unsupported/test/splines.cpp - platform/external/eigen - Git at Google

 // This file is part of Eigen, a lightweight C++ template library
 // for linear algebra.
 //
 // Copyright (C) 2010-2011 Hauke Heibel <heibel@gmail.com>
 //
 // 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/.

 #include "main.h"

 #include <unsupported/Eigen/Splines>

 // lets do some explicit instantiations and thus
 // force the compilation of all spline functions...
 template class Spline<double, 2, Dynamic>;
 template class Spline<double, 3, Dynamic>;

 template class Spline<double, 2, 2>;
 template class Spline<double, 2, 3>;
 template class Spline<double, 2, 4>;
 template class Spline<double, 2, 5>;

 template class Spline<float, 2, Dynamic>;
 template class Spline<float, 3, Dynamic>;

 template class Spline<float, 3, 2>;
 template class Spline<float, 3, 3>;
 template class Spline<float, 3, 4>;
 template class Spline<float, 3, 5>;

 Spline<double, 2, Dynamic> closed_spline2d()
 {
   RowVectorXd knots(12);
   knots << 0,
     0,
     0,
     0,
     0.867193179093898,
     1.660330955342408,
     2.605084834823134,
     3.484154586374428,
     4.252699478956276,
     4.252699478956276,
     4.252699478956276,
     4.252699478956276;

   MatrixXd ctrls(8,2);
   ctrls << -0.370967741935484,   0.236842105263158,
     -0.231401860693277,   0.442245185027632,
     0.344361228532831,   0.773369994120753,
     0.828990216203802,   0.106550882647595,
     0.407270163678382,  -1.043452922172848,
     -0.488467813584053,  -0.390098582530090,
     -0.494657189446427,   0.054804824897884,
     -0.370967741935484,   0.236842105263158;
   ctrls.transposeInPlace();

   return Spline<double, 2, Dynamic>(knots, ctrls);
 }

 /* create a reference spline */
 Spline<double, 3, Dynamic> spline3d()
 {
   RowVectorXd knots(11);
   knots << 0,
     0,
     0,
     0.118997681558377,
     0.162611735194631,
     0.498364051982143,
     0.655098003973841,
     0.679702676853675,
     1.000000000000000,
     1.000000000000000,
     1.000000000000000;

   MatrixXd ctrls(8,3);
   ctrls <<    0.959743958516081,   0.340385726666133,   0.585267750979777,
     0.223811939491137,   0.751267059305653,   0.255095115459269,
     0.505957051665142,   0.699076722656686,   0.890903252535799,
     0.959291425205444,   0.547215529963803,   0.138624442828679,
     0.149294005559057,   0.257508254123736,   0.840717255983663,
     0.254282178971531,   0.814284826068816,   0.243524968724989,
     0.929263623187228,   0.349983765984809,   0.196595250431208,
     0.251083857976031,   0.616044676146639,   0.473288848902729;
   ctrls.transposeInPlace();

   return Spline<double, 3, Dynamic>(knots, ctrls);
 }

 /* compares evaluations against known results */
 void eval_spline3d()
 {
   Spline3d spline = spline3d();

   RowVectorXd u(10);
   u << 0.351659507062997,
     0.830828627896291,
     0.585264091152724,
     0.549723608291140,
     0.917193663829810,
     0.285839018820374,
     0.757200229110721,
     0.753729094278495,
     0.380445846975357,
     0.567821640725221;

   MatrixXd pts(10,3);
   pts << 0.707620811535916,   0.510258911240815,   0.417485437023409,
     0.603422256426978,   0.529498282727551,   0.270351549348981,
     0.228364197569334,   0.423745615677815,   0.637687289287490,
     0.275556796335168,   0.350856706427970,   0.684295784598905,
     0.514519311047655,   0.525077224890754,   0.351628308305896,
     0.724152914315666,   0.574461155457304,   0.469860285484058,
     0.529365063753288,   0.613328702656816,   0.237837040141739,
     0.522469395136878,   0.619099658652895,   0.237139665242069,
     0.677357023849552,   0.480655768435853,   0.422227610314397,
     0.247046593173758,   0.380604672404750,   0.670065791405019;
   pts.transposeInPlace();

   for (int i=0; i<u.size(); ++i)
   {
     Vector3d pt = spline(u(i));
     VERIFY( (pt - pts.col(i)).norm() < 1e-14 );
   }
 }

 /* compares evaluations on corner cases */
 void eval_spline3d_onbrks()
 {
   Spline3d spline = spline3d();

   RowVectorXd u = spline.knots();

   MatrixXd pts(11,3);
   pts <<    0.959743958516081,   0.340385726666133,   0.585267750979777,
     0.959743958516081,   0.340385726666133,   0.585267750979777,
     0.959743958516081,   0.340385726666133,   0.585267750979777,
     0.430282980289940,   0.713074680056118,   0.720373307943349,
     0.558074875553060,   0.681617921034459,   0.804417124839942,
     0.407076008291750,   0.349707710518163,   0.617275937419545,
     0.240037008286602,   0.738739390398014,   0.324554153129411,
     0.302434111480572,   0.781162443963899,   0.240177089094644,
     0.251083857976031,   0.616044676146639,   0.473288848902729,
     0.251083857976031,   0.616044676146639,   0.473288848902729,
     0.251083857976031,   0.616044676146639,   0.473288848902729;
   pts.transposeInPlace();

   for (int i=0; i<u.size(); ++i)
   {
     Vector3d pt = spline(u(i));
     VERIFY( (pt - pts.col(i)).norm() < 1e-14 );
   }
 }

 void eval_closed_spline2d()
 {
   Spline2d spline = closed_spline2d();

   RowVectorXd u(12);
   u << 0,
     0.332457030395796,
     0.356467130532952,
     0.453562180176215,
     0.648017921874804,
     0.973770235555003,
     1.882577647219307,
     2.289408593930498,
     3.511951429883045,
     3.884149321369450,
     4.236261590369414,
     4.252699478956276;

   MatrixXd pts(12,2);
   pts << -0.370967741935484,   0.236842105263158,
     -0.152576775123250,   0.448975001279334,
     -0.133417538277668,   0.461615613865667,
     -0.053199060826740,   0.507630360006299,
     0.114249591147281,   0.570414135097409,
     0.377810316891987,   0.560497102875315,
     0.665052120135908,  -0.157557441109611,
     0.516006487053228,  -0.559763292174825,
     -0.379486035348887,  -0.331959640488223,
     -0.462034726249078,  -0.039105670080824,
     -0.378730600917982,   0.225127015099919,
     -0.370967741935484,   0.236842105263158;
   pts.transposeInPlace();

   for (int i=0; i<u.size(); ++i)
   {
     Vector2d pt = spline(u(i));
     VERIFY( (pt - pts.col(i)).norm() < 1e-14 );
   }
 }

 void check_global_interpolation2d()
 {
   typedef Spline2d::PointType PointType;
   typedef Spline2d::KnotVectorType KnotVectorType;
   typedef Spline2d::ControlPointVectorType ControlPointVectorType;

   ControlPointVectorType points = ControlPointVectorType::Random(2,100);

   KnotVectorType chord_lengths; // knot parameters
   Eigen::ChordLengths(points, chord_lengths);

   // interpolation without knot parameters
   {
     const Spline2d spline = SplineFitting<Spline2d>::Interpolate(points,3);

     for (Eigen::DenseIndex i=0; i<points.cols(); ++i)
     {
       PointType pt = spline( chord_lengths(i) );
       PointType ref = points.col(i);
       VERIFY( (pt - ref).matrix().norm() < 1e-14 );
     }
   }

   // interpolation with given knot parameters
   {
     const Spline2d spline = SplineFitting<Spline2d>::Interpolate(points,3,chord_lengths);

     for (Eigen::DenseIndex i=0; i<points.cols(); ++i)
     {
       PointType pt = spline( chord_lengths(i) );
       PointType ref = points.col(i);
       VERIFY( (pt - ref).matrix().norm() < 1e-14 );
     }
   }
 }


 void test_splines()
 {
   CALL_SUBTEST( eval_spline3d() );
   CALL_SUBTEST( eval_spline3d_onbrks() );
   CALL_SUBTEST( eval_closed_spline2d() );
   CALL_SUBTEST( check_global_interpolation2d() );
 }
	// This file is part of Eigen, a lightweight C++ template library
	// for linear algebra.
	//
	// Copyright (C) 2010-2011 Hauke Heibel <heibel@gmail.com>
	//
	// 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/.

	#include "main.h"

	#include <unsupported/Eigen/Splines>

	// lets do some explicit instantiations and thus
	// force the compilation of all spline functions...
	template class Spline<double, 2, Dynamic>;
	template class Spline<double, 3, Dynamic>;

	template class Spline<double, 2, 2>;
	template class Spline<double, 2, 3>;
	template class Spline<double, 2, 4>;
	template class Spline<double, 2, 5>;

	template class Spline<float, 2, Dynamic>;
	template class Spline<float, 3, Dynamic>;

	template class Spline<float, 3, 2>;
	template class Spline<float, 3, 3>;
	template class Spline<float, 3, 4>;
	template class Spline<float, 3, 5>;

	Spline<double, 2, Dynamic> closed_spline2d()
	{
	RowVectorXd knots(12);
	knots << 0,
	0,
	0,
	0,
	0.867193179093898,
	1.660330955342408,
	2.605084834823134,
	3.484154586374428,
	4.252699478956276,
	4.252699478956276,
	4.252699478956276,
	4.252699478956276;

	MatrixXd ctrls(8,2);
	ctrls << -0.370967741935484, 0.236842105263158,
	-0.231401860693277, 0.442245185027632,
	0.344361228532831, 0.773369994120753,
	0.828990216203802, 0.106550882647595,
	0.407270163678382, -1.043452922172848,
	-0.488467813584053, -0.390098582530090,
	-0.494657189446427, 0.054804824897884,
	-0.370967741935484, 0.236842105263158;
	ctrls.transposeInPlace();

	return Spline<double, 2, Dynamic>(knots, ctrls);
	}

	/* create a reference spline */
	Spline<double, 3, Dynamic> spline3d()
	{
	RowVectorXd knots(11);
	knots << 0,
	0,
	0,
	0.118997681558377,
	0.162611735194631,
	0.498364051982143,
	0.655098003973841,
	0.679702676853675,
	1.000000000000000,
	1.000000000000000,
	1.000000000000000;

	MatrixXd ctrls(8,3);
	ctrls << 0.959743958516081, 0.340385726666133, 0.585267750979777,
	0.223811939491137, 0.751267059305653, 0.255095115459269,
	0.505957051665142, 0.699076722656686, 0.890903252535799,
	0.959291425205444, 0.547215529963803, 0.138624442828679,
	0.149294005559057, 0.257508254123736, 0.840717255983663,
	0.254282178971531, 0.814284826068816, 0.243524968724989,
	0.929263623187228, 0.349983765984809, 0.196595250431208,
	0.251083857976031, 0.616044676146639, 0.473288848902729;
	ctrls.transposeInPlace();

	return Spline<double, 3, Dynamic>(knots, ctrls);
	}

	/* compares evaluations against known results */
	void eval_spline3d()
	{
	Spline3d spline = spline3d();

	RowVectorXd u(10);
	u << 0.351659507062997,
	0.830828627896291,
	0.585264091152724,
	0.549723608291140,
	0.917193663829810,
	0.285839018820374,
	0.757200229110721,
	0.753729094278495,
	0.380445846975357,
	0.567821640725221;

	MatrixXd pts(10,3);
	pts << 0.707620811535916, 0.510258911240815, 0.417485437023409,
	0.603422256426978, 0.529498282727551, 0.270351549348981,
	0.228364197569334, 0.423745615677815, 0.637687289287490,
	0.275556796335168, 0.350856706427970, 0.684295784598905,
	0.514519311047655, 0.525077224890754, 0.351628308305896,
	0.724152914315666, 0.574461155457304, 0.469860285484058,
	0.529365063753288, 0.613328702656816, 0.237837040141739,
	0.522469395136878, 0.619099658652895, 0.237139665242069,
	0.677357023849552, 0.480655768435853, 0.422227610314397,
	0.247046593173758, 0.380604672404750, 0.670065791405019;
	pts.transposeInPlace();

	for (int i=0; i<u.size(); ++i)
	{
	Vector3d pt = spline(u(i));
	VERIFY( (pt - pts.col(i)).norm() < 1e-14 );
	}
	}

	/* compares evaluations on corner cases */
	void eval_spline3d_onbrks()
	{
	Spline3d spline = spline3d();

	RowVectorXd u = spline.knots();

	MatrixXd pts(11,3);
	pts << 0.959743958516081, 0.340385726666133, 0.585267750979777,
	0.959743958516081, 0.340385726666133, 0.585267750979777,
	0.959743958516081, 0.340385726666133, 0.585267750979777,
	0.430282980289940, 0.713074680056118, 0.720373307943349,
	0.558074875553060, 0.681617921034459, 0.804417124839942,
	0.407076008291750, 0.349707710518163, 0.617275937419545,
	0.240037008286602, 0.738739390398014, 0.324554153129411,
	0.302434111480572, 0.781162443963899, 0.240177089094644,
	0.251083857976031, 0.616044676146639, 0.473288848902729,
	0.251083857976031, 0.616044676146639, 0.473288848902729,
	0.251083857976031, 0.616044676146639, 0.473288848902729;
	pts.transposeInPlace();

	for (int i=0; i<u.size(); ++i)
	{
	Vector3d pt = spline(u(i));
	VERIFY( (pt - pts.col(i)).norm() < 1e-14 );
	}
	}

	void eval_closed_spline2d()
	{
	Spline2d spline = closed_spline2d();

	RowVectorXd u(12);
	u << 0,
	0.332457030395796,
	0.356467130532952,
	0.453562180176215,
	0.648017921874804,
	0.973770235555003,
	1.882577647219307,
	2.289408593930498,
	3.511951429883045,
	3.884149321369450,
	4.236261590369414,
	4.252699478956276;

	MatrixXd pts(12,2);
	pts << -0.370967741935484, 0.236842105263158,
	-0.152576775123250, 0.448975001279334,
	-0.133417538277668, 0.461615613865667,
	-0.053199060826740, 0.507630360006299,
	0.114249591147281, 0.570414135097409,
	0.377810316891987, 0.560497102875315,
	0.665052120135908, -0.157557441109611,
	0.516006487053228, -0.559763292174825,
	-0.379486035348887, -0.331959640488223,
	-0.462034726249078, -0.039105670080824,
	-0.378730600917982, 0.225127015099919,
	-0.370967741935484, 0.236842105263158;
	pts.transposeInPlace();

	for (int i=0; i<u.size(); ++i)
	{
	Vector2d pt = spline(u(i));
	VERIFY( (pt - pts.col(i)).norm() < 1e-14 );
	}
	}

	void check_global_interpolation2d()
	{
	typedef Spline2d::PointType PointType;
	typedef Spline2d::KnotVectorType KnotVectorType;
	typedef Spline2d::ControlPointVectorType ControlPointVectorType;

	ControlPointVectorType points = ControlPointVectorType::Random(2,100);

	KnotVectorType chord_lengths; // knot parameters
	Eigen::ChordLengths(points, chord_lengths);

	// interpolation without knot parameters
	{
	const Spline2d spline = SplineFitting<Spline2d>::Interpolate(points,3);

	for (Eigen::DenseIndex i=0; i<points.cols(); ++i)
	{
	PointType pt = spline( chord_lengths(i) );
	PointType ref = points.col(i);
	VERIFY( (pt - ref).matrix().norm() < 1e-14 );
	}
	}

	// interpolation with given knot parameters
	{
	const Spline2d spline = SplineFitting<Spline2d>::Interpolate(points,3,chord_lengths);

	for (Eigen::DenseIndex i=0; i<points.cols(); ++i)
	{
	PointType pt = spline( chord_lengths(i) );
	PointType ref = points.col(i);
	VERIFY( (pt - ref).matrix().norm() < 1e-14 );
	}
	}
	}


	void test_splines()
	{
	CALL_SUBTEST( eval_spline3d() );
	CALL_SUBTEST( eval_spline3d_onbrks() );
	CALL_SUBTEST( eval_closed_spline2d() );
	CALL_SUBTEST( check_global_interpolation2d() );
	}