// This file is part of Eigen, a lightweight C++ template library // for linear algebra. // // Copyright (C) 2008-2009 Gael Guennebaud // Copyright (C) 2006-2008 Benoit Jacob // // This Source Code Form is subject to the terms of the Mozilla // Public License v. 2.0. If a copy of the MPL was not distributed // with this file, You can obtain one at http://mozilla.org/MPL/2.0/. // This file is a base class plugin containing common coefficient wise functions. #ifndef EIGEN_PARSED_BY_DOXYGEN /** \internal Represents a scalar multiple of an expression */ typedef CwiseUnaryOp, const Derived> ScalarMultipleReturnType; /** \internal Represents a quotient of an expression by a scalar*/ typedef CwiseUnaryOp, const Derived> ScalarQuotient1ReturnType; /** \internal the return type of conjugate() */ typedef typename internal::conditional::IsComplex, const CwiseUnaryOp, const Derived>, const Derived& >::type ConjugateReturnType; /** \internal the return type of real() const */ typedef typename internal::conditional::IsComplex, const CwiseUnaryOp, const Derived>, const Derived& >::type RealReturnType; /** \internal the return type of real() */ typedef typename internal::conditional::IsComplex, CwiseUnaryView, Derived>, Derived& >::type NonConstRealReturnType; /** \internal the return type of imag() const */ typedef CwiseUnaryOp, const Derived> ImagReturnType; /** \internal the return type of imag() */ typedef CwiseUnaryView, Derived> NonConstImagReturnType; #endif // not EIGEN_PARSED_BY_DOXYGEN /** \returns an expression of the opposite of \c *this */ inline const CwiseUnaryOp::Scalar>, const Derived> operator-() const { return derived(); } /** \returns an expression of \c *this scaled by the scalar factor \a scalar */ inline const ScalarMultipleReturnType operator*(const Scalar& scalar) const { return CwiseUnaryOp, const Derived> (derived(), internal::scalar_multiple_op(scalar)); } #ifdef EIGEN_PARSED_BY_DOXYGEN const ScalarMultipleReturnType operator*(const RealScalar& scalar) const; #endif /** \returns an expression of \c *this divided by the scalar value \a scalar */ inline const CwiseUnaryOp::Scalar>, const Derived> operator/(const Scalar& scalar) const { return CwiseUnaryOp, const Derived> (derived(), internal::scalar_quotient1_op(scalar)); } /** Overloaded for efficient real matrix times complex scalar value */ inline const CwiseUnaryOp >, const Derived> operator*(const std::complex& scalar) const { return CwiseUnaryOp >, const Derived> (*static_cast(this), internal::scalar_multiple2_op >(scalar)); } inline friend const ScalarMultipleReturnType operator*(const Scalar& scalar, const StorageBaseType& matrix) { return matrix*scalar; } inline friend const CwiseUnaryOp >, const Derived> operator*(const std::complex& scalar, const StorageBaseType& matrix) { return matrix*scalar; } /** \returns an expression of *this with the \a Scalar type casted to * \a NewScalar. * * The template parameter \a NewScalar is the type we are casting the scalars to. * * \sa class CwiseUnaryOp */ template typename internal::cast_return_type::Scalar, NewType>, const Derived> >::type cast() const { return derived(); } /** \returns an expression of the complex conjugate of \c *this. * * \sa adjoint() */ inline ConjugateReturnType conjugate() const { return ConjugateReturnType(derived()); } /** \returns a read-only expression of the real part of \c *this. * * \sa imag() */ inline RealReturnType real() const { return derived(); } /** \returns an read-only expression of the imaginary part of \c *this. * * \sa real() */ inline const ImagReturnType imag() const { return derived(); } /** \brief Apply a unary operator coefficient-wise * \param[in] func Functor implementing the unary operator * \tparam CustomUnaryOp Type of \a func * \returns An expression of a custom coefficient-wise unary operator \a func of *this * * The function \c ptr_fun() from the C++ standard library can be used to make functors out of normal functions. * * Example: * \include class_CwiseUnaryOp_ptrfun.cpp * Output: \verbinclude class_CwiseUnaryOp_ptrfun.out * * Genuine functors allow for more possibilities, for instance it may contain a state. * * Example: * \include class_CwiseUnaryOp.cpp * Output: \verbinclude class_CwiseUnaryOp.out * * \sa class CwiseUnaryOp, class CwiseBinaryOp */ template inline const CwiseUnaryOp unaryExpr(const CustomUnaryOp& func = CustomUnaryOp()) const { return CwiseUnaryOp(derived(), func); } /** \returns an expression of a custom coefficient-wise unary operator \a func of *this * * The template parameter \a CustomUnaryOp is the type of the functor * of the custom unary operator. * * Example: * \include class_CwiseUnaryOp.cpp * Output: \verbinclude class_CwiseUnaryOp.out * * \sa class CwiseUnaryOp, class CwiseBinaryOp */ template inline const CwiseUnaryView unaryViewExpr(const CustomViewOp& func = CustomViewOp()) const { return CwiseUnaryView(derived(), func); } /** \returns a non const expression of the real part of \c *this. * * \sa imag() */ inline NonConstRealReturnType real() { return derived(); } /** \returns a non const expression of the imaginary part of \c *this. * * \sa real() */ inline NonConstImagReturnType imag() { return derived(); }