// Copyright Christopher Kormanyos 2002 - 2011. // Copyright 2011 John Maddock. Distributed under the Boost // Distributed under the Boost Software License, Version 1.0. // (See accompanying file LICENSE_1_0.txt or copy at // http://www.boost.org/LICENSE_1_0.txt) // This work is based on an earlier work: // "Algorithm 910: A Portable C++ Multiple-Precision System for Special-Function Calculations", // in ACM TOMS, {VOL 37, ISSUE 4, (February 2011)} (C) ACM, 2011. http://doi.acm.org/10.1145/1916461.1916469 // // This file has no include guards or namespaces - it's expanded inline inside default_ops.hpp // template void hyp0F1(T& result, const T& b, const T& x) { typedef typename boost::multiprecision::detail::canonical::type si_type; typedef typename boost::multiprecision::detail::canonical::type ui_type; // Compute the series representation of Hypergeometric0F1 taken from // http://functions.wolfram.com/HypergeometricFunctions/Hypergeometric0F1/06/01/01/ // There are no checks on input range or parameter boundaries. T x_pow_n_div_n_fact(x); T pochham_b (b); T bp (b); eval_divide(result, x_pow_n_div_n_fact, pochham_b); eval_add(result, ui_type(1)); si_type n; T tol; tol = ui_type(1); eval_ldexp(tol, tol, 1 - boost::multiprecision::detail::digits2 >::value); eval_multiply(tol, result); if(eval_get_sign(tol) < 0) tol.negate(); T term; static const int series_limit = boost::multiprecision::detail::digits2 >::value < 100 ? 100 : boost::multiprecision::detail::digits2 >::value; // Series expansion of hyperg_0f1(; b; x). for(n = 2; n < series_limit; ++n) { eval_multiply(x_pow_n_div_n_fact, x); eval_divide(x_pow_n_div_n_fact, n); eval_increment(bp); eval_multiply(pochham_b, bp); eval_divide(term, x_pow_n_div_n_fact, pochham_b); eval_add(result, term); bool neg_term = eval_get_sign(term) < 0; if(neg_term) term.negate(); if(term.compare(tol) <= 0) break; } if(n >= series_limit) BOOST_THROW_EXCEPTION(std::runtime_error("H0F1 Failed to Converge")); } template void eval_sin(T& result, const T& x) { BOOST_STATIC_ASSERT_MSG(number_category::value == number_kind_floating_point, "The sin function is only valid for floating point types."); if(&result == &x) { T temp; eval_sin(temp, x); result = temp; return; } typedef typename boost::multiprecision::detail::canonical::type si_type; typedef typename boost::multiprecision::detail::canonical::type ui_type; typedef typename mpl::front::type fp_type; switch(eval_fpclassify(x)) { case FP_INFINITE: case FP_NAN: if(std::numeric_limits >::has_quiet_NaN) result = std::numeric_limits >::quiet_NaN().backend(); else BOOST_THROW_EXCEPTION(std::domain_error("Result is undefined or complex and there is no NaN for this number type.")); return; case FP_ZERO: result = ui_type(0); return; default: ; } // Local copy of the argument T xx = x; // Analyze and prepare the phase of the argument. // Make a local, positive copy of the argument, xx. // The argument xx will be reduced to 0 <= xx <= pi/2. bool b_negate_sin = false; if(eval_get_sign(x) < 0) { xx.negate(); b_negate_sin = !b_negate_sin; } T n_pi, t; // Remove even multiples of pi. if(xx.compare(get_constant_pi()) > 0) { eval_divide(n_pi, xx, get_constant_pi()); eval_trunc(n_pi, n_pi); t = ui_type(2); eval_fmod(t, n_pi, t); const bool b_n_pi_is_even = eval_get_sign(t) == 0; eval_multiply(n_pi, get_constant_pi()); eval_subtract(xx, n_pi); BOOST_MATH_INSTRUMENT_CODE(xx.str(0, std::ios_base::scientific)); BOOST_MATH_INSTRUMENT_CODE(n_pi.str(0, std::ios_base::scientific)); // Adjust signs if the multiple of pi is not even. if(!b_n_pi_is_even) { b_negate_sin = !b_negate_sin; } } // Reduce the argument to 0 <= xx <= pi/2. eval_ldexp(t, get_constant_pi(), -1); if(xx.compare(t) > 0) { eval_subtract(xx, get_constant_pi(), xx); BOOST_MATH_INSTRUMENT_CODE(xx.str(0, std::ios_base::scientific)); } eval_subtract(t, xx); const bool b_zero = eval_get_sign(xx) == 0; const bool b_pi_half = eval_get_sign(t) == 0; // Check if the reduced argument is very close to 0 or pi/2. const bool b_near_zero = xx.compare(fp_type(1e-1)) < 0; const bool b_near_pi_half = t.compare(fp_type(1e-1)) < 0;; if(b_zero) { result = ui_type(0); } else if(b_pi_half) { result = ui_type(1); } else if(b_near_zero) { eval_multiply(t, xx, xx); eval_divide(t, si_type(-4)); T t2; t2 = fp_type(1.5); hyp0F1(result, t2, t); BOOST_MATH_INSTRUMENT_CODE(result.str(0, std::ios_base::scientific)); eval_multiply(result, xx); } else if(b_near_pi_half) { eval_multiply(t, t); eval_divide(t, si_type(-4)); T t2; t2 = fp_type(0.5); hyp0F1(result, t2, t); BOOST_MATH_INSTRUMENT_CODE(result.str(0, std::ios_base::scientific)); } else { // Scale to a small argument for an efficient Taylor series, // implemented as a hypergeometric function. Use a standard // divide by three identity a certain number of times. // Here we use division by 3^9 --> (19683 = 3^9). static const si_type n_scale = 9; static const si_type n_three_pow_scale = static_cast(19683L); eval_divide(xx, n_three_pow_scale); // Now with small arguments, we are ready for a series expansion. eval_multiply(t, xx, xx); eval_divide(t, si_type(-4)); T t2; t2 = fp_type(1.5); hyp0F1(result, t2, t); BOOST_MATH_INSTRUMENT_CODE(result.str(0, std::ios_base::scientific)); eval_multiply(result, xx); // Convert back using multiple angle identity. for(boost::int32_t k = static_cast(0); k < n_scale; k++) { // Rescale the cosine value using the multiple angle identity. eval_multiply(t2, result, ui_type(3)); eval_multiply(t, result, result); eval_multiply(t, result); eval_multiply(t, ui_type(4)); eval_subtract(result, t2, t); } } if(b_negate_sin) result.negate(); } template void eval_cos(T& result, const T& x) { BOOST_STATIC_ASSERT_MSG(number_category::value == number_kind_floating_point, "The cos function is only valid for floating point types."); if(&result == &x) { T temp; eval_cos(temp, x); result = temp; return; } typedef typename boost::multiprecision::detail::canonical::type si_type; typedef typename boost::multiprecision::detail::canonical::type ui_type; typedef typename mpl::front::type fp_type; switch(eval_fpclassify(x)) { case FP_INFINITE: case FP_NAN: if(std::numeric_limits >::has_quiet_NaN) result = std::numeric_limits >::quiet_NaN().backend(); else BOOST_THROW_EXCEPTION(std::domain_error("Result is undefined or complex and there is no NaN for this number type.")); return; case FP_ZERO: result = ui_type(1); return; default: ; } // Local copy of the argument T xx = x; // Analyze and prepare the phase of the argument. // Make a local, positive copy of the argument, xx. // The argument xx will be reduced to 0 <= xx <= pi/2. bool b_negate_cos = false; if(eval_get_sign(x) < 0) { xx.negate(); } T n_pi, t; // Remove even multiples of pi. if(xx.compare(get_constant_pi()) > 0) { eval_divide(t, xx, get_constant_pi()); eval_trunc(n_pi, t); BOOST_MATH_INSTRUMENT_CODE(n_pi.str(0, std::ios_base::scientific)); eval_multiply(t, n_pi, get_constant_pi()); BOOST_MATH_INSTRUMENT_CODE(t.str(0, std::ios_base::scientific)); eval_subtract(xx, t); BOOST_MATH_INSTRUMENT_CODE(xx.str(0, std::ios_base::scientific)); // Adjust signs if the multiple of pi is not even. t = ui_type(2); eval_fmod(t, n_pi, t); const bool b_n_pi_is_even = eval_get_sign(t) == 0; if(!b_n_pi_is_even) { b_negate_cos = !b_negate_cos; } } // Reduce the argument to 0 <= xx <= pi/2. eval_ldexp(t, get_constant_pi(), -1); int com = xx.compare(t); if(com > 0) { eval_subtract(xx, get_constant_pi(), xx); b_negate_cos = !b_negate_cos; BOOST_MATH_INSTRUMENT_CODE(xx.str(0, std::ios_base::scientific)); } const bool b_zero = eval_get_sign(xx) == 0; const bool b_pi_half = com == 0; // Check if the reduced argument is very close to 0. const bool b_near_zero = xx.compare(fp_type(1e-1)) < 0; if(b_zero) { result = si_type(1); } else if(b_pi_half) { result = si_type(0); } else if(b_near_zero) { eval_multiply(t, xx, xx); eval_divide(t, si_type(-4)); n_pi = fp_type(0.5f); hyp0F1(result, n_pi, t); BOOST_MATH_INSTRUMENT_CODE(result.str(0, std::ios_base::scientific)); } else { eval_subtract(t, xx); eval_sin(result, t); } if(b_negate_cos) result.negate(); } template void eval_tan(T& result, const T& x) { BOOST_STATIC_ASSERT_MSG(number_category::value == number_kind_floating_point, "The tan function is only valid for floating point types."); if(&result == &x) { T temp; eval_tan(temp, x); result = temp; return; } T t; eval_sin(result, x); eval_cos(t, x); eval_divide(result, t); } template void hyp2F1(T& result, const T& a, const T& b, const T& c, const T& x) { // Compute the series representation of hyperg_2f1 taken from // Abramowitz and Stegun 15.1.1. // There are no checks on input range or parameter boundaries. typedef typename boost::multiprecision::detail::canonical::type ui_type; T x_pow_n_div_n_fact(x); T pochham_a (a); T pochham_b (b); T pochham_c (c); T ap (a); T bp (b); T cp (c); eval_multiply(result, pochham_a, pochham_b); eval_divide(result, pochham_c); eval_multiply(result, x_pow_n_div_n_fact); eval_add(result, ui_type(1)); T lim; eval_ldexp(lim, result, 1 - boost::multiprecision::detail::digits2 >::value); if(eval_get_sign(lim) < 0) lim.negate(); ui_type n; T term; static const unsigned series_limit = boost::multiprecision::detail::digits2 >::value < 100 ? 100 : boost::multiprecision::detail::digits2 >::value; // Series expansion of hyperg_2f1(a, b; c; x). for(n = 2; n < series_limit; ++n) { eval_multiply(x_pow_n_div_n_fact, x); eval_divide(x_pow_n_div_n_fact, n); eval_increment(ap); eval_multiply(pochham_a, ap); eval_increment(bp); eval_multiply(pochham_b, bp); eval_increment(cp); eval_multiply(pochham_c, cp); eval_multiply(term, pochham_a, pochham_b); eval_divide(term, pochham_c); eval_multiply(term, x_pow_n_div_n_fact); eval_add(result, term); if(eval_get_sign(term) < 0) term.negate(); if(lim.compare(term) >= 0) break; } if(n > series_limit) BOOST_THROW_EXCEPTION(std::runtime_error("H2F1 failed to converge.")); } template void eval_asin(T& result, const T& x) { BOOST_STATIC_ASSERT_MSG(number_category::value == number_kind_floating_point, "The asin function is only valid for floating point types."); typedef typename boost::multiprecision::detail::canonical::type ui_type; typedef typename mpl::front::type fp_type; if(&result == &x) { T t(x); eval_asin(result, t); return; } switch(eval_fpclassify(x)) { case FP_NAN: case FP_INFINITE: if(std::numeric_limits >::has_quiet_NaN) result = std::numeric_limits >::quiet_NaN().backend(); else BOOST_THROW_EXCEPTION(std::domain_error("Result is undefined or complex and there is no NaN for this number type.")); return; case FP_ZERO: result = ui_type(0); return; default: ; } const bool b_neg = eval_get_sign(x) < 0; T xx(x); if(b_neg) xx.negate(); int c = xx.compare(ui_type(1)); if(c > 0) { if(std::numeric_limits >::has_quiet_NaN) result = std::numeric_limits >::quiet_NaN().backend(); else BOOST_THROW_EXCEPTION(std::domain_error("Result is undefined or complex and there is no NaN for this number type.")); return; } else if(c == 0) { result = get_constant_pi(); eval_ldexp(result, result, -1); if(b_neg) result.negate(); return; } if(xx.compare(fp_type(1e-4)) < 0) { // http://functions.wolfram.com/ElementaryFunctions/ArcSin/26/01/01/ eval_multiply(xx, xx); T t1, t2; t1 = fp_type(0.5f); t2 = fp_type(1.5f); hyp2F1(result, t1, t1, t2, xx); eval_multiply(result, x); return; } else if(xx.compare(fp_type(1 - 1e-4f)) > 0) { T dx1; T t1, t2; eval_subtract(dx1, ui_type(1), xx); t1 = fp_type(0.5f); t2 = fp_type(1.5f); eval_ldexp(dx1, dx1, -1); hyp2F1(result, t1, t1, t2, dx1); eval_ldexp(dx1, dx1, 2); eval_sqrt(t1, dx1); eval_multiply(result, t1); eval_ldexp(t1, get_constant_pi(), -1); result.negate(); eval_add(result, t1); if(b_neg) result.negate(); return; } // Get initial estimate using standard math function asin. double dd; eval_convert_to(&dd, xx); result = fp_type(std::asin(dd)); unsigned current_digits = std::numeric_limits::digits - 5; unsigned target_precision = boost::multiprecision::detail::digits2 >::value; // Newton-Raphson iteration while(current_digits < target_precision) { T s, c; eval_sin(s, result); eval_cos(c, result); eval_subtract(s, xx); eval_divide(s, c); eval_subtract(result, s); current_digits *= 2; /* T lim; eval_ldexp(lim, result, 1 - boost::multiprecision::detail::digits2 >::value); if(eval_get_sign(s) < 0) s.negate(); if(eval_get_sign(lim) < 0) lim.negate(); if(lim.compare(s) >= 0) break; */ } if(b_neg) result.negate(); } template inline void eval_acos(T& result, const T& x) { BOOST_STATIC_ASSERT_MSG(number_category::value == number_kind_floating_point, "The acos function is only valid for floating point types."); typedef typename boost::multiprecision::detail::canonical::type ui_type; switch(eval_fpclassify(x)) { case FP_NAN: case FP_INFINITE: if(std::numeric_limits >::has_quiet_NaN) result = std::numeric_limits >::quiet_NaN().backend(); else BOOST_THROW_EXCEPTION(std::domain_error("Result is undefined or complex and there is no NaN for this number type.")); return; case FP_ZERO: result = get_constant_pi(); eval_ldexp(result, result, -1); // divide by two. return; } eval_abs(result, x); int c = result.compare(ui_type(1)); if(c > 0) { if(std::numeric_limits >::has_quiet_NaN) result = std::numeric_limits >::quiet_NaN().backend(); else BOOST_THROW_EXCEPTION(std::domain_error("Result is undefined or complex and there is no NaN for this number type.")); return; } else if(c == 0) { if(eval_get_sign(x) < 0) result = get_constant_pi(); else result = ui_type(0); return; } eval_asin(result, x); T t; eval_ldexp(t, get_constant_pi(), -1); eval_subtract(result, t); result.negate(); } template void eval_atan(T& result, const T& x) { BOOST_STATIC_ASSERT_MSG(number_category::value == number_kind_floating_point, "The atan function is only valid for floating point types."); typedef typename boost::multiprecision::detail::canonical::type si_type; typedef typename boost::multiprecision::detail::canonical::type ui_type; typedef typename mpl::front::type fp_type; switch(eval_fpclassify(x)) { case FP_NAN: result = x; return; case FP_ZERO: result = ui_type(0); return; case FP_INFINITE: if(eval_get_sign(x) < 0) { eval_ldexp(result, get_constant_pi(), -1); result.negate(); } else eval_ldexp(result, get_constant_pi(), -1); return; default: ; } const bool b_neg = eval_get_sign(x) < 0; T xx(x); if(b_neg) xx.negate(); if(xx.compare(fp_type(0.1)) < 0) { T t1, t2, t3; t1 = ui_type(1); t2 = fp_type(0.5f); t3 = fp_type(1.5f); eval_multiply(xx, xx); xx.negate(); hyp2F1(result, t1, t2, t3, xx); eval_multiply(result, x); return; } if(xx.compare(fp_type(10)) > 0) { T t1, t2, t3; t1 = fp_type(0.5f); t2 = ui_type(1u); t3 = fp_type(1.5f); eval_multiply(xx, xx); eval_divide(xx, si_type(-1), xx); hyp2F1(result, t1, t2, t3, xx); eval_divide(result, x); if(!b_neg) result.negate(); eval_ldexp(t1, get_constant_pi(), -1); eval_add(result, t1); if(b_neg) result.negate(); return; } // Get initial estimate using standard math function atan. fp_type d; eval_convert_to(&d, xx); result = fp_type(std::atan(d)); // Newton-Raphson iteration static const boost::int32_t double_digits10_minus_a_few = std::numeric_limits::digits10 - 3; T s, c, t; for(boost::int32_t digits = double_digits10_minus_a_few; digits <= std::numeric_limits >::digits10; digits *= 2) { eval_sin(s, result); eval_cos(c, result); eval_multiply(t, xx, c); eval_subtract(t, s); eval_multiply(s, t, c); eval_add(result, s); } if(b_neg) result.negate(); } template void eval_atan2(T& result, const T& y, const T& x) { BOOST_STATIC_ASSERT_MSG(number_category::value == number_kind_floating_point, "The atan2 function is only valid for floating point types."); if(&result == &y) { T temp(y); eval_atan2(result, temp, x); return; } else if(&result == &x) { T temp(x); eval_atan2(result, y, temp); return; } typedef typename boost::multiprecision::detail::canonical::type ui_type; switch(eval_fpclassify(y)) { case FP_NAN: result = y; return; case FP_ZERO: { int c = eval_get_sign(x); if(c < 0) result = get_constant_pi(); else if(c >= 0) result = ui_type(0); // Note we allow atan2(0,0) to be zero, even though it's mathematically undefined return; } case FP_INFINITE: { if(eval_fpclassify(x) == FP_INFINITE) { if(std::numeric_limits >::has_quiet_NaN) result = std::numeric_limits >::quiet_NaN().backend(); else BOOST_THROW_EXCEPTION(std::domain_error("Result is undefined or complex and there is no NaN for this number type.")); } else { eval_ldexp(result, get_constant_pi(), -1); if(eval_get_sign(y) < 0) result.negate(); } return; } } switch(eval_fpclassify(x)) { case FP_NAN: result = x; return; case FP_ZERO: { eval_ldexp(result, get_constant_pi(), -1); if(eval_get_sign(y) < 0) result.negate(); return; } case FP_INFINITE: if(eval_get_sign(x) > 0) result = ui_type(0); else result = get_constant_pi(); if(eval_get_sign(y) < 0) result.negate(); return; } T xx; eval_divide(xx, y, x); if(eval_get_sign(xx) < 0) xx.negate(); eval_atan(result, xx); // Determine quadrant (sign) based on signs of x, y const bool y_neg = eval_get_sign(y) < 0; const bool x_neg = eval_get_sign(x) < 0; if(y_neg != x_neg) result.negate(); if(x_neg) { if(y_neg) eval_subtract(result, get_constant_pi()); else eval_add(result, get_constant_pi()); } } template inline typename enable_if, void>::type eval_atan2(T& result, const T& x, const A& a) { typedef typename boost::multiprecision::detail::canonical::type canonical_type; typedef typename mpl::if_, T, canonical_type>::type cast_type; cast_type c; c = a; eval_atan2(result, x, c); } template inline typename enable_if, void>::type eval_atan2(T& result, const A& x, const T& a) { typedef typename boost::multiprecision::detail::canonical::type canonical_type; typedef typename mpl::if_, T, canonical_type>::type cast_type; cast_type c; c = x; eval_atan2(result, c, a); }