[wxWidgets.git] / include / wx / matrix.h

/////////////////////////////////////////////////////////////////////////////
// Name:         wx/matrix.h
// Purpose:      wxTransformMatrix class. NOT YET USED
// Author:       Chris Breeze, Julian Smart
// Modified by:  Klaas Holwerda
// Created:      01/02/97
// RCS-ID:       $Id$
// Copyright:    (c) Julian Smart, Chris Breeze
// Licence:      wxWindows licence
/////////////////////////////////////////////////////////////////////////////

#ifndef _WX_MATRIXH__
#define _WX_MATRIXH__

//! headerfiles="matrix.h wx/object.h"
#include "wx/object.h"
#include "wx/math.h"

//! codefiles="matrix.cpp"

// A simple 3x3 matrix. This may be replaced by a more general matrix
// class some day.
//
// Note: this is intended to be used in wxDC at some point to replace
// the current system of scaling/translation. It is not yet used.

//:definition
//  A 3x3 matrix to do 2D transformations.
//  It can be used to map data to window coordinates,
//  and also for manipulating your own data.
//  For example drawing a picture (composed of several primitives)
//  at a certain coordinate and angle within another parent picture.
//  At all times m_isIdentity is set if the matrix itself is an Identity matrix.
//  It is used where possible to optimize calculations.
class WXDLLEXPORT wxTransformMatrix: public wxObject
{
public:
    wxTransformMatrix(void);
    wxTransformMatrix(const wxTransformMatrix& mat);

    //get the value in the matrix at col,row
    //rows are horizontal (second index of m_matrix member)
    //columns are vertical (first index of m_matrix member)
    double GetValue(int col, int row) const;

    //set the value in the matrix at col,row
    //rows are horizontal (second index of m_matrix member)
    //columns are vertical (first index of m_matrix member)
    void SetValue(int col, int row, double value);

    void operator = (const wxTransformMatrix& mat);
    bool operator == (const wxTransformMatrix& mat) const;
    bool operator != (const wxTransformMatrix& mat) const;

    //multiply every element by t
    wxTransformMatrix&          operator*=(const double& t);
    //divide every element by t
    wxTransformMatrix&          operator/=(const double& t);
    //add matrix m to this t
    wxTransformMatrix&          operator+=(const wxTransformMatrix& m);
    //subtract matrix m from this
    wxTransformMatrix&          operator-=(const wxTransformMatrix& m);
    //multiply matrix m with this
    wxTransformMatrix&          operator*=(const wxTransformMatrix& m);

    // constant operators

    //multiply every element by t  and return result
    wxTransformMatrix           operator*(const double& t) const;
    //divide this matrix by t and return result
    wxTransformMatrix           operator/(const double& t) const;
    //add matrix m to this and return result
    wxTransformMatrix           operator+(const wxTransformMatrix& m) const;
    //subtract matrix m from this and return result
    wxTransformMatrix           operator-(const wxTransformMatrix& m) const;
    //multiply this by matrix m and return result
    wxTransformMatrix           operator*(const wxTransformMatrix& m) const;
    wxTransformMatrix           operator-() const;

    //rows are horizontal (second index of m_matrix member)
    //columns are vertical (first index of m_matrix member)
    double& operator()(int col, int row);

    //rows are horizontal (second index of m_matrix member)
    //columns are vertical (first index of m_matrix member)
    double operator()(int col, int row) const;

    // Invert matrix
    bool Invert(void);

    // Make into identity matrix
    bool Identity(void);

    // Is the matrix the identity matrix?
    // Only returns a flag, which is set whenever an operation
    // is done.
    inline bool IsIdentity(void) const { return m_isIdentity; }

    // This does an actual check.
    inline bool IsIdentity1(void) const ;

    //Scale by scale (isotropic scaling i.e. the same in x and y):
    //!ex:
    //!code:           | scale  0      0      |
    //!code: matrix' = |  0     scale  0      | x matrix
    //!code:           |  0     0      scale  |
    bool Scale(double scale);

    //Scale with center point and x/y scale
    //
    //!ex:
    //!code:           |  xs    0      xc(1-xs) |
    //!code: matrix' = |  0    ys      yc(1-ys) | x matrix
    //!code:           |  0     0      1        |
    wxTransformMatrix&  Scale(const double &xs, const double &ys,const double &xc, const double &yc);

    // mirror a matrix in x, y
    //!ex:
    //!code:           | -1     0      0 |
    //!code: matrix' = |  0    -1      0 | x matrix
    //!code:           |  0     0      1 |
    wxTransformMatrix&  Mirror(bool x=true, bool y=false);
    // Translate by dx, dy:
    //!ex:
    //!code:           | 1  0 dx |
    //!code: matrix' = | 0  1 dy | x matrix
    //!code:           | 0  0  1 |
    bool Translate(double x, double y);

    // Rotate clockwise by the given number of degrees:
    //!ex:
    //!code:           |  cos sin 0 |
    //!code: matrix' = | -sin cos 0 | x matrix
    //!code:           |   0   0  1 |
    bool Rotate(double angle);

    //Rotate counter clockwise with point of rotation
    //
    //!ex:
    //!code:           |  cos(r) -sin(r)    x(1-cos(r))+y(sin(r)|
    //!code: matrix' = |  sin(r)  cos(r)    y(1-cos(r))-x(sin(r)| x matrix
    //!code:           |   0          0                       1 |
    wxTransformMatrix&  Rotate(const double &r, const double &x, const double &y);

    // Transform X value from logical to device
    inline double TransformX(double x) const;

    // Transform Y value from logical to device
    inline double TransformY(double y) const;

    // Transform a point from logical to device coordinates
    bool TransformPoint(double x, double y, double& tx, double& ty) const;

    // Transform a point from device to logical coordinates.
    // Example of use:
    //   wxTransformMatrix mat = dc.GetTransformation();
    //   mat.Invert();
    //   mat.InverseTransformPoint(x, y, x1, y1);
    // OR (shorthand:)
    //   dc.LogicalToDevice(x, y, x1, y1);
    // The latter is slightly less efficient if we're doing several
    // conversions, since the matrix is inverted several times.
    // N.B. 'this' matrix is the inverse at this point
    bool InverseTransformPoint(double x, double y, double& tx, double& ty) const;

    double Get_scaleX();
    double Get_scaleY();
    double GetRotation();
    void   SetRotation(double rotation);


public:
    double  m_matrix[3][3];
    bool    m_isIdentity;
};


/*
Chris Breeze reported, that
some functions of wxTransformMatrix cannot work because it is not
known if he matrix has been inverted. Be careful when using it.
*/

// Transform X value from logical to device
// warning: this function can only be used for this purpose
// because no rotation is involved when mapping logical to device coordinates
// mirror and scaling for x and y will be part of the matrix
// if you have a matrix that is rotated, eg a shape containing a matrix to place
// it in the logical coordinate system, use TransformPoint
inline double wxTransformMatrix::TransformX(double x) const
{
    //normally like this, but since no rotation is involved (only mirror and scale)
    //we can do without Y -> m_matrix[1]{0] is -sin(rotation angle) and therefore zero
    //(x * m_matrix[0][0] + y * m_matrix[1][0] + m_matrix[2][0]))
    return (m_isIdentity ? x : (x * m_matrix[0][0] +  m_matrix[2][0]));
}

// Transform Y value from logical to device
// warning: this function can only be used for this purpose
// because no rotation is involved when mapping logical to device coordinates
// mirror and scaling for x and y will be part of the matrix
// if you have a matrix that is rotated, eg a shape containing a matrix to place
// it in the logical coordinate system, use TransformPoint
inline double wxTransformMatrix::TransformY(double y) const
{
    //normally like this, but since no rotation is involved (only mirror and scale)
    //we can do without X -> m_matrix[0]{1] is sin(rotation angle) and therefore zero
    //(x * m_matrix[0][1] + y * m_matrix[1][1] + m_matrix[2][1]))
    return (m_isIdentity ? y : (y * m_matrix[1][1] + m_matrix[2][1]));
}


// Is the matrix the identity matrix?
// Each operation checks whether the result is still the identity matrix and sets a flag.
inline bool wxTransformMatrix::IsIdentity1(void) const
{
    return
    ( wxIsSameDouble(m_matrix[0][0], 1.0) &&
      wxIsSameDouble(m_matrix[1][1], 1.0) &&
      wxIsSameDouble(m_matrix[2][2], 1.0) &&
      wxIsSameDouble(m_matrix[1][0], 0.0) &&
      wxIsSameDouble(m_matrix[2][0], 0.0) &&
      wxIsSameDouble(m_matrix[0][1], 0.0) &&
      wxIsSameDouble(m_matrix[2][1], 0.0) &&
      wxIsSameDouble(m_matrix[0][2], 0.0) &&
      wxIsSameDouble(m_matrix[1][2], 0.0) );
}

// Calculates the determinant of a 2 x 2 matrix
inline double wxCalculateDet(double a11, double a21, double a12, double a22)
{
    return a11 * a22 - a12 * a21;
}

#endif // _WX_MATRIXH__
Commit	Line	Data
c801d85f	1	/////////////////////////////////////////////////////////////////////////////
0433fd85 WS	2	// Name: wx/matrix.h
	3	// Purpose: wxTransformMatrix class. NOT YET USED
	4	// Author: Chris Breeze, Julian Smart
555526fb	5	// Modified by: Klaas Holwerda
0433fd85 WS	6	// Created: 01/02/97
	7	// RCS-ID: $Id$
	8	// Copyright: (c) Julian Smart, Chris Breeze
	9	// Licence: wxWindows licence
c801d85f KB	10	/////////////////////////////////////////////////////////////////////////////
c801d85f KB	11
34138703 JS	12	#ifndef _WX_MATRIXH__
34138703 JS	13	#define _WX_MATRIXH__
c801d85f	14
555526fb	15	//! headerfiles="matrix.h wx/object.h"
c801d85f	16	#include "wx/object.h"
0433fd85	17	#include "wx/math.h"
c801d85f	18
555526fb RR	19	//! codefiles="matrix.cpp"
555526fb RR	20
c801d85f KB	21	// A simple 3x3 matrix. This may be replaced by a more general matrix
	22	// class some day.
	23	//
	24	// Note: this is intended to be used in wxDC at some point to replace
	25	// the current system of scaling/translation. It is not yet used.
	26
65b17727	27	//:definition
555526fb	28	// A 3x3 matrix to do 2D transformations.
65b17727 JS	29	// It can be used to map data to window coordinates,
65b17727 JS	30	// and also for manipulating your own data.
555526fb RR	31	// For example drawing a picture (composed of several primitives)
	32	// at a certain coordinate and angle within another parent picture.
	33	// At all times m_isIdentity is set if the matrix itself is an Identity matrix.
	34	// It is used where possible to optimize calculations.
c801d85f KB	35	class WXDLLEXPORT wxTransformMatrix: public wxObject
	36	{
	37	public:
555526fb RR	38	wxTransformMatrix(void);
	39	wxTransformMatrix(const wxTransformMatrix& mat);
	40
	41	//get the value in the matrix at col,row
	42	//rows are horizontal (second index of m_matrix member)
	43	//columns are vertical (first index of m_matrix member)
	44	double GetValue(int col, int row) const;
	45
	46	//set the value in the matrix at col,row
	47	//rows are horizontal (second index of m_matrix member)
	48	//columns are vertical (first index of m_matrix member)
	49	void SetValue(int col, int row, double value);
	50
	51	void operator = (const wxTransformMatrix& mat);
fbfb8bcc VZ	52	bool operator == (const wxTransformMatrix& mat) const;
fbfb8bcc VZ	53	bool operator != (const wxTransformMatrix& mat) const;
555526fb RR	54
	55	//multiply every element by t
	56	wxTransformMatrix& operator*=(const double& t);
	57	//divide every element by t
	58	wxTransformMatrix& operator/=(const double& t);
	59	//add matrix m to this t
	60	wxTransformMatrix& operator+=(const wxTransformMatrix& m);
	61	//subtract matrix m from this
	62	wxTransformMatrix& operator-=(const wxTransformMatrix& m);
	63	//multiply matrix m with this
	64	wxTransformMatrix& operator*=(const wxTransformMatrix& m);
	65
	66	// constant operators
	67
	68	//multiply every element by t and return result
	69	wxTransformMatrix operator*(const double& t) const;
	70	//divide this matrix by t and return result
	71	wxTransformMatrix operator/(const double& t) const;
	72	//add matrix m to this and return result
	73	wxTransformMatrix operator+(const wxTransformMatrix& m) const;
	74	//subtract matrix m from this and return result
	75	wxTransformMatrix operator-(const wxTransformMatrix& m) const;
	76	//multiply this by matrix m and return result
	77	wxTransformMatrix operator*(const wxTransformMatrix& m) const;
	78	wxTransformMatrix operator-() const;
	79
	80	//rows are horizontal (second index of m_matrix member)
	81	//columns are vertical (first index of m_matrix member)
	82	double& operator()(int col, int row);
	83
	84	//rows are horizontal (second index of m_matrix member)
	85	//columns are vertical (first index of m_matrix member)
	86	double operator()(int col, int row) const;
	87
	88	// Invert matrix
	89	bool Invert(void);
	90
	91	// Make into identity matrix
	92	bool Identity(void);
	93
	94	// Is the matrix the identity matrix?
	95	// Only returns a flag, which is set whenever an operation
	96	// is done.
47b378bd	97	inline bool IsIdentity(void) const { return m_isIdentity; }
555526fb RR	98
	99	// This does an actual check.
	100	inline bool IsIdentity1(void) const ;
	101
	102	//Scale by scale (isotropic scaling i.e. the same in x and y):
	103	//!ex:
	104	//!code: \| scale 0 0 \|
	105	//!code: matrix' = \| 0 scale 0 \| x matrix
	106	//!code: \| 0 0 scale \|
	107	bool Scale(double scale);
	108
	109	//Scale with center point and x/y scale
	110	//
	111	//!ex:
	112	//!code: \| xs 0 xc(1-xs) \|
	113	//!code: matrix' = \| 0 ys yc(1-ys) \| x matrix
	114	//!code: \| 0 0 1 \|
	115	wxTransformMatrix& Scale(const double &xs, const double &ys,const double &xc, const double &yc);
	116
	117	// mirror a matrix in x, y
	118	//!ex:
	119	//!code: \| -1 0 0 \|
	120	//!code: matrix' = \| 0 -1 0 \| x matrix
	121	//!code: \| 0 0 1 \|
4e32eea1	122	wxTransformMatrix& Mirror(bool x=true, bool y=false);
555526fb RR	123	// Translate by dx, dy:
	124	//!ex:
	125	//!code: \| 1 0 dx \|
	126	//!code: matrix' = \| 0 1 dy \| x matrix
	127	//!code: \| 0 0 1 \|
	128	bool Translate(double x, double y);
	129
	130	// Rotate clockwise by the given number of degrees:
	131	//!ex:
	132	//!code: \| cos sin 0 \|
	133	//!code: matrix' = \| -sin cos 0 \| x matrix
	134	//!code: \| 0 0 1 \|
	135	bool Rotate(double angle);
	136
	137	//Rotate counter clockwise with point of rotation
	138	//
	139	//!ex:
	140	//!code: \| cos(r) -sin(r) x(1-cos(r))+y(sin(r)\|
	141	//!code: matrix' = \| sin(r) cos(r) y(1-cos(r))-x(sin(r)\| x matrix
	142	//!code: \| 0 0 1 \|
	143	wxTransformMatrix& Rotate(const double &r, const double &x, const double &y);
	144
	145	// Transform X value from logical to device
	146	inline double TransformX(double x) const;
	147
	148	// Transform Y value from logical to device
	149	inline double TransformY(double y) const;
	150
	151	// Transform a point from logical to device coordinates
	152	bool TransformPoint(double x, double y, double& tx, double& ty) const;
	153
	154	// Transform a point from device to logical coordinates.
	155	// Example of use:
	156	// wxTransformMatrix mat = dc.GetTransformation();
	157	// mat.Invert();
	158	// mat.InverseTransformPoint(x, y, x1, y1);
	159	// OR (shorthand:)
	160	// dc.LogicalToDevice(x, y, x1, y1);
	161	// The latter is slightly less efficient if we're doing several
	162	// conversions, since the matrix is inverted several times.
	163	// N.B. 'this' matrix is the inverse at this point
	164	bool InverseTransformPoint(double x, double y, double& tx, double& ty) const;
	165
	166	double Get_scaleX();
	167	double Get_scaleY();
	168	double GetRotation();
	169	void SetRotation(double rotation);
c801d85f	170
c801d85f KB	171
c801d85f KB	172	public:
555526fb RR	173	double m_matrix[3][3];
555526fb RR	174	bool m_isIdentity;
c801d85f KB	175	};
c801d85f KB	176
46dc76ba RR	177
46dc76ba RR	178	/*
555526fb	179	Chris Breeze reported, that
46dc76ba RR	180	some functions of wxTransformMatrix cannot work because it is not
46dc76ba RR	181	known if he matrix has been inverted. Be careful when using it.
555526fb	182	*/
46dc76ba	183
c801d85f	184	// Transform X value from logical to device
555526fb RR	185	// warning: this function can only be used for this purpose
	186	// because no rotation is involved when mapping logical to device coordinates
	187	// mirror and scaling for x and y will be part of the matrix
	188	// if you have a matrix that is rotated, eg a shape containing a matrix to place
	189	// it in the logical coordinate system, use TransformPoint
c801d85f KB	190	inline double wxTransformMatrix::TransformX(double x) const
c801d85f KB	191	{
555526fb RR	192	//normally like this, but since no rotation is involved (only mirror and scale)
	193	//we can do without Y -> m_matrix[1]{0] is -sin(rotation angle) and therefore zero
	194	//(x * m_matrix[0][0] + y * m_matrix[1][0] + m_matrix[2][0]))
	195	return (m_isIdentity ? x : (x * m_matrix[0][0] + m_matrix[2][0]));
c801d85f KB	196	}
	197
	198	// Transform Y value from logical to device
555526fb RR	199	// warning: this function can only be used for this purpose
	200	// because no rotation is involved when mapping logical to device coordinates
	201	// mirror and scaling for x and y will be part of the matrix
	202	// if you have a matrix that is rotated, eg a shape containing a matrix to place
	203	// it in the logical coordinate system, use TransformPoint
c801d85f KB	204	inline double wxTransformMatrix::TransformY(double y) const
c801d85f KB	205	{
555526fb RR	206	//normally like this, but since no rotation is involved (only mirror and scale)
	207	//we can do without X -> m_matrix[0]{1] is sin(rotation angle) and therefore zero
	208	//(x * m_matrix[0][1] + y * m_matrix[1][1] + m_matrix[2][1]))
	209	return (m_isIdentity ? y : (y * m_matrix[1][1] + m_matrix[2][1]));
c801d85f	210	}
555526fb	211
c801d85f KB	212
c801d85f KB	213	// Is the matrix the identity matrix?
555526fb	214	// Each operation checks whether the result is still the identity matrix and sets a flag.
c801d85f KB	215	inline bool wxTransformMatrix::IsIdentity1(void) const
c801d85f KB	216	{
555526fb	217	return
c77a6796 VZ	218	( wxIsSameDouble(m_matrix[0][0], 1.0) &&
	219	wxIsSameDouble(m_matrix[1][1], 1.0) &&
	220	wxIsSameDouble(m_matrix[2][2], 1.0) &&
	221	wxIsSameDouble(m_matrix[1][0], 0.0) &&
	222	wxIsSameDouble(m_matrix[2][0], 0.0) &&
	223	wxIsSameDouble(m_matrix[0][1], 0.0) &&
	224	wxIsSameDouble(m_matrix[2][1], 0.0) &&
	225	wxIsSameDouble(m_matrix[0][2], 0.0) &&
	226	wxIsSameDouble(m_matrix[1][2], 0.0) );
c801d85f KB	227	}
	228
	229	// Calculates the determinant of a 2 x 2 matrix
	230	inline double wxCalculateDet(double a11, double a21, double a12, double a22)
	231	{
555526fb	232	return a11 * a22 - a12 * a21;
c801d85f KB	233	}
c801d85f KB	234
c77a6796	235	#endif // _WX_MATRIXH__