unsupported/Eigen/AlignedVector3 - eigen - Git at Google

 // This file is part of Eigen, a lightweight C++ template library
 // for linear algebra.
 //
 // Copyright (C) 2009 Gael Guennebaud <g.gael@free.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_ALIGNED_VECTOR3_MODULE_H
 #define EIGEN_ALIGNED_VECTOR3_MODULE_H

 #include "../../Eigen/Geometry"

 #include "../../Eigen/src/Core/util/DisableStupidWarnings.h"

 namespace Eigen {

 /**
   * \defgroup AlignedVector3_Module Aligned vector3 module
   *
   * \code
   * #include <unsupported/Eigen/AlignedVector3>
   * \endcode
   */
   //@{


 /** \class AlignedVector3
   *
   * \brief A vectorization friendly 3D vector
   *
   * This class represents a 3D vector internally using a 4D vector
   * such that vectorization can be seamlessly enabled. Of course,
   * the same result can be achieved by directly using a 4D vector.
   * This class makes this process simpler.
   *
   */
 // TODO specialize Cwise
 template<typename Scalar_> class AlignedVector3;

 namespace internal {
 template<typename Scalar_> struct traits<AlignedVector3<Scalar_> >
   : traits<Matrix<Scalar_,3,1,0,4,1> >
 {
 };
 }

 template<typename Scalar_> class AlignedVector3
   : public MatrixBase<AlignedVector3<Scalar_> >
 {
     typedef Matrix<Scalar_,4,1> CoeffType;
     CoeffType m_coeffs;
   public:

     typedef MatrixBase<AlignedVector3<Scalar_> > Base;
     EIGEN_DENSE_PUBLIC_INTERFACE(AlignedVector3)
     using Base::operator*;

     inline Index rows() const { return 3; }
     inline Index cols() const { return 1; }

     Scalar* data() { return m_coeffs.data(); }
     const Scalar* data() const { return m_coeffs.data(); }
     Index innerStride() const { return 1; }
     Index outerStride() const { return 3; }

     inline const Scalar& coeff(Index row, Index col) const
     { return m_coeffs.coeff(row, col); }

     inline Scalar& coeffRef(Index row, Index col)
     { return m_coeffs.coeffRef(row, col); }

     inline const Scalar& coeff(Index index) const
     { return m_coeffs.coeff(index); }

     inline Scalar& coeffRef(Index index)
     { return m_coeffs.coeffRef(index);}


     inline AlignedVector3()
     {}

     inline AlignedVector3(const Scalar& x, const Scalar& y, const Scalar& z)
       : m_coeffs(x, y, z, Scalar(0))
     {}

     inline AlignedVector3(const AlignedVector3& other)
       : Base(), m_coeffs(other.m_coeffs)
     {}

     template<typename XprType, int Size=XprType::SizeAtCompileTime>
     struct generic_assign_selector {};

     template<typename XprType> struct generic_assign_selector<XprType,4>
     {
       inline static void run(AlignedVector3& dest, const XprType& src)
       {
         dest.m_coeffs = src;
       }
     };

     template<typename XprType> struct generic_assign_selector<XprType,3>
     {
       inline static void run(AlignedVector3& dest, const XprType& src)
       {
         dest.m_coeffs.template head<3>() = src;
         dest.m_coeffs.w() = Scalar(0);
       }
     };

     template<typename Derived>
     inline AlignedVector3(const MatrixBase<Derived>& other)
     {
       generic_assign_selector<Derived>::run(*this,other.derived());
     }

     inline AlignedVector3& operator=(const AlignedVector3& other)
     { m_coeffs = other.m_coeffs; return *this; }

     template <typename Derived>
     inline AlignedVector3& operator=(const MatrixBase<Derived>& other)
     {
       generic_assign_selector<Derived>::run(*this,other.derived());
       return *this;
     }

     inline AlignedVector3 operator+(const AlignedVector3& other) const
     { return AlignedVector3(m_coeffs + other.m_coeffs); }

     inline AlignedVector3& operator+=(const AlignedVector3& other)
     { m_coeffs += other.m_coeffs; return *this; }

     inline AlignedVector3 operator-(const AlignedVector3& other) const
     { return AlignedVector3(m_coeffs - other.m_coeffs); }

     inline AlignedVector3 operator-() const
     { return AlignedVector3(-m_coeffs); }

     inline AlignedVector3 operator-=(const AlignedVector3& other)
     { m_coeffs -= other.m_coeffs; return *this; }

     inline AlignedVector3 operator*(const Scalar& s) const
     { return AlignedVector3(m_coeffs * s); }

     inline friend AlignedVector3 operator*(const Scalar& s,const AlignedVector3& vec)
     { return AlignedVector3(s * vec.m_coeffs); }

     inline AlignedVector3& operator*=(const Scalar& s)
     { m_coeffs *= s; return *this; }

     inline AlignedVector3 operator/(const Scalar& s) const
     { return AlignedVector3(m_coeffs / s); }

     inline AlignedVector3& operator/=(const Scalar& s)
     { m_coeffs /= s; return *this; }

     inline Scalar dot(const AlignedVector3& other) const
     {
       eigen_assert(m_coeffs.w()==Scalar(0));
       eigen_assert(other.m_coeffs.w()==Scalar(0));
       return m_coeffs.dot(other.m_coeffs);
     }

     inline void normalize()
     {
       m_coeffs /= norm();
     }

     inline AlignedVector3 normalized() const
     {
       return AlignedVector3(m_coeffs / norm());
     }

     inline Scalar sum() const
     {
       eigen_assert(m_coeffs.w()==Scalar(0));
       return m_coeffs.sum();
     }

     inline Scalar squaredNorm() const
     {
       eigen_assert(m_coeffs.w()==Scalar(0));
       return m_coeffs.squaredNorm();
     }

     inline Scalar norm() const
     {
       using std::sqrt;
       return sqrt(squaredNorm());
     }

     inline AlignedVector3 cross(const AlignedVector3& other) const
     {
       return AlignedVector3(m_coeffs.cross3(other.m_coeffs));
     }

     template<typename Derived>
     inline bool isApprox(const MatrixBase<Derived>& other, const RealScalar& eps=NumTraits<Scalar>::dummy_precision()) const
     {
       return m_coeffs.template head<3>().isApprox(other,eps);
     }

     CoeffType& coeffs() { return m_coeffs; }
     const CoeffType& coeffs() const { return m_coeffs; }
 };

 namespace internal {

 template<typename Scalar_>
 struct eval<AlignedVector3<Scalar_>, Dense>
 {
  typedef const AlignedVector3<Scalar_>& type;
 };

 template<typename Scalar>
 struct evaluator<AlignedVector3<Scalar> >
   : evaluator<Matrix<Scalar,4,1> >
 {
   typedef AlignedVector3<Scalar> XprType;
   typedef evaluator<Matrix<Scalar,4,1> > Base;

   evaluator(const XprType &m) : Base(m.coeffs()) {}
 };

 }

 //@}

 }

 #include "../../Eigen/src/Core/util/ReenableStupidWarnings.h"

 #endif // EIGEN_ALIGNED_VECTOR3_MODULE_H
	// This file is part of Eigen, a lightweight C++ template library
	// for linear algebra.
	//
	// Copyright (C) 2009 Gael Guennebaud <g.gael@free.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_ALIGNED_VECTOR3_MODULE_H
	#define EIGEN_ALIGNED_VECTOR3_MODULE_H

	#include "../../Eigen/Geometry"

	#include "../../Eigen/src/Core/util/DisableStupidWarnings.h"

	namespace Eigen {

	/**
	* \defgroup AlignedVector3_Module Aligned vector3 module
	*
	* \code
	* #include <unsupported/Eigen/AlignedVector3>
	* \endcode
	*/
	//@{


	/** \class AlignedVector3
	*
	* \brief A vectorization friendly 3D vector
	*
	* This class represents a 3D vector internally using a 4D vector
	* such that vectorization can be seamlessly enabled. Of course,
	* the same result can be achieved by directly using a 4D vector.
	* This class makes this process simpler.
	*
	*/
	// TODO specialize Cwise
	template<typename Scalar_> class AlignedVector3;

	namespace internal {
	template<typename Scalar_> struct traits<AlignedVector3<Scalar_> >
	: traits<Matrix<Scalar_,3,1,0,4,1> >
	{
	};
	}

	template<typename Scalar_> class AlignedVector3
	: public MatrixBase<AlignedVector3<Scalar_> >
	{
	typedef Matrix<Scalar_,4,1> CoeffType;
	CoeffType m_coeffs;
	public:

	typedef MatrixBase<AlignedVector3<Scalar_> > Base;
	EIGEN_DENSE_PUBLIC_INTERFACE(AlignedVector3)
	using Base::operator*;

	inline Index rows() const { return 3; }
	inline Index cols() const { return 1; }

	Scalar* data() { return m_coeffs.data(); }
	const Scalar* data() const { return m_coeffs.data(); }
	Index innerStride() const { return 1; }
	Index outerStride() const { return 3; }

	inline const Scalar& coeff(Index row, Index col) const
	{ return m_coeffs.coeff(row, col); }

	inline Scalar& coeffRef(Index row, Index col)
	{ return m_coeffs.coeffRef(row, col); }

	inline const Scalar& coeff(Index index) const
	{ return m_coeffs.coeff(index); }

	inline Scalar& coeffRef(Index index)
	{ return m_coeffs.coeffRef(index);}


	inline AlignedVector3()
	{}

	inline AlignedVector3(const Scalar& x, const Scalar& y, const Scalar& z)
	: m_coeffs(x, y, z, Scalar(0))
	{}

	inline AlignedVector3(const AlignedVector3& other)
	: Base(), m_coeffs(other.m_coeffs)
	{}

	template<typename XprType, int Size=XprType::SizeAtCompileTime>
	struct generic_assign_selector {};

	template<typename XprType> struct generic_assign_selector<XprType,4>
	{
	inline static void run(AlignedVector3& dest, const XprType& src)
	{
	dest.m_coeffs = src;
	}
	};

	template<typename XprType> struct generic_assign_selector<XprType,3>
	{
	inline static void run(AlignedVector3& dest, const XprType& src)
	{
	dest.m_coeffs.template head<3>() = src;
	dest.m_coeffs.w() = Scalar(0);
	}
	};

	template<typename Derived>
	inline AlignedVector3(const MatrixBase<Derived>& other)
	{
	generic_assign_selector<Derived>::run(*this,other.derived());
	}

	inline AlignedVector3& operator=(const AlignedVector3& other)
	{ m_coeffs = other.m_coeffs; return *this; }

	template <typename Derived>
	inline AlignedVector3& operator=(const MatrixBase<Derived>& other)
	{
	generic_assign_selector<Derived>::run(*this,other.derived());
	return *this;
	}

	inline AlignedVector3 operator+(const AlignedVector3& other) const
	{ return AlignedVector3(m_coeffs + other.m_coeffs); }

	inline AlignedVector3& operator+=(const AlignedVector3& other)
	{ m_coeffs += other.m_coeffs; return *this; }

	inline AlignedVector3 operator-(const AlignedVector3& other) const
	{ return AlignedVector3(m_coeffs - other.m_coeffs); }

	inline AlignedVector3 operator-() const
	{ return AlignedVector3(-m_coeffs); }

	inline AlignedVector3 operator-=(const AlignedVector3& other)
	{ m_coeffs -= other.m_coeffs; return *this; }

	inline AlignedVector3 operator*(const Scalar& s) const
	{ return AlignedVector3(m_coeffs * s); }

	inline friend AlignedVector3 operator*(const Scalar& s,const AlignedVector3& vec)
	{ return AlignedVector3(s * vec.m_coeffs); }

	inline AlignedVector3& operator*=(const Scalar& s)
	{ m_coeffs = s; return this; }

	inline AlignedVector3 operator/(const Scalar& s) const
	{ return AlignedVector3(m_coeffs / s); }

	inline AlignedVector3& operator/=(const Scalar& s)
	{ m_coeffs /= s; return *this; }

	inline Scalar dot(const AlignedVector3& other) const
	{
	eigen_assert(m_coeffs.w()==Scalar(0));
	eigen_assert(other.m_coeffs.w()==Scalar(0));
	return m_coeffs.dot(other.m_coeffs);
	}

	inline void normalize()
	{
	m_coeffs /= norm();
	}

	inline AlignedVector3 normalized() const
	{
	return AlignedVector3(m_coeffs / norm());
	}

	inline Scalar sum() const
	{
	eigen_assert(m_coeffs.w()==Scalar(0));
	return m_coeffs.sum();
	}

	inline Scalar squaredNorm() const
	{
	eigen_assert(m_coeffs.w()==Scalar(0));
	return m_coeffs.squaredNorm();
	}

	inline Scalar norm() const
	{
	using std::sqrt;
	return sqrt(squaredNorm());
	}

	inline AlignedVector3 cross(const AlignedVector3& other) const
	{
	return AlignedVector3(m_coeffs.cross3(other.m_coeffs));
	}

	template<typename Derived>
	inline bool isApprox(const MatrixBase<Derived>& other, const RealScalar& eps=NumTraits<Scalar>::dummy_precision()) const
	{
	return m_coeffs.template head<3>().isApprox(other,eps);
	}

	CoeffType& coeffs() { return m_coeffs; }
	const CoeffType& coeffs() const { return m_coeffs; }
	};

	namespace internal {

	template<typename Scalar_>
	struct eval<AlignedVector3<Scalar_>, Dense>
	{
	typedef const AlignedVector3<Scalar_>& type;
	};

	template<typename Scalar>
	struct evaluator<AlignedVector3<Scalar> >
	: evaluator<Matrix<Scalar,4,1> >
	{
	typedef AlignedVector3<Scalar> XprType;
	typedef evaluator<Matrix<Scalar,4,1> > Base;

	evaluator(const XprType &m) : Base(m.coeffs()) {}
	};

	}

	//@}

	}

	#include "../../Eigen/src/Core/util/ReenableStupidWarnings.h"

	#endif // EIGEN_ALIGNED_VECTOR3_MODULE_H