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737 lines
24 KiB
C++
737 lines
24 KiB
C++
/**************************** vectormath_hyp.h ******************************
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* Author: Agner Fog
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* Date created: 2014-07-09
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* Last modified: 2014-10-16
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* Version: 1.16
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* Project: vector classes
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* Description:
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* Header file containing inline vector functions of hyperbolic and inverse
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* hyperbolic functions:
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* sinh hyperbolic sine
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* cosh hyperbolic cosine
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* tanh hyperbolic tangent
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* asinh inverse hyperbolic sine
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* acosh inverse hyperbolic cosine
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* atanh inverse hyperbolic tangent
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*
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* Theory, methods and inspiration based partially on these sources:
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* > Moshier, Stephen Lloyd Baluk: Methods and programs for mathematical functions.
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* Ellis Horwood, 1989.
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* > VDT library developed on CERN by Danilo Piparo, Thomas Hauth and
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* Vincenzo Innocente, 2012, https://svnweb.cern.ch/trac/vdt
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* > Cephes math library by Stephen L. Moshier 1992,
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* http://www.netlib.org/cephes/
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*
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* For detailed instructions, see vectormath_common.h and VectorClass.pdf
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*
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* (c) Copyright 2014 GNU General Public License http://www.gnu.org/licenses
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******************************************************************************/
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#ifndef VECTORMATH_HYP_H
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#define VECTORMATH_HYP_H 1
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#include "vectormath_exp.h"
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/******************************************************************************
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* Hyperbolic functions
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******************************************************************************/
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// Template for sinh function, double precision
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// This function does not produce denormals
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// Template parameters:
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// VTYPE: double vector type
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// BTYPE: boolean vector type
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template<class VTYPE, class BTYPE>
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static inline VTYPE sinh_d(VTYPE const & x0) {
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// The limit of abs(x) is 709.7, as defined by max_x in vectormath_exp.h for 0.5*exp(x).
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// Coefficients
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const double p0 = -3.51754964808151394800E5;
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const double p1 = -1.15614435765005216044E4;
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const double p2 = -1.63725857525983828727E2;
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const double p3 = -7.89474443963537015605E-1;
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const double q0 = -2.11052978884890840399E6;
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const double q1 = 3.61578279834431989373E4;
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const double q2 = -2.77711081420602794433E2;
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const double q3 = 1.0;
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// data vectors
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VTYPE x, x2, y1, y2;
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BTYPE x_small; // boolean vector
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x = abs(x0);
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x_small = x <= 1.0; // use Pade approximation if abs(x) <= 1
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if (horizontal_or(x_small)) {
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// At least one element needs small method
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x2 = x*x;
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y1 = polynomial_3(x2, p0, p1, p2, p3) / polynomial_3(x2, q0, q1, q2, q3);
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y1 = mul_add(y1, x*x2, x); // y1 = x + x2*(x*y1);
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}
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if (!horizontal_and(x_small)) {
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// At least one element needs big method
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y2 = exp_d<VTYPE, BTYPE, 0, 1>(x); // 0.5 * exp(x)
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y2 -= 0.25 / y2; // - 0.5 * exp(-x)
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}
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y1 = select(x_small, y1, y2); // choose method
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y1 = sign_combine(y1, x0); // get original sign
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return y1;
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}
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// instances of sinh_d template
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static inline Vec2d sinh(Vec2d const & x) {
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return sinh_d<Vec2d, Vec2db>(x);
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}
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#if MAX_VECTOR_SIZE >= 256
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static inline Vec4d sinh(Vec4d const & x) {
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return sinh_d<Vec4d, Vec4db>(x);
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}
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#endif // MAX_VECTOR_SIZE >= 256
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#if MAX_VECTOR_SIZE >= 512
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static inline Vec8d sinh(Vec8d const & x) {
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return sinh_d<Vec8d, Vec8db>(x);
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}
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#endif // MAX_VECTOR_SIZE >= 512
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// Template for sinh function, single precision
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// This function does not produce denormals
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// Template parameters:
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// VTYPE: double vector type
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// BTYPE: boolean vector type
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template<class VTYPE, class BTYPE>
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static inline VTYPE sinh_f(VTYPE const & x0) {
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// The limit of abs(x) is 89.0, as defined by max_x in vectormath_exp.h for 0.5*exp(x).
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// Coefficients
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const float r0 = 1.66667160211E-1f;
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const float r1 = 8.33028376239E-3f;
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const float r2 = 2.03721912945E-4f;
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// data vectors
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VTYPE x, x2, y1, y2;
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BTYPE x_small; // boolean vector
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x = abs(x0);
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x_small = x <= 1.0f; // use polynomial approximation if abs(x) <= 1
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if (horizontal_or(x_small)) {
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// At least one element needs small method
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x2 = x*x;
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y1 = polynomial_2(x2, r0, r1, r2);
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y1 = mul_add(y1, x2*x, x); // y1 = x + x2*(x*y1);
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}
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if (!horizontal_and(x_small)) {
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// At least one element needs big method
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y2 = exp_f<VTYPE, BTYPE, 0, 1>(x); // 0.5 * exp(x)
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y2 -= 0.25f / y2; // - 0.5 * exp(-x)
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}
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y1 = select(x_small, y1, y2); // choose method
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y1 = sign_combine(y1, x0); // get original sign
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return y1;
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}
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// instances of sinh_f template
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static inline Vec4f sinh(Vec4f const & x) {
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return sinh_f<Vec4f, Vec4fb>(x);
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}
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#if MAX_VECTOR_SIZE >= 256
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static inline Vec8f sinh(Vec8f const & x) {
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return sinh_f<Vec8f, Vec8fb>(x);
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}
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#endif // MAX_VECTOR_SIZE >= 256
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#if MAX_VECTOR_SIZE >= 512
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static inline Vec16f sinh(Vec16f const & x) {
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return sinh_f<Vec16f, Vec16fb>(x);
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}
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#endif // MAX_VECTOR_SIZE >= 512
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// Template for cosh function, double precision
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// This function does not produce denormals
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// Template parameters:
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// VTYPE: double vector type
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// BTYPE: boolean vector type
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template<class VTYPE, class BTYPE>
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static inline VTYPE cosh_d(VTYPE const & x0) {
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// The limit of abs(x) is 709.7, as defined by max_x in vectormath_exp.h for 0.5*exp(x).
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// data vectors
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VTYPE x, y;
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x = abs(x0);
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y = exp_d<VTYPE, BTYPE, 0, 1>(x); // 0.5 * exp(x)
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y += 0.25 / y; // + 0.5 * exp(-x)
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return y;
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}
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// instances of sinh_d template
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static inline Vec2d cosh(Vec2d const & x) {
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return cosh_d<Vec2d, Vec2db>(x);
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}
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#if MAX_VECTOR_SIZE >= 256
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static inline Vec4d cosh(Vec4d const & x) {
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return cosh_d<Vec4d, Vec4db>(x);
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}
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#endif // MAX_VECTOR_SIZE >= 256
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#if MAX_VECTOR_SIZE >= 512
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static inline Vec8d cosh(Vec8d const & x) {
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return cosh_d<Vec8d, Vec8db>(x);
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}
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#endif // MAX_VECTOR_SIZE >= 512
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// Template for cosh function, single precision
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// This function does not produce denormals
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// Template parameters:
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// VTYPE: double vector type
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// BTYPE: boolean vector type
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template<class VTYPE, class BTYPE>
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static inline VTYPE cosh_f(VTYPE const & x0) {
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// The limit of abs(x) is 89.0, as defined by max_x in vectormath_exp.h for 0.5*exp(x).
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// data vectors
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VTYPE x, y;
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x = abs(x0);
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y = exp_f<VTYPE, BTYPE, 0, 1>(x); // 0.5 * exp(x)
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y += 0.25f / y; // + 0.5 * exp(-x)
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return y;
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}
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// instances of sinh_d template
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static inline Vec4f cosh(Vec4f const & x) {
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return cosh_f<Vec4f, Vec4fb>(x);
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}
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#if MAX_VECTOR_SIZE >= 256
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static inline Vec8f cosh(Vec8f const & x) {
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return cosh_f<Vec8f, Vec8fb>(x);
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}
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#endif // MAX_VECTOR_SIZE >= 256
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#if MAX_VECTOR_SIZE >= 512
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static inline Vec16f cosh(Vec16f const & x) {
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return cosh_f<Vec16f, Vec16fb>(x);
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}
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#endif // MAX_VECTOR_SIZE >= 512
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// Template for tanh function, double precision
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// This function does not produce denormals
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// Template parameters:
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// VTYPE: double vector type
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// BTYPE: boolean vector type
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template<class VTYPE, class BTYPE>
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static inline VTYPE tanh_d(VTYPE const & x0) {
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// Coefficients
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const double p0 = -1.61468768441708447952E3;
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const double p1 = -9.92877231001918586564E1;
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const double p2 = -9.64399179425052238628E-1;
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const double q0 = 4.84406305325125486048E3;
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const double q1 = 2.23548839060100448583E3;
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const double q2 = 1.12811678491632931402E2;
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const double q3 = 1.0;
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// data vectors
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VTYPE x, x2, y1, y2;
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BTYPE x_small, x_big; // boolean vectors
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x = abs(x0);
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x_small = x <= 0.625; // use Pade approximation if abs(x) <= 5/8
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if (horizontal_or(x_small)) {
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// At least one element needs small method
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x2 = x*x;
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y1 = polynomial_2(x2, p0, p1, p2) / polynomial_3(x2, q0, q1, q2, q3);
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y1 = mul_add(y1, x2*x, x); // y1 = x + x2*(x*y1);
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}
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if (!horizontal_and(x_small)) {
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// At least one element needs big method
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y2 = exp(x+x); // exp(2*x)
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y2 = 1.0 - 2.0 / (y2 + 1.0); // tanh(x)
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}
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x_big = x > 350.;
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y1 = select(x_small, y1, y2); // choose method
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y1 = select(x_big, 1.0, y1); // avoid overflow
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y1 = sign_combine(y1, x0); // get original sign
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return y1;
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}
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// instances of tanh_d template
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static inline Vec2d tanh(Vec2d const & x) {
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return tanh_d<Vec2d, Vec2db>(x);
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}
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#if MAX_VECTOR_SIZE >= 256
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static inline Vec4d tanh(Vec4d const & x) {
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return tanh_d<Vec4d, Vec4db>(x);
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}
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#endif // MAX_VECTOR_SIZE >= 256
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#if MAX_VECTOR_SIZE >= 512
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static inline Vec8d tanh(Vec8d const & x) {
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return tanh_d<Vec8d, Vec8db>(x);
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}
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#endif // MAX_VECTOR_SIZE >= 512
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// Template for tanh function, single precision
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// This function does not produce denormals
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// Template parameters:
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// VTYPE: double vector type
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// BTYPE: boolean vector type
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template<class VTYPE, class BTYPE>
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static inline VTYPE tanh_f(VTYPE const & x0) {
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// The limit of abs(x) is 89.0, as defined by max_x in vectormath_exp.h for 0.5*exp(x).
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// Coefficients
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const float r0 = -3.33332819422E-1f;
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const float r1 = 1.33314422036E-1f;
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const float r2 = -5.37397155531E-2f;
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const float r3 = 2.06390887954E-2f;
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const float r4 = -5.70498872745E-3f;
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// data vectors
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VTYPE x, x2, y1, y2;
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BTYPE x_small, x_big; // boolean vectors
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x = abs(x0);
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x_small = x <= 0.625f; // use polynomial approximation if abs(x) <= 5/8
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if (horizontal_or(x_small)) {
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// At least one element needs small method
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x2 = x*x;
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y1 = polynomial_4(x2, r0, r1, r2, r3, r4);
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y1 = mul_add(y1, x2*x, x); // y1 = x + (x2*x)*y1;
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}
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if (!horizontal_and(x_small)) {
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// At least one element needs big method
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y2 = exp(x+x); // exp(2*x)
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y2 = 1.0f - 2.0f / (y2 + 1.0f); // tanh(x)
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}
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x_big = x > 44.4f;
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y1 = select(x_small, y1, y2); // choose method
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y1 = select(x_big, 1.0f, y1); // avoid overflow
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y1 = sign_combine(y1, x0); // get original sign
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return y1;
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}
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// instances of tanh_f template
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static inline Vec4f tanh(Vec4f const & x) {
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return tanh_f<Vec4f, Vec4fb>(x);
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}
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#if MAX_VECTOR_SIZE >= 256
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static inline Vec8f tanh(Vec8f const & x) {
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return tanh_f<Vec8f, Vec8fb>(x);
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}
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#endif // MAX_VECTOR_SIZE >= 256
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#if MAX_VECTOR_SIZE >= 512
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static inline Vec16f tanh(Vec16f const & x) {
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return tanh_f<Vec16f, Vec16fb>(x);
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}
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#endif // MAX_VECTOR_SIZE >= 512
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/******************************************************************************
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* Inverse hyperbolic functions
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******************************************************************************/
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// Template for asinh function, double precision
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// This function does not produce denormals
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// Template parameters:
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// VTYPE: double vector type
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// BTYPE: boolean vector type
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template<class VTYPE, class BTYPE>
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static inline VTYPE asinh_d(VTYPE const & x0) {
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// Coefficients
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const double p0 = -5.56682227230859640450E0;
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const double p1 = -9.09030533308377316566E0;
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const double p2 = -4.37390226194356683570E0;
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const double p3 = -5.91750212056387121207E-1;
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const double p4 = -4.33231683752342103572E-3;
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const double q0 = 3.34009336338516356383E1;
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const double q1 = 6.95722521337257608734E1;
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const double q2 = 4.86042483805291788324E1;
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const double q3 = 1.28757002067426453537E1;
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const double q4 = 1.0;
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// data vectors
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VTYPE x, x2, y1, y2;
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BTYPE x_small, x_huge; // boolean vectors
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x2 = x0 * x0;
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x = abs(x0);
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x_small = x <= 0.533; // use Pade approximation if abs(x) <= 0.5
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// both methods give the highest error close to 0.5. this limit is adjusted for minimum error
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x_huge = x > 1.E20; // simple approximation, avoid overflow
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if (horizontal_or(x_small)) {
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// At least one element needs small method
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y1 = polynomial_4(x2, p0, p1, p2, p3, p4) / polynomial_4(x2, q0, q1, q2, q3, q4);
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y1 = mul_add(y1, x2*x, x); // y1 = x + (x2*x)*y1;
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}
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if (!horizontal_and(x_small)) {
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// At least one element needs big method
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y2 = log(x + sqrt(x2 + 1.0));
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if (horizontal_or(x_huge)) {
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// At least one element needs huge method to avoid overflow
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y2 = select(x_huge, log(x) + VM_LN2, y2);
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}
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}
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y1 = select(x_small, y1, y2); // choose method
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y1 = sign_combine(y1, x0); // get original sign
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return y1;
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}
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// instances of asinh_d template
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static inline Vec2d asinh(Vec2d const & x) {
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return asinh_d<Vec2d, Vec2db>(x);
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}
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#if MAX_VECTOR_SIZE >= 256
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static inline Vec4d asinh(Vec4d const & x) {
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return asinh_d<Vec4d, Vec4db>(x);
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}
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#endif // MAX_VECTOR_SIZE >= 256
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#if MAX_VECTOR_SIZE >= 512
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static inline Vec8d asinh(Vec8d const & x) {
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return asinh_d<Vec8d, Vec8db>(x);
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}
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#endif // MAX_VECTOR_SIZE >= 512
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// Template for asinh function, single precision
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// This function does not produce denormals
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// Template parameters:
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// VTYPE: double vector type
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// BTYPE: boolean vector type
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template<class VTYPE, class BTYPE>
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static inline VTYPE asinh_f(VTYPE const & x0) {
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// Coefficients
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const float r0 = -1.6666288134E-1f;
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const float r1 = 7.4847586088E-2f;
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const float r2 = -4.2699340972E-2f;
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const float r3 = 2.0122003309E-2f;
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// data vectors
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VTYPE x, x2, y1, y2;
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BTYPE x_small, x_huge; // boolean vectors
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x2 = x0 * x0;
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x = abs(x0);
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x_small = x <= 0.51f; // use polynomial approximation if abs(x) <= 0.5
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x_huge = x > 1.E10f; // simple approximation, avoid overflow
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if (horizontal_or(x_small)) {
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// At least one element needs small method
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y1 = polynomial_3(x2, r0, r1, r2, r3);
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y1 = mul_add(y1, x2*x, x); // y1 = x + (x2*x)*y1;
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}
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if (!horizontal_and(x_small)) {
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// At least one element needs big method
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y2 = log(x + sqrt(x2 + 1.0f));
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if (horizontal_or(x_huge)) {
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// At least one element needs huge method to avoid overflow
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y2 = select(x_huge, log(x) + (float)VM_LN2, y2);
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}
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}
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y1 = select(x_small, y1, y2); // choose method
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y1 = sign_combine(y1, x0); // get original sign
|
|
|
|
return y1;
|
|
}
|
|
|
|
// instances of asinh_f template
|
|
static inline Vec4f asinh(Vec4f const & x) {
|
|
return asinh_f<Vec4f, Vec4fb>(x);
|
|
}
|
|
|
|
#if MAX_VECTOR_SIZE >= 256
|
|
static inline Vec8f asinh(Vec8f const & x) {
|
|
return asinh_f<Vec8f, Vec8fb>(x);
|
|
}
|
|
#endif // MAX_VECTOR_SIZE >= 256
|
|
|
|
#if MAX_VECTOR_SIZE >= 512
|
|
static inline Vec16f asinh(Vec16f const & x) {
|
|
return asinh_f<Vec16f, Vec16fb>(x);
|
|
}
|
|
#endif // MAX_VECTOR_SIZE >= 512
|
|
|
|
|
|
// Template for acosh function, double precision
|
|
// This function does not produce denormals
|
|
// Template parameters:
|
|
// VTYPE: double vector type
|
|
// BTYPE: boolean vector type
|
|
template<class VTYPE, class BTYPE>
|
|
static inline VTYPE acosh_d(VTYPE const & x0) {
|
|
|
|
// Coefficients
|
|
const double p0 = 1.10855947270161294369E5;
|
|
const double p1 = 1.08102874834699867335E5;
|
|
const double p2 = 3.43989375926195455866E4;
|
|
const double p3 = 3.94726656571334401102E3;
|
|
const double p4 = 1.18801130533544501356E2;
|
|
|
|
const double q0 = 7.83869920495893927727E4;
|
|
const double q1 = 8.29725251988426222434E4;
|
|
const double q2 = 2.97683430363289370382E4;
|
|
const double q3 = 4.15352677227719831579E3;
|
|
const double q4 = 1.86145380837903397292E2;
|
|
const double q5 = 1.0;
|
|
|
|
// data vectors
|
|
VTYPE x1, y1, y2;
|
|
BTYPE x_small, x_huge, undef; // boolean vectors
|
|
|
|
x1 = x0 - 1.0;
|
|
undef = x0 < 1.0; // result is NAN
|
|
x_small = x1 < 0.49; // use Pade approximation if abs(x-1) < 0.5
|
|
x_huge = x1 > 1.E20; // simple approximation, avoid overflow
|
|
|
|
if (horizontal_or(x_small)) {
|
|
// At least one element needs small method
|
|
y1 = sqrt(x1) * (polynomial_4(x1, p0, p1, p2, p3, p4) / polynomial_5(x1, q0, q1, q2, q3, q4, q5));
|
|
// x < 1 generates NAN
|
|
y1 = select(undef, nan_vec<VTYPE>(NAN_HYP), y1);
|
|
}
|
|
if (!horizontal_and(x_small)) {
|
|
// At least one element needs big method
|
|
y2 = log(x0 + sqrt(mul_sub(x0,x0,1.0)));
|
|
if (horizontal_or(x_huge)) {
|
|
// At least one element needs huge method to avoid overflow
|
|
y2 = select(x_huge, log(x0) + VM_LN2, y2);
|
|
}
|
|
}
|
|
y1 = select(x_small, y1, y2); // choose method
|
|
return y1;
|
|
}
|
|
|
|
// instances of acosh_d template
|
|
static inline Vec2d acosh(Vec2d const & x) {
|
|
return acosh_d<Vec2d, Vec2db>(x);
|
|
}
|
|
|
|
#if MAX_VECTOR_SIZE >= 256
|
|
static inline Vec4d acosh(Vec4d const & x) {
|
|
return acosh_d<Vec4d, Vec4db>(x);
|
|
}
|
|
#endif // MAX_VECTOR_SIZE >= 256
|
|
|
|
#if MAX_VECTOR_SIZE >= 512
|
|
static inline Vec8d acosh(Vec8d const & x) {
|
|
return acosh_d<Vec8d, Vec8db>(x);
|
|
}
|
|
#endif // MAX_VECTOR_SIZE >= 512
|
|
|
|
|
|
// Template for acosh function, single precision
|
|
// This function does not produce denormals
|
|
// Template parameters:
|
|
// VTYPE: double vector type
|
|
// BTYPE: boolean vector type
|
|
template<class VTYPE, class BTYPE>
|
|
static inline VTYPE acosh_f(VTYPE const & x0) {
|
|
|
|
// Coefficients
|
|
const float r0 = 1.4142135263E0f;
|
|
const float r1 = -1.1784741703E-1f;
|
|
const float r2 = 2.6454905019E-2f;
|
|
const float r3 = -7.5272886713E-3f;
|
|
const float r4 = 1.7596881071E-3f;
|
|
|
|
// data vectors
|
|
VTYPE x1, y1, y2;
|
|
BTYPE x_small, x_huge, undef; // boolean vectors
|
|
|
|
x1 = x0 - 1.0f;
|
|
undef = x0 < 1.0f; // result is NAN
|
|
x_small = x1 < 0.49f; // use Pade approximation if abs(x-1) < 0.5
|
|
x_huge = x1 > 1.E10f; // simple approximation, avoid overflow
|
|
|
|
if (horizontal_or(x_small)) {
|
|
// At least one element needs small method
|
|
y1 = sqrt(x1) * polynomial_4(x1, r0, r1, r2, r3, r4);
|
|
// x < 1 generates NAN
|
|
y1 = select(undef, nan_vec<VTYPE>(NAN_HYP), y1);
|
|
}
|
|
if (!horizontal_and(x_small)) {
|
|
// At least one element needs big method
|
|
y2 = log(x0 + sqrt(mul_sub(x0,x0,1.0)));
|
|
if (horizontal_or(x_huge)) {
|
|
// At least one element needs huge method to avoid overflow
|
|
y2 = select(x_huge, log(x0) + (float)VM_LN2, y2);
|
|
}
|
|
}
|
|
y1 = select(x_small, y1, y2); // choose method
|
|
return y1;
|
|
}
|
|
|
|
// instances of acosh_f template
|
|
static inline Vec4f acosh(Vec4f const & x) {
|
|
return acosh_f<Vec4f, Vec4fb>(x);
|
|
}
|
|
|
|
#if MAX_VECTOR_SIZE >= 256
|
|
static inline Vec8f acosh(Vec8f const & x) {
|
|
return acosh_f<Vec8f, Vec8fb>(x);
|
|
}
|
|
#endif // MAX_VECTOR_SIZE >= 256
|
|
|
|
#if MAX_VECTOR_SIZE >= 512
|
|
static inline Vec16f acosh(Vec16f const & x) {
|
|
return acosh_f<Vec16f, Vec16fb>(x);
|
|
}
|
|
#endif // MAX_VECTOR_SIZE >= 512
|
|
|
|
|
|
// Template for atanh function, double precision
|
|
// This function does not produce denormals
|
|
// Template parameters:
|
|
// VTYPE: double vector type
|
|
// BTYPE: boolean vector type
|
|
template<class VTYPE, class BTYPE>
|
|
static inline VTYPE atanh_d(VTYPE const & x0) {
|
|
|
|
// Coefficients
|
|
const double p0 = -3.09092539379866942570E1;
|
|
const double p1 = 6.54566728676544377376E1;
|
|
const double p2 = -4.61252884198732692637E1;
|
|
const double p3 = 1.20426861384072379242E1;
|
|
const double p4 = -8.54074331929669305196E-1;
|
|
|
|
const double q0 = -9.27277618139601130017E1;
|
|
const double q1 = 2.52006675691344555838E2;
|
|
const double q2 = -2.49839401325893582852E2;
|
|
const double q3 = 1.08938092147140262656E2;
|
|
const double q4 = -1.95638849376911654834E1;
|
|
const double q5 = 1.0;
|
|
|
|
// data vectors
|
|
VTYPE x, x2, y1, y2, y3;
|
|
BTYPE x_small; // boolean vector
|
|
|
|
x = abs(x0);
|
|
x_small = x < 0.5; // use Pade approximation if abs(x) < 0.5
|
|
|
|
if (horizontal_or(x_small)) {
|
|
// At least one element needs small method
|
|
x2 = x * x;
|
|
y1 = polynomial_4(x2, p0, p1, p2, p3, p4) / polynomial_5(x2, q0, q1, q2, q3, q4, q5);
|
|
y1 = mul_add(y1, x2*x, x);
|
|
}
|
|
if (!horizontal_and(x_small)) {
|
|
// At least one element needs big method
|
|
y2 = log((1.0+x)/(1.0-x)) * 0.5;
|
|
// check if out of range
|
|
y3 = select(x == 1.0, infinite_vec<VTYPE>(), nan_vec<VTYPE>(NAN_HYP));
|
|
y2 = select(x >= 1.0, y3, y2);
|
|
}
|
|
y1 = select(x_small, y1, y2); // choose method
|
|
y1 = sign_combine(y1, x0); // get original sign
|
|
|
|
return y1;
|
|
}
|
|
|
|
// instances of atanh_d template
|
|
static inline Vec2d atanh(Vec2d const & x) {
|
|
return atanh_d<Vec2d, Vec2db>(x);
|
|
}
|
|
|
|
#if MAX_VECTOR_SIZE >= 256
|
|
static inline Vec4d atanh(Vec4d const & x) {
|
|
return atanh_d<Vec4d, Vec4db>(x);
|
|
}
|
|
#endif // MAX_VECTOR_SIZE >= 256
|
|
|
|
#if MAX_VECTOR_SIZE >= 512
|
|
static inline Vec8d atanh(Vec8d const & x) {
|
|
return atanh_d<Vec8d, Vec8db>(x);
|
|
}
|
|
#endif // MAX_VECTOR_SIZE >= 512
|
|
|
|
|
|
// Template for atanh function, single precision
|
|
// This function does not produce denormals
|
|
// Template parameters:
|
|
// VTYPE: double vector type
|
|
// BTYPE: boolean vector type
|
|
template<class VTYPE, class BTYPE>
|
|
static inline VTYPE atanh_f(VTYPE const & x0) {
|
|
|
|
// Coefficients
|
|
const float r0 = 3.33337300303E-1f;
|
|
const float r1 = 1.99782164500E-1f;
|
|
const float r2 = 1.46691431730E-1f;
|
|
const float r3 = 8.24370301058E-2f;
|
|
const float r4 = 1.81740078349E-1f;
|
|
|
|
// data vectors
|
|
VTYPE x, x2, y1, y2, y3;
|
|
BTYPE x_small; // boolean vector
|
|
|
|
x = abs(x0);
|
|
x_small = x < 0.5f; // use polynomial approximation if abs(x) < 0.5
|
|
|
|
if (horizontal_or(x_small)) {
|
|
// At least one element needs small method
|
|
x2 = x * x;
|
|
y1 = polynomial_4(x2, r0, r1, r2, r3, r4);
|
|
y1 = mul_add(y1, x2*x, x);
|
|
}
|
|
if (!horizontal_and(x_small)) {
|
|
// At least one element needs big method
|
|
y2 = log((1.0f+x)/(1.0f-x)) * 0.5f;
|
|
// check if out of range
|
|
y3 = select(x == 1.0f, infinite_vec<VTYPE>(), nan_vec<VTYPE>(NAN_HYP));
|
|
y2 = select(x >= 1.0f, y3, y2);
|
|
}
|
|
y1 = select(x_small, y1, y2); // choose method
|
|
y1 = sign_combine(y1, x0); // get original sign
|
|
|
|
return y1;
|
|
}
|
|
|
|
// instances of atanh_f template
|
|
static inline Vec4f atanh(Vec4f const & x) {
|
|
return atanh_f<Vec4f, Vec4fb>(x);
|
|
}
|
|
|
|
#if MAX_VECTOR_SIZE >= 256
|
|
static inline Vec8f atanh(Vec8f const & x) {
|
|
return atanh_f<Vec8f, Vec8fb>(x);
|
|
}
|
|
#endif // MAX_VECTOR_SIZE >= 256
|
|
|
|
#if MAX_VECTOR_SIZE >= 512
|
|
static inline Vec16f atanh(Vec16f const & x) {
|
|
return atanh_f<Vec16f, Vec16fb>(x);
|
|
}
|
|
#endif // MAX_VECTOR_SIZE >= 512
|
|
|
|
#endif
|