1 = a; k2 = a + b; k3 = a; k4 = a + one; k5 = one; k6 = b - one; k7 = k4; k8 = a + two; k26update = one; } else { k1 = a; k2 = b - one; k3 = a; k4 = a + one; k5 = one; k6 = a + b; k7 = a + one; k8 = a + two; k26update = -one; x = x / (one - x); } pkm2 = zero; qkm2 = one; pkm1 = one; qkm1 = one; ans = one; n = 0; do { xk = -(x * k1 * k2) / (k3 * k4); pk = pkm1 + pkm2 * xk; qk = qkm1 + qkm2 * xk; pkm2 = pkm1; pkm1 = pk; qkm2 = qkm1; qkm1 = qk; xk = (x * k5 * k6) / (k7 * k8); pk = pkm1 + pkm2 * xk; qk = qkm1 + qkm2 * xk; pkm2 = pkm1; pkm1 = pk; qkm2 = qkm1; qkm1 = qk; if (qk != zero) { r = pk / qk; if (numext::abs(ans - r) < numext::abs(r) * thresh) { return r; } ans = r; } k1 += one; k2 += k26update; k3 += two; k4 += two; k5 += one; k6 -= k26update; k7 += two; k8 += two; if ((numext::abs(qk) + numext::abs(pk)) > big) { pkm2 *= biginv; pkm1 *= biginv; qkm2 *= biginv; qkm1 *= biginv; } if ((numext::abs(qk) < biginv) || (numext::abs(pk) < biginv)) { pkm2 *= big; pkm1 *= big; qkm2 *= big; qkm1 *= big; } } while (++n < num_iters); return ans; } }; /* Helper functions depending on the Scalar type */ template struct betainc_helper {}; template <> struct betainc_helper { /* Core implementation, assumes a large (> 1.0) */ EIGEN_DEVICE_FUNC static EIGEN_STRONG_INLINE float incbsa(float aa, float bb, float xx) { float ans, a, b, t, x, onemx; bool reversed_a_b = false; onemx = 1.0f - xx; /* see if x is greater than the mean */ if (xx > (aa / (aa + bb))) { reversed_a_b = true; a = bb; b = aa; t = xx; x = onemx; } else { a = aa; b = bb; t = onemx; x = xx; } /* Choose expansion for optimal convergence */ if (b > 10.0f) { if (numext::abs(b * x / a) < 0.3f) { t = betainc_helper::incbps(a, b, x); if (reversed_a_b) t = 1.0f - t; return t; } } ans = x * (a + b - 2.0f) / (a - 1.0f); if (ans < 1.0f) { ans = incbeta_cfe::run(a, b, x, true /* small_branch */); t = b * numext::log(t); } else { ans = incbeta_cfe::run(a, b, x, false /* small_branch */); t = (b - 1.0f) * numext::log(t); } t += a * numext::log(x) + lgamma_impl::run(a + b) - lgamma_impl::run(a) - lgamma_impl::run(b); t += numext::log(ans / a); t = numext::exp(t); if (reversed_a_b) t = 1.0f - t; return t; } EIGEN_DEVICE_FUNC static EIGEN_STRONG_INLINE float incbps(float a, float b, float x) { float t, u, y, s; const float machep = cephes_helper::machep(); y = a * numext::log(x) + (b - 1.0f) * numext::log1p(-x) - numext::log(a); y -= lgamma_impl::run(a) + lgamma_impl::run(b); y += lgamma_impl::run(a + b); t = x / (1.0f - x); s = 0.0f; u = 1.0f; do { b -= 1.0f; if (b == 0.0f) { break; } a += 1.0f; u *= t * b / a; s += u; } while (numext::abs(u) > machep); return numext::exp(y) * (1.0f + s); } }; template <> struct betainc_impl { EIGEN_DEVICE_FUNC static float run(float a, float b, float x) { const float nan = NumTraits::quiet_NaN(); float ans, t; if (a <= 0.0f) return nan; if (b <= 0.0f) return nan; if ((x <= 0.0f) || (x >= 1.0f)) { if (x == 0.0f) return 0.0f; if (x == 1.0f) return 1.0f; // mtherr("betaincf", DOMAIN); return nan; } /* transformation for small aa */ if (a <= 1.0f) { ans = betainc_helper::incbsa(a + 1.0f, b, x); t = a * numext::log(x) + b * numext::log1p(-x) + lgamma_impl::run(a + b) - lgamma_impl::run(a + 1.0f) - lgamma_impl::run(b); return (ans + numext::exp(t)); } else { return betainc_helper::incbsa(a, b, x); } } }; template <> struct betainc_helper { EIGEN_DEVICE_FUNC static EIGEN_STRONG_INLINE double incbps(double a, double b, double x) { const double machep = cephes_helper::machep(); double s, t, u, v, n, t1, z, ai; ai = 1.0 / a; u = (1.0 - b) * x; v = u / (a + 1.0); t1 = v; t = u; n = 2.0; s = 0.0; z = machep * ai; while (numext::abs(v) > z) { u = (n - b) * x / n; t *= u; v = t / (a + n); s += v; n += 1.0; } s += t1; s += ai; u = a * numext::log(x); // TODO: gamma() is not directly implemented in Eigen. /* if ((a + b) < maxgam && numext::abs(u) < maxlog) { t = gamma(a + b) / (gamma(a) * gamma(b)); s = s * t * pow(x, a); } */ t = lgamma_impl::run(a + b) - lgamma_impl::run(a) - lgamma_impl::run(b) + u + numext::log(s); return s = numext::exp(t); } }; template <> struct betainc_impl { EIGEN_DEVICE_FUNC static double run(double aa, double bb, double xx) { const double nan = NumTraits::quiet_NaN(); const double machep = cephes_helper::machep(); // const double maxgam = 171.624376956302725; double a, b, t, x, xc, w, y; bool reversed_a_b = false; if (aa <= 0.0 || bb <= 0.0) { return nan; // goto domerr; } if ((xx <= 0.0) || (xx >= 1.0)) { if (xx == 0.0) return (0.0); if (xx == 1.0) return (1.0); // mtherr("incbet", DOMAIN); return nan; } if ((bb * xx) <= 1.0 && xx <= 0.95) { return betainc_helper::incbps(aa, bb, xx); } w = 1.0 - xx; /* Reverse a and b if x is greater than the mean. */ if (xx > (aa / (aa + bb))) { reversed_a_b = true; a = bb; b = aa; xc = xx; x = w; } else { a = aa; b = bb; xc = w; x = xx; } if (reversed_a_b && (b * x) <= 1.0 && x <= 0.95) { t = betainc_helper::incbps(a, b, x); if (t <= machep) { t = 1.0 - machep; } else { t = 1.0 - t; } return t; } /* Choose expansion for better convergence. */ y = x * (a + b - 2.0) - (a - 1.0); if (y < 0.0) { w = incbeta_cfe::run(a, b, x, true /* small_branch */); } else { w = incbeta_cfe::run(a, b, x, false /* small_branch */) / xc; } /* Multiply w by the factor a b _ _ _ x (1-x) | (a+b) / ( a | (a) | (b) ) . */ y = a * numext::log(x); t = b * numext::log(xc); // TODO: gamma is not directly implemented in Eigen. /* if ((a + b) < maxgam && numext::abs(y) < maxlog && numext::abs(t) < maxlog) { t = pow(xc, b); t *= pow(x, a); t /= a; t *= w; t *= gamma(a + b) / (gamma(a) * gamma(b)); } else { */ /* Resort to logarithms. */ y += t + lgamma_impl::run(a + b) - lgamma_impl::run(a) - lgamma_impl::run(b); y += numext::log(w / a); t = numext::exp(y); /* } */ // done: if (reversed_a_b) { if (t <= machep) { t = 1.0 - machep; } else { t = 1.0 - t; } } return t; } }; #endif // EIGEN_HAS_C99_MATH } // end namespace internal namespace numext { template EIGEN_DEVICE_FUNC inline EIGEN_MATHFUNC_RETVAL(lgamma, Scalar) lgamma(const Scalar& x) { return EIGEN_MATHFUNC_IMPL(lgamma, Scalar)::run(x); } template EIGEN_DEVICE_FUNC inline EIGEN_MATHFUNC_RETVAL(digamma, Scalar) digamma(const Scalar& x) { return EIGEN_MATHFUNC_IMPL(digamma, Scalar)::run(x); } template EIGEN_DEVICE_FUNC inline EIGEN_MATHFUNC_RETVAL(zeta, Scalar) zeta(const Scalar& x, const Scalar& q) { return EIGEN_MATHFUNC_IMPL(zeta, Scalar)::run(x, q); } template EIGEN_DEVICE_FUNC inline EIGEN_MATHFUNC_RETVAL(polygamma, Scalar) polygamma(const Scalar& n, const Scalar& x) { return EIGEN_MATHFUNC_IMPL(polygamma, Scalar)::run(n, x); } template EIGEN_DEVICE_FUNC inline EIGEN_MATHFUNC_RETVAL(erf, Scalar) erf(const Scalar& x) { return EIGEN_MATHFUNC_IMPL(erf, Scalar)::run(x); } template EIGEN_DEVICE_FUNC inline EIGEN_MATHFUNC_RETVAL(erfc, Scalar) erfc(const Scalar& x) { return EIGEN_MATHFUNC_IMPL(erfc, Scalar)::run(x); } template EIGEN_DEVICE_FUNC inline EIGEN_MATHFUNC_RETVAL(ndtri, Scalar) ndtri(const Scalar& x) { return EIGEN_MATHFUNC_IMPL(ndtri, Scalar)::run(x); } template EIGEN_DEVICE_FUNC inline EIGEN_MATHFUNC_RETVAL(igamma, Scalar) igamma(const Scalar& a, const Scalar& x) { return EIGEN_MATHFUNC_IMPL(igamma, Scalar)::run(a, x); } template EIGEN_DEVICE_FUNC inline EIGEN_MATHFUNC_RETVAL(igamma_der_a, Scalar) igamma_der_a(const Scalar& a, const Scalar& x) { return EIGEN_MATHFUNC_IMPL(igamma_der_a, Scalar)::run(a, x); } template EIGEN_DEVICE_FUNC inline EIGEN_MATHFUNC_RETVAL(gamma_sample_der_alpha, Scalar) gamma_sample_der_alpha(const Scalar& a, const Scalar& x) { return EIGEN_MATHFUNC_IMPL(gamma_sample_der_alpha, Scalar)::run(a, x); } template EIGEN_DEVICE_FUNC inline EIGEN_MATHFUNC_RETVAL(igammac, Scalar) igammac(const Scalar& a, const Scalar& x) { return EIGEN_MATHFUNC_IMPL(igammac, Scalar)::run(a, x); } template EIGEN_DEVICE_FUNC inline EIGEN_MATHFUNC_RETVAL(betainc, Scalar) betainc(const Scalar& a, const Scalar& b, const Scalar& x) { return EIGEN_MATHFUNC_IMPL(betainc, Scalar)::run(a, b, x); } } // end namespace numext } // end namespace Eigen #endif // EIGEN_SPECIAL_FUNCTIONS_H