// Copyright Matthew Pulver 2018 - 2019. // Distributed under the Boost Software License, Version 1.0. // (See accompanying file LICENSE_1_0.txt or copy at // https://www.boost.org/LICENSE_1_0.txt) // Contributors: // * Kedar R. Bhat - C++11 compatibility. // Notes: // * Any changes to this file should always be downstream from autodiff.cpp. // C++17 is a higher-level language and is easier to maintain. For example, a number of functions which are // lucidly read in autodiff.cpp are forced to be split into multiple structs/functions in this file for // C++11. // * Use of typename RootType and SizeType is a hack to prevent Visual Studio 2015 from compiling functions // that are never called, that would otherwise produce compiler errors. Also forces functions to be inline. #ifndef BOOST_MATH_DIFFERENTIATION_AUTODIFF_HPP #error \ "Do not #include this file directly. This should only be #included by autodiff.hpp for C++11 compatibility." #endif #include namespace boost { namespace math { namespace differentiation { inline namespace autodiff_v1 { namespace detail { template fvar::fvar(root_type const& ca, bool const is_variable) { fvar_cpp11(is_fvar{}, ca, is_variable); } template template void fvar::fvar_cpp11(std::true_type, RootType const& ca, bool const is_variable) { v.front() = RealType(ca, is_variable); if (0 < Order) std::fill(v.begin() + 1, v.end(), static_cast(0)); } template template void fvar::fvar_cpp11(std::false_type, RootType const& ca, bool const is_variable) { v.front() = ca; if (0 < Order) { v[1] = static_cast(static_cast(is_variable)); if (1 < Order) std::fill(v.begin() + 2, v.end(), static_cast(0)); } } template template get_type_at fvar::at_cpp11(std::true_type, size_t order, Orders...) const { return v.at(order); } template template get_type_at fvar::at_cpp11(std::false_type, size_t order, Orders... orders) const { return v.at(order).at(orders...); } // Can throw "std::out_of_range: array::at: __n (which is 7) >= _Nm (which is 7)" template template get_type_at fvar::at(size_t order, Orders... orders) const { return at_cpp11(std::integral_constant{}, order, orders...); } template constexpr T product(Ts...) { return static_cast(1); } template constexpr T product(T factor, Ts... factors) { return factor * product(factors...); } // Can throw "std::out_of_range: array::at: __n (which is 7) >= _Nm (which is 7)" template template get_type_at, sizeof...(Orders)> fvar::derivative( Orders... orders) const { static_assert(sizeof...(Orders) <= depth, "Number of parameters to derivative(...) cannot exceed fvar::depth."); return at(static_cast(orders)...) * product(boost::math::factorial(static_cast(orders))...); } template class Curry { Func const& f_; size_t const i_; public: template // typename SizeType to force inline constructor. Curry(Func const& f, SizeType i) : f_(f), i_(static_cast(i)) {} template RootType operator()(Indices... indices) const { using unsigned_t = typename std::make_unsigned::type...>::type; return f_(i_, static_cast(indices)...); } }; template template promote, Fvar, Fvars...> fvar::apply_coefficients( size_t const order, Func const& f, Fvar const& cr, Fvars&&... fvars) const { fvar const epsilon = fvar(*this).set_root(0); size_t i = order < order_sum ? order : order_sum; using return_type = promote, Fvar, Fvars...>; return_type accumulator = cr.apply_coefficients( order - i, Curry(f, i), std::forward(fvars)...); while (i--) (accumulator *= epsilon) += cr.apply_coefficients( order - i, Curry(f, i), std::forward(fvars)...); return accumulator; } template template promote, Fvar, Fvars...> fvar::apply_coefficients_nonhorner( size_t const order, Func const& f, Fvar const& cr, Fvars&&... fvars) const { fvar const epsilon = fvar(*this).set_root(0); fvar epsilon_i = fvar(1); // epsilon to the power of i using return_type = promote, Fvar, Fvars...>; return_type accumulator = cr.apply_coefficients_nonhorner( order, Curry(f, 0), std::forward(fvars)...); size_t const i_max = order < order_sum ? order : order_sum; for (size_t i = 1; i <= i_max; ++i) { epsilon_i = epsilon_i.epsilon_multiply(i - 1, 0, epsilon, 1, 0); accumulator += epsilon_i.epsilon_multiply( i, 0, cr.apply_coefficients_nonhorner( order - i, Curry(f, i), std::forward(fvars)...), 0, 0); } return accumulator; } template template promote, Fvar, Fvars...> fvar::apply_derivatives( size_t const order, Func const& f, Fvar const& cr, Fvars&&... fvars) const { fvar const epsilon = fvar(*this).set_root(0); size_t i = order < order_sum ? order : order_sum; using return_type = promote, Fvar, Fvars...>; return_type accumulator = cr.apply_derivatives( order - i, Curry(f, i), std::forward(fvars)...) / factorial(static_cast(i)); while (i--) (accumulator *= epsilon) += cr.apply_derivatives( order - i, Curry(f, i), std::forward(fvars)...) / factorial(static_cast(i)); return accumulator; } template template promote, Fvar, Fvars...> fvar::apply_derivatives_nonhorner( size_t const order, Func const& f, Fvar const& cr, Fvars&&... fvars) const { fvar const epsilon = fvar(*this).set_root(0); fvar epsilon_i = fvar(1); // epsilon to the power of i using return_type = promote, Fvar, Fvars...>; return_type accumulator = cr.apply_derivatives_nonhorner( order, Curry(f, 0), std::forward(fvars)...); size_t const i_max = order < order_sum ? order : order_sum; for (size_t i = 1; i <= i_max; ++i) { epsilon_i = epsilon_i.epsilon_multiply(i - 1, 0, epsilon, 1, 0); accumulator += epsilon_i.epsilon_multiply( i, 0, cr.apply_derivatives_nonhorner( order - i, Curry(f, i), std::forward(fvars)...) / factorial(static_cast(i)), 0, 0); } return accumulator; } template template fvar fvar::epsilon_multiply_cpp11(std::true_type, SizeType z0, size_t isum0, fvar const& cr, size_t z1, size_t isum1) const { size_t const m0 = order_sum + isum0 < Order + z0 ? Order + z0 - (order_sum + isum0) : 0; size_t const m1 = order_sum + isum1 < Order + z1 ? Order + z1 - (order_sum + isum1) : 0; size_t const i_max = m0 + m1 < Order ? Order - (m0 + m1) : 0; fvar retval = fvar(); for (size_t i = 0, j = Order; i <= i_max; ++i, --j) retval.v[j] = epsilon_inner_product(z0, isum0, m0, cr, z1, isum1, m1, j); return retval; } template template fvar fvar::epsilon_multiply_cpp11(std::false_type, SizeType z0, size_t isum0, fvar const& cr, size_t z1, size_t isum1) const { using ssize_t = typename std::make_signed::type; RealType const zero(0); size_t const m0 = order_sum + isum0 < Order + z0 ? Order + z0 - (order_sum + isum0) : 0; size_t const m1 = order_sum + isum1 < Order + z1 ? Order + z1 - (order_sum + isum1) : 0; size_t const i_max = m0 + m1 < Order ? Order - (m0 + m1) : 0; fvar retval = fvar(); for (size_t i = 0, j = Order; i <= i_max; ++i, --j) retval.v[j] = std::inner_product( v.cbegin() + ssize_t(m0), v.cend() - ssize_t(i + m1), cr.v.crbegin() + ssize_t(i + m0), zero); return retval; } template fvar fvar::epsilon_multiply(size_t z0, size_t isum0, fvar const& cr, size_t z1, size_t isum1) const { return epsilon_multiply_cpp11(is_fvar{}, z0, isum0, cr, z1, isum1); } template template fvar fvar::epsilon_multiply_cpp11(std::true_type, SizeType z0, size_t isum0, root_type const& ca) const { fvar retval(*this); size_t const m0 = order_sum + isum0 < Order + z0 ? Order + z0 - (order_sum + isum0) : 0; for (size_t i = m0; i <= Order; ++i) retval.v[i] = retval.v[i].epsilon_multiply(z0, isum0 + i, ca); return retval; } template template fvar fvar::epsilon_multiply_cpp11(std::false_type, SizeType z0, size_t isum0, root_type const& ca) const { fvar retval(*this); size_t const m0 = order_sum + isum0 < Order + z0 ? Order + z0 - (order_sum + isum0) : 0; for (size_t i = m0; i <= Order; ++i) if (retval.v[i] != static_cast(0)) retval.v[i] *= ca; return retval; } template fvar fvar::epsilon_multiply(size_t z0, size_t isum0, root_type const& ca) const { return epsilon_multiply_cpp11(is_fvar{}, z0, isum0, ca); } template template fvar& fvar::multiply_assign_by_root_type_cpp11(std::true_type, bool is_root, RootType const& ca) { auto itr = v.begin(); itr->multiply_assign_by_root_type(is_root, ca); for (++itr; itr != v.end(); ++itr) itr->multiply_assign_by_root_type(false, ca); return *this; } template template fvar& fvar::multiply_assign_by_root_type_cpp11(std::false_type, bool is_root, RootType const& ca) { auto itr = v.begin(); if (is_root || *itr != 0) *itr *= ca; // Skip multiplication of 0 by ca=inf to avoid nan, except when is_root. for (++itr; itr != v.end(); ++itr) if (*itr != 0) *itr *= ca; return *this; } template fvar& fvar::multiply_assign_by_root_type(bool is_root, root_type const& ca) { return multiply_assign_by_root_type_cpp11(is_fvar{}, is_root, ca); } template template fvar& fvar::negate_cpp11(std::true_type, RootType const&) { std::for_each(v.begin(), v.end(), [](RealType& r) { r.negate(); }); return *this; } template template fvar& fvar::negate_cpp11(std::false_type, RootType const&) { std::for_each(v.begin(), v.end(), [](RealType& a) { a = -a; }); return *this; } template fvar& fvar::negate() { return negate_cpp11(is_fvar{}, static_cast(*this)); } template template fvar& fvar::set_root_cpp11(std::true_type, RootType const& root) { v.front().set_root(root); return *this; } template template fvar& fvar::set_root_cpp11(std::false_type, RootType const& root) { v.front() = root; return *this; } template fvar& fvar::set_root(root_type const& root) { return set_root_cpp11(is_fvar{}, root); } template auto make_fvar_for_tuple(mp11::index_sequence, RealType const& ca) -> decltype(make_fvar::value..., Order>(ca)) { return make_fvar::value..., Order>(ca); } template auto make_ftuple_impl(mp11::index_sequence, RealTypes const&... ca) -> decltype(std::make_tuple(make_fvar_for_tuple(mp11::make_index_sequence{}, ca)...)) { return std::make_tuple(make_fvar_for_tuple(mp11::make_index_sequence{}, ca)...); } } // namespace detail template auto make_ftuple(RealTypes const&... ca) -> decltype(detail::make_ftuple_impl(mp11::index_sequence_for{}, ca...)) { static_assert(sizeof...(Orders) == sizeof...(RealTypes), "Number of Orders must match number of function parameters."); return detail::make_ftuple_impl(mp11::index_sequence_for{}, ca...); } } // namespace autodiff_v1 } // namespace differentiation } // namespace math } // namespace boost