Eigen/src/Geometry/Scaling.h - platform/external/eigen - Git at Google

 // This file is part of Eigen, a lightweight C++ template library
 // for linear algebra.
 //
 // Copyright (C) 2008 Gael Guennebaud <gael.guennebaud@inria.fr>
 //
 // 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/.

 #ifndef EIGEN_SCALING_H
 #define EIGEN_SCALING_H

 namespace Eigen {

 /** \geometry_module \ingroup Geometry_Module
   *
   * \class Scaling
   *
   * \brief Represents a generic uniform scaling transformation
   *
   * \param _Scalar the scalar type, i.e., the type of the coefficients.
   *
   * This class represent a uniform scaling transformation. It is the return
   * type of Scaling(Scalar), and most of the time this is the only way it
   * is used. In particular, this class is not aimed to be used to store a scaling transformation,
   * but rather to make easier the constructions and updates of Transform objects.
   *
   * To represent an axis aligned scaling, use the DiagonalMatrix class.
   *
   * \sa Scaling(), class DiagonalMatrix, MatrixBase::asDiagonal(), class Translation, class Transform
   */
 template<typename _Scalar>
 class UniformScaling
 {
 public:
   /** the scalar type of the coefficients */
   typedef _Scalar Scalar;

 protected:

   Scalar m_factor;

 public:

   /** Default constructor without initialization. */
   UniformScaling() {}
   /** Constructs and initialize a uniform scaling transformation */
   explicit inline UniformScaling(const Scalar& s) : m_factor(s) {}

   inline const Scalar& factor() const { return m_factor; }
   inline Scalar& factor() { return m_factor; }

   /** Concatenates two uniform scaling */
   inline UniformScaling operator* (const UniformScaling& other) const
   { return UniformScaling(m_factor * other.factor()); }

   /** Concatenates a uniform scaling and a translation */
   template<int Dim>
   inline Transform<Scalar,Dim,Affine> operator* (const Translation<Scalar,Dim>& t) const;

   /** Concatenates a uniform scaling and an affine transformation */
   template<int Dim, int Mode, int Options>
   inline Transform<Scalar,Dim,(int(Mode)==int(Isometry)?Affine:Mode)> operator* (const Transform<Scalar,Dim, Mode, Options>& t) const
   {
    Transform<Scalar,Dim,(int(Mode)==int(Isometry)?Affine:Mode)> res = t;
    res.prescale(factor());
    return res;
 }

   /** Concatenates a uniform scaling and a linear transformation matrix */
   // TODO returns an expression
   template<typename Derived>
   inline typename internal::plain_matrix_type<Derived>::type operator* (const MatrixBase<Derived>& other) const
   { return other * m_factor; }

   template<typename Derived,int Dim>
   inline Matrix<Scalar,Dim,Dim> operator*(const RotationBase<Derived,Dim>& r) const
   { return r.toRotationMatrix() * m_factor; }

   /** \returns the inverse scaling */
   inline UniformScaling inverse() const
   { return UniformScaling(Scalar(1)/m_factor); }

   /** \returns \c *this with scalar type casted to \a NewScalarType
     *
     * Note that if \a NewScalarType is equal to the current scalar type of \c *this
     * then this function smartly returns a const reference to \c *this.
     */
   template<typename NewScalarType>
   inline UniformScaling<NewScalarType> cast() const
   { return UniformScaling<NewScalarType>(NewScalarType(m_factor)); }

   /** Copy constructor with scalar type conversion */
   template<typename OtherScalarType>
   inline explicit UniformScaling(const UniformScaling<OtherScalarType>& other)
   { m_factor = Scalar(other.factor()); }

   /** \returns \c true if \c *this is approximately equal to \a other, within the precision
     * determined by \a prec.
     *
     * \sa MatrixBase::isApprox() */
   bool isApprox(const UniformScaling& other, typename NumTraits<Scalar>::Real prec = NumTraits<Scalar>::dummy_precision()) const
   { return internal::isApprox(m_factor, other.factor(), prec); }

 };

 /** Concatenates a linear transformation matrix and a uniform scaling */
 // NOTE this operator is defiend in MatrixBase and not as a friend function
 // of UniformScaling to fix an internal crash of Intel's ICC
 template<typename Derived> typename MatrixBase<Derived>::ScalarMultipleReturnType
 MatrixBase<Derived>::operator*(const UniformScaling<Scalar>& s) const
 { return derived() * s.factor(); }

 /** Constructs a uniform scaling from scale factor \a s */
 static inline UniformScaling<float> Scaling(float s) { return UniformScaling<float>(s); }
 /** Constructs a uniform scaling from scale factor \a s */
 static inline UniformScaling<double> Scaling(double s) { return UniformScaling<double>(s); }
 /** Constructs a uniform scaling from scale factor \a s */
 template<typename RealScalar>
 static inline UniformScaling<std::complex<RealScalar> > Scaling(const std::complex<RealScalar>& s)
 { return UniformScaling<std::complex<RealScalar> >(s); }

 /** Constructs a 2D axis aligned scaling */
 template<typename Scalar>
 static inline DiagonalMatrix<Scalar,2> Scaling(Scalar sx, Scalar sy)
 { return DiagonalMatrix<Scalar,2>(sx, sy); }
 /** Constructs a 3D axis aligned scaling */
 template<typename Scalar>
 static inline DiagonalMatrix<Scalar,3> Scaling(Scalar sx, Scalar sy, Scalar sz)
 { return DiagonalMatrix<Scalar,3>(sx, sy, sz); }

 /** Constructs an axis aligned scaling expression from vector expression \a coeffs
   * This is an alias for coeffs.asDiagonal()
   */
 template<typename Derived>
 static inline const DiagonalWrapper<const Derived> Scaling(const MatrixBase<Derived>& coeffs)
 { return coeffs.asDiagonal(); }

 /** \addtogroup Geometry_Module */
 //@{
 /** \deprecated */
 typedef DiagonalMatrix<float, 2> AlignedScaling2f;
 /** \deprecated */
 typedef DiagonalMatrix<double,2> AlignedScaling2d;
 /** \deprecated */
 typedef DiagonalMatrix<float, 3> AlignedScaling3f;
 /** \deprecated */
 typedef DiagonalMatrix<double,3> AlignedScaling3d;
 //@}

 template<typename Scalar>
 template<int Dim>
 inline Transform<Scalar,Dim,Affine>
 UniformScaling<Scalar>::operator* (const Translation<Scalar,Dim>& t) const
 {
   Transform<Scalar,Dim,Affine> res;
   res.matrix().setZero();
   res.linear().diagonal().fill(factor());
   res.translation() = factor() * t.vector();
   res(Dim,Dim) = Scalar(1);
   return res;
 }

 } // end namespace Eigen

 #endif // EIGEN_SCALING_H
	// This file is part of Eigen, a lightweight C++ template library
	// for linear algebra.
	//
	// Copyright (C) 2008 Gael Guennebaud <gael.guennebaud@inria.fr>
	//
	// 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/.

	#ifndef EIGEN_SCALING_H
	#define EIGEN_SCALING_H

	namespace Eigen {

	/** \geometry_module \ingroup Geometry_Module
	*
	* \class Scaling
	*
	* \brief Represents a generic uniform scaling transformation
	*
	* \param _Scalar the scalar type, i.e., the type of the coefficients.
	*
	* This class represent a uniform scaling transformation. It is the return
	* type of Scaling(Scalar), and most of the time this is the only way it
	* is used. In particular, this class is not aimed to be used to store a scaling transformation,
	* but rather to make easier the constructions and updates of Transform objects.
	*
	* To represent an axis aligned scaling, use the DiagonalMatrix class.
	*
	* \sa Scaling(), class DiagonalMatrix, MatrixBase::asDiagonal(), class Translation, class Transform
	*/
	template<typename _Scalar>
	class UniformScaling
	{
	public:
	/** the scalar type of the coefficients */
	typedef _Scalar Scalar;

	protected:

	Scalar m_factor;

	public:

	/** Default constructor without initialization. */
	UniformScaling() {}
	/** Constructs and initialize a uniform scaling transformation */
	explicit inline UniformScaling(const Scalar& s) : m_factor(s) {}

	inline const Scalar& factor() const { return m_factor; }
	inline Scalar& factor() { return m_factor; }

	/** Concatenates two uniform scaling */
	inline UniformScaling operator* (const UniformScaling& other) const
	{ return UniformScaling(m_factor * other.factor()); }

	/** Concatenates a uniform scaling and a translation */
	template<int Dim>
	inline Transform<Scalar,Dim,Affine> operator* (const Translation<Scalar,Dim>& t) const;

	/** Concatenates a uniform scaling and an affine transformation */
	template<int Dim, int Mode, int Options>
	inline Transform<Scalar,Dim,(int(Mode)==int(Isometry)?Affine:Mode)> operator* (const Transform<Scalar,Dim, Mode, Options>& t) const
	{
	Transform<Scalar,Dim,(int(Mode)==int(Isometry)?Affine:Mode)> res = t;
	res.prescale(factor());
	return res;
	}

	/** Concatenates a uniform scaling and a linear transformation matrix */
	// TODO returns an expression
	template<typename Derived>
	inline typename internal::plain_matrix_type<Derived>::type operator* (const MatrixBase<Derived>& other) const
	{ return other * m_factor; }

	template<typename Derived,int Dim>
	inline Matrix<Scalar,Dim,Dim> operator*(const RotationBase<Derived,Dim>& r) const
	{ return r.toRotationMatrix() * m_factor; }

	/** \returns the inverse scaling */
	inline UniformScaling inverse() const
	{ return UniformScaling(Scalar(1)/m_factor); }

	/** \returns \c *this with scalar type casted to \a NewScalarType
	*
	* Note that if \a NewScalarType is equal to the current scalar type of \c *this
	* then this function smartly returns a const reference to \c *this.
	*/
	template<typename NewScalarType>
	inline UniformScaling<NewScalarType> cast() const
	{ return UniformScaling<NewScalarType>(NewScalarType(m_factor)); }

	/** Copy constructor with scalar type conversion */
	template<typename OtherScalarType>
	inline explicit UniformScaling(const UniformScaling<OtherScalarType>& other)
	{ m_factor = Scalar(other.factor()); }

	/** \returns \c true if \c *this is approximately equal to \a other, within the precision
	* determined by \a prec.
	*
	* \sa MatrixBase::isApprox() */
	bool isApprox(const UniformScaling& other, typename NumTraits<Scalar>::Real prec = NumTraits<Scalar>::dummy_precision()) const
	{ return internal::isApprox(m_factor, other.factor(), prec); }

	};

	/** Concatenates a linear transformation matrix and a uniform scaling */
	// NOTE this operator is defiend in MatrixBase and not as a friend function
	// of UniformScaling to fix an internal crash of Intel's ICC
	template<typename Derived> typename MatrixBase<Derived>::ScalarMultipleReturnType
	MatrixBase<Derived>::operator*(const UniformScaling<Scalar>& s) const
	{ return derived() * s.factor(); }

	/** Constructs a uniform scaling from scale factor \a s */
	static inline UniformScaling<float> Scaling(float s) { return UniformScaling<float>(s); }
	/** Constructs a uniform scaling from scale factor \a s */
	static inline UniformScaling<double> Scaling(double s) { return UniformScaling<double>(s); }
	/** Constructs a uniform scaling from scale factor \a s */
	template<typename RealScalar>
	static inline UniformScaling<std::complex<RealScalar> > Scaling(const std::complex<RealScalar>& s)
	{ return UniformScaling<std::complex<RealScalar> >(s); }

	/** Constructs a 2D axis aligned scaling */
	template<typename Scalar>
	static inline DiagonalMatrix<Scalar,2> Scaling(Scalar sx, Scalar sy)
	{ return DiagonalMatrix<Scalar,2>(sx, sy); }
	/** Constructs a 3D axis aligned scaling */
	template<typename Scalar>
	static inline DiagonalMatrix<Scalar,3> Scaling(Scalar sx, Scalar sy, Scalar sz)
	{ return DiagonalMatrix<Scalar,3>(sx, sy, sz); }

	/** Constructs an axis aligned scaling expression from vector expression \a coeffs
	* This is an alias for coeffs.asDiagonal()
	*/
	template<typename Derived>
	static inline const DiagonalWrapper<const Derived> Scaling(const MatrixBase<Derived>& coeffs)
	{ return coeffs.asDiagonal(); }

	/** \addtogroup Geometry_Module */
	//@{
	/** \deprecated */
	typedef DiagonalMatrix<float, 2> AlignedScaling2f;
	/** \deprecated */
	typedef DiagonalMatrix<double,2> AlignedScaling2d;
	/** \deprecated */
	typedef DiagonalMatrix<float, 3> AlignedScaling3f;
	/** \deprecated */
	typedef DiagonalMatrix<double,3> AlignedScaling3d;
	//@}

	template<typename Scalar>
	template<int Dim>
	inline Transform<Scalar,Dim,Affine>
	UniformScaling<Scalar>::operator* (const Translation<Scalar,Dim>& t) const
	{
	Transform<Scalar,Dim,Affine> res;
	res.matrix().setZero();
	res.linear().diagonal().fill(factor());
	res.translation() = factor() * t.vector();
	res(Dim,Dim) = Scalar(1);
	return res;
	}

	} // end namespace Eigen

	#endif // EIGEN_SCALING_H