| 1 | /* origin: FreeBSD /usr/src/lib/msun/src/s_ctanh.c */
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| 2 | /*-
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| 3 | * Copyright (c) 2011 David Schultz
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| 4 | * All rights reserved.
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| 5 | *
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| 6 | * Redistribution and use in source and binary forms, with or without
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| 7 | * modification, are permitted provided that the following conditions
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| 8 | * are met:
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| 9 | * 1. Redistributions of source code must retain the above copyright
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| 10 | * notice unmodified, this list of conditions, and the following
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| 11 | * disclaimer.
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| 12 | * 2. Redistributions in binary form must reproduce the above copyright
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| 13 | * notice, this list of conditions and the following disclaimer in the
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| 14 | * documentation and/or other materials provided with the distribution.
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| 15 | *
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| 16 | * THIS SOFTWARE IS PROVIDED BY THE AUTHOR ``AS IS'' AND ANY EXPRESS OR
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| 17 | * IMPLIED WARRANTIES, INCLUDING, BUT NOT LIMITED TO, THE IMPLIED WARRANTIES
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| 18 | * OF MERCHANTABILITY AND FITNESS FOR A PARTICULAR PURPOSE ARE DISCLAIMED.
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| 19 | * IN NO EVENT SHALL THE AUTHOR BE LIABLE FOR ANY DIRECT, INDIRECT,
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| 20 | * INCIDENTAL, SPECIAL, EXEMPLARY, OR CONSEQUENTIAL DAMAGES (INCLUDING, BUT
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| 21 | * NOT LIMITED TO, PROCUREMENT OF SUBSTITUTE GOODS OR SERVICES; LOSS OF USE,
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| 22 | * DATA, OR PROFITS; OR BUSINESS INTERRUPTION) HOWEVER CAUSED AND ON ANY
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| 23 | * THEORY OF LIABILITY, WHETHER IN CONTRACT, STRICT LIABILITY, OR TORT
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| 24 | * (INCLUDING NEGLIGENCE OR OTHERWISE) ARISING IN ANY WAY OUT OF THE USE OF
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| 25 | * THIS SOFTWARE, EVEN IF ADVISED OF THE POSSIBILITY OF SUCH DAMAGE.
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| 26 | */
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| 27 | /*
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| 28 | * Hyperbolic tangent of a complex argument z = x + i y.
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| 29 | *
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| 30 | * The algorithm is from:
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| 31 | *
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| 32 | * W. Kahan. Branch Cuts for Complex Elementary Functions or Much
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| 33 | * Ado About Nothing's Sign Bit. In The State of the Art in
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| 34 | * Numerical Analysis, pp. 165 ff. Iserles and Powell, eds., 1987.
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| 35 | *
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| 36 | * Method:
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| 37 | *
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| 38 | * Let t = tan(x)
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| 39 | * beta = 1/cos^2(y)
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| 40 | * s = sinh(x)
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| 41 | * rho = cosh(x)
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| 42 | *
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| 43 | * We have:
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| 44 | *
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| 45 | * tanh(z) = sinh(z) / cosh(z)
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| 46 | *
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| 47 | * sinh(x) cos(y) + i cosh(x) sin(y)
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| 48 | * = ---------------------------------
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| 49 | * cosh(x) cos(y) + i sinh(x) sin(y)
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| 50 | *
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| 51 | * cosh(x) sinh(x) / cos^2(y) + i tan(y)
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| 52 | * = -------------------------------------
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| 53 | * 1 + sinh^2(x) / cos^2(y)
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| 54 | *
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| 55 | * beta rho s + i t
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| 56 | * = ----------------
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| 57 | * 1 + beta s^2
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| 58 | *
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| 59 | * Modifications:
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| 60 | *
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| 61 | * I omitted the original algorithm's handling of overflow in tan(x) after
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| 62 | * verifying with nearpi.c that this can't happen in IEEE single or double
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| 63 | * precision. I also handle large x differently.
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| 64 | */
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| 65 |
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| 66 | #include "libm.h"
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| 67 |
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| 68 | double complex ctanh(double complex z)
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| 69 | {
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| 70 | double x, y;
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| 71 | double t, beta, s, rho, denom;
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| 72 | uint32_t hx, ix, lx;
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| 73 |
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| 74 | x = creal(z);
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| 75 | y = cimag(z);
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| 76 |
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| 77 | EXTRACT_WORDS(hx, lx, x);
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| 78 | ix = hx & 0x7fffffff;
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| 79 |
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| 80 | /*
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| 81 | * ctanh(NaN + i 0) = NaN + i 0
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| 82 | *
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| 83 | * ctanh(NaN + i y) = NaN + i NaN for y != 0
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| 84 | *
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| 85 | * The imaginary part has the sign of x*sin(2*y), but there's no
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| 86 | * special effort to get this right.
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| 87 | *
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| 88 | * ctanh(+-Inf +- i Inf) = +-1 +- 0
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| 89 | *
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| 90 | * ctanh(+-Inf + i y) = +-1 + 0 sin(2y) for y finite
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| 91 | *
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| 92 | * The imaginary part of the sign is unspecified. This special
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| 93 | * case is only needed to avoid a spurious invalid exception when
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| 94 | * y is infinite.
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| 95 | */
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| 96 | if (ix >= 0x7ff00000) {
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| 97 | if ((ix & 0xfffff) | lx) /* x is NaN */
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| 98 | return CMPLX(x, (y == 0 ? y : x * y));
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| 99 | SET_HIGH_WORD(x, hx - 0x40000000); /* x = copysign(1, x) */
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| 100 | return CMPLX(x, copysign(0, isinf(y) ? y : sin(y) * cos(y)));
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| 101 | }
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| 102 |
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| 103 | /*
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| 104 | * ctanh(+-0 + i NAN) = +-0 + i NaN
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| 105 | * ctanh(+-0 +- i Inf) = +-0 + i NaN
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| 106 | * ctanh(x + i NAN) = NaN + i NaN
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| 107 | * ctanh(x +- i Inf) = NaN + i NaN
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| 108 | */
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| 109 | if (!isfinite(y))
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| 110 | return CMPLX(x ? y - y : x, y - y);
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| 111 |
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| 112 | /*
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| 113 | * ctanh(+-huge + i +-y) ~= +-1 +- i 2sin(2y)/exp(2x), using the
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| 114 | * approximation sinh^2(huge) ~= exp(2*huge) / 4.
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| 115 | * We use a modified formula to avoid spurious overflow.
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| 116 | */
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| 117 | if (ix >= 0x40360000) { /* x >= 22 */
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| 118 | double exp_mx = exp(-fabs(x));
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| 119 | return CMPLX(copysign(1, x), 4 * sin(y) * cos(y) * exp_mx * exp_mx);
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| 120 | }
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| 121 |
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| 122 | /* Kahan's algorithm */
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| 123 | t = tan(y);
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| 124 | beta = 1.0 + t * t; /* = 1 / cos^2(y) */
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| 125 | s = sinh(x);
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| 126 | rho = sqrt(1 + s * s); /* = cosh(x) */
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| 127 | denom = 1 + beta * s * s;
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| 128 | return CMPLX((beta * rho * s) / denom, t / denom);
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| 129 | }
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