| // Copyright 2010 The Go Authors. All rights reserved. | |
| // Use of this source code is governed by a BSD-style | |
| // license that can be found in the LICENSE file. | |
| package cmplx | |
| import "math" | |
| // The original C code, the long comment, and the constants | |
| // below are from http://netlib.sandia.gov/cephes/c9x-complex/clog.c. | |
| // The go code is a simplified version of the original C. | |
| // | |
| // Cephes Math Library Release 2.8: June, 2000 | |
| // Copyright 1984, 1987, 1989, 1992, 2000 by Stephen L. Moshier | |
| // | |
| // The readme file at http://netlib.sandia.gov/cephes/ says: | |
| // Some software in this archive may be from the book _Methods and | |
| // Programs for Mathematical Functions_ (Prentice-Hall or Simon & Schuster | |
| // International, 1989) or from the Cephes Mathematical Library, a | |
| // commercial product. In either event, it is copyrighted by the author. | |
| // What you see here may be used freely but it comes with no support or | |
| // guarantee. | |
| // | |
| // The two known misprints in the book are repaired here in the | |
| // source listings for the gamma function and the incomplete beta | |
| // integral. | |
| // | |
| // Stephen L. Moshier | |
| // moshier@na-net.ornl.gov | |
| // Complex circular sine | |
| // | |
| // DESCRIPTION: | |
| // | |
| // If | |
| // z = x + iy, | |
| // | |
| // then | |
| // | |
| // w = sin x cosh y + i cos x sinh y. | |
| // | |
| // csin(z) = -i csinh(iz). | |
| // | |
| // ACCURACY: | |
| // | |
| // Relative error: | |
| // arithmetic domain # trials peak rms | |
| // DEC -10,+10 8400 5.3e-17 1.3e-17 | |
| // IEEE -10,+10 30000 3.8e-16 1.0e-16 | |
| // Also tested by csin(casin(z)) = z. | |
| // Sin returns the sine of x. | |
| func Sin(x complex128) complex128 { | |
| switch re, im := real(x), imag(x); { | |
| case im == 0 && (math.IsInf(re, 0) || math.IsNaN(re)): | |
| return complex(math.NaN(), im) | |
| case math.IsInf(im, 0): | |
| switch { | |
| case re == 0: | |
| return x | |
| case math.IsInf(re, 0) || math.IsNaN(re): | |
| return complex(math.NaN(), im) | |
| } | |
| case re == 0 && math.IsNaN(im): | |
| return x | |
| } | |
| s, c := math.Sincos(real(x)) | |
| sh, ch := sinhcosh(imag(x)) | |
| return complex(s*ch, c*sh) | |
| } | |
| // Complex hyperbolic sine | |
| // | |
| // DESCRIPTION: | |
| // | |
| // csinh z = (cexp(z) - cexp(-z))/2 | |
| // = sinh x * cos y + i cosh x * sin y . | |
| // | |
| // ACCURACY: | |
| // | |
| // Relative error: | |
| // arithmetic domain # trials peak rms | |
| // IEEE -10,+10 30000 3.1e-16 8.2e-17 | |
| // Sinh returns the hyperbolic sine of x. | |
| func Sinh(x complex128) complex128 { | |
| switch re, im := real(x), imag(x); { | |
| case re == 0 && (math.IsInf(im, 0) || math.IsNaN(im)): | |
| return complex(re, math.NaN()) | |
| case math.IsInf(re, 0): | |
| switch { | |
| case im == 0: | |
| return complex(re, im) | |
| case math.IsInf(im, 0) || math.IsNaN(im): | |
| return complex(re, math.NaN()) | |
| } | |
| case im == 0 && math.IsNaN(re): | |
| return complex(math.NaN(), im) | |
| } | |
| s, c := math.Sincos(imag(x)) | |
| sh, ch := sinhcosh(real(x)) | |
| return complex(c*sh, s*ch) | |
| } | |
| // Complex circular cosine | |
| // | |
| // DESCRIPTION: | |
| // | |
| // If | |
| // z = x + iy, | |
| // | |
| // then | |
| // | |
| // w = cos x cosh y - i sin x sinh y. | |
| // | |
| // ACCURACY: | |
| // | |
| // Relative error: | |
| // arithmetic domain # trials peak rms | |
| // DEC -10,+10 8400 4.5e-17 1.3e-17 | |
| // IEEE -10,+10 30000 3.8e-16 1.0e-16 | |
| // Cos returns the cosine of x. | |
| func Cos(x complex128) complex128 { | |
| switch re, im := real(x), imag(x); { | |
| case im == 0 && (math.IsInf(re, 0) || math.IsNaN(re)): | |
| return complex(math.NaN(), -im*math.Copysign(0, re)) | |
| case math.IsInf(im, 0): | |
| switch { | |
| case re == 0: | |
| return complex(math.Inf(1), -re*math.Copysign(0, im)) | |
| case math.IsInf(re, 0) || math.IsNaN(re): | |
| return complex(math.Inf(1), math.NaN()) | |
| } | |
| case re == 0 && math.IsNaN(im): | |
| return complex(math.NaN(), 0) | |
| } | |
| s, c := math.Sincos(real(x)) | |
| sh, ch := sinhcosh(imag(x)) | |
| return complex(c*ch, -s*sh) | |
| } | |
| // Complex hyperbolic cosine | |
| // | |
| // DESCRIPTION: | |
| // | |
| // ccosh(z) = cosh x cos y + i sinh x sin y . | |
| // | |
| // ACCURACY: | |
| // | |
| // Relative error: | |
| // arithmetic domain # trials peak rms | |
| // IEEE -10,+10 30000 2.9e-16 8.1e-17 | |
| // Cosh returns the hyperbolic cosine of x. | |
| func Cosh(x complex128) complex128 { | |
| switch re, im := real(x), imag(x); { | |
| case re == 0 && (math.IsInf(im, 0) || math.IsNaN(im)): | |
| return complex(math.NaN(), re*math.Copysign(0, im)) | |
| case math.IsInf(re, 0): | |
| switch { | |
| case im == 0: | |
| return complex(math.Inf(1), im*math.Copysign(0, re)) | |
| case math.IsInf(im, 0) || math.IsNaN(im): | |
| return complex(math.Inf(1), math.NaN()) | |
| } | |
| case im == 0 && math.IsNaN(re): | |
| return complex(math.NaN(), im) | |
| } | |
| s, c := math.Sincos(imag(x)) | |
| sh, ch := sinhcosh(real(x)) | |
| return complex(c*ch, s*sh) | |
| } | |
| // calculate sinh and cosh. | |
| func sinhcosh(x float64) (sh, ch float64) { | |
| if math.Abs(x) <= 0.5 { | |
| return math.Sinh(x), math.Cosh(x) | |
| } | |
| e := math.Exp(x) | |
| ei := 0.5 / e | |
| e *= 0.5 | |
| return e - ei, e + ei | |
| } | |