unsupported/test/FFTW.cpp - mirror - Git at Google

 // This file is part of Eigen, a lightweight C++ template library
 // for linear algebra.
 //
 // Copyright (C) 2009 Mark Borgerding mark a borgerding net
 //
 // 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/FFT>

 template <typename T>
 std::complex<T> RandomCpx() { return std::complex<T>( (T)(rand()/(T)RAND_MAX - .5), (T)(rand()/(T)RAND_MAX - .5) ); }

 using namespace std;
 using namespace Eigen;


 template < typename T>
 complex<long double>  promote(complex<T> x) { return complex<long double>(x.real(),x.imag()); }

 complex<long double>  promote(float x) { return complex<long double>( x); }
 complex<long double>  promote(double x) { return complex<long double>( x); }
 complex<long double>  promote(long double x) { return complex<long double>( x); }


     template <typename VT1,typename VT2>
     long double fft_rmse( const VT1 & fftbuf,const VT2 & timebuf)
     {
         long double totalpower=0;
         long double difpower=0;
         long double pi = acos((long double)-1 );
         for (size_t k0=0;k0<(size_t)fftbuf.size();++k0) {
             complex<long double> acc = 0;
             long double phinc = -2.*k0* pi / timebuf.size();
             for (size_t k1=0;k1<(size_t)timebuf.size();++k1) {
                 acc +=  promote( timebuf[k1] ) * exp( complex<long double>(0,k1*phinc) );
             }
             totalpower += numext::abs2(acc);
             complex<long double> x = promote(fftbuf[k0]);
             complex<long double> dif = acc - x;
             difpower += numext::abs2(dif);
             //cerr << k0 << "\t" << acc << "\t" <<  x << "\t" << sqrt(numext::abs2(dif)) << endl;
         }
         cerr << "rmse:" << sqrt(difpower/totalpower) << endl;
         return sqrt(difpower/totalpower);
     }

     template <typename VT1,typename VT2>
     long double dif_rmse( const VT1 buf1,const VT2 buf2)
     {
         long double totalpower=0;
         long double difpower=0;
         size_t n = (min)( buf1.size(),buf2.size() );
         for (size_t k=0;k<n;++k) {
             totalpower += (numext::abs2( buf1[k] ) + numext::abs2(buf2[k]) )/2.;
             difpower += numext::abs2(buf1[k] - buf2[k]);
         }
         return sqrt(difpower/totalpower);
     }

 enum { StdVectorContainer, EigenVectorContainer };

 template<int Container, typename Scalar> struct VectorType;

 template<typename Scalar> struct VectorType<StdVectorContainer,Scalar>
 {
   typedef vector<Scalar> type;
 };

 template<typename Scalar> struct VectorType<EigenVectorContainer,Scalar>
 {
   typedef Matrix<Scalar,Dynamic,1> type;
 };

 template <int Container, typename T>
 void test_scalar_generic(int nfft)
 {
     typedef typename FFT<T>::Complex Complex;
     typedef typename FFT<T>::Scalar Scalar;
     typedef typename VectorType<Container,Scalar>::type ScalarVector;
     typedef typename VectorType<Container,Complex>::type ComplexVector;

     FFT<T> fft;
     ScalarVector tbuf(nfft);
     ComplexVector freqBuf;
     for (int k=0;k<nfft;++k)
         tbuf[k]= (T)( rand()/(double)RAND_MAX - .5);

     // make sure it DOESN'T give the right full spectrum answer
     // if we've asked for half-spectrum
     fft.SetFlag(fft.HalfSpectrum );
     fft.fwd( freqBuf,tbuf);
     VERIFY((size_t)freqBuf.size() == (size_t)( (nfft>>1)+1) );
     VERIFY( fft_rmse(freqBuf,tbuf) < test_precision<T>()  );// gross check

     fft.ClearFlag(fft.HalfSpectrum );
     fft.fwd( freqBuf,tbuf);
     VERIFY( (size_t)freqBuf.size() == (size_t)nfft);
     VERIFY( fft_rmse(freqBuf,tbuf) < test_precision<T>()  );// gross check

     if (nfft&1)
         return; // odd FFTs get the wrong size inverse FFT

     ScalarVector tbuf2;
     fft.inv( tbuf2 , freqBuf);
     VERIFY( dif_rmse(tbuf,tbuf2) < test_precision<T>()  );// gross check


     // verify that the Unscaled flag takes effect
     ScalarVector tbuf3;
     fft.SetFlag(fft.Unscaled);

     fft.inv( tbuf3 , freqBuf);

     for (int k=0;k<nfft;++k)
         tbuf3[k] *= T(1./nfft);


     //for (size_t i=0;i<(size_t) tbuf.size();++i)
     //    cout << "freqBuf=" << freqBuf[i] << " in2=" << tbuf3[i] << " -  in=" << tbuf[i] << " => " << (tbuf3[i] - tbuf[i] ) <<  endl;

     VERIFY( dif_rmse(tbuf,tbuf3) < test_precision<T>()  );// gross check

     // verify that ClearFlag works
     fft.ClearFlag(fft.Unscaled);
     fft.inv( tbuf2 , freqBuf);
     VERIFY( dif_rmse(tbuf,tbuf2) < test_precision<T>()  );// gross check
 }

 template <typename T>
 void test_scalar(int nfft)
 {
   test_scalar_generic<StdVectorContainer,T>(nfft);
   //test_scalar_generic<EigenVectorContainer,T>(nfft);
 }


 template <int Container, typename T>
 void test_complex_generic(int nfft)
 {
     typedef typename FFT<T>::Complex Complex;
     typedef typename VectorType<Container,Complex>::type ComplexVector;

     FFT<T> fft;

     ComplexVector inbuf(nfft);
     ComplexVector outbuf;
     ComplexVector buf3;
     for (int k=0;k<nfft;++k)
         inbuf[k]= Complex( (T)(rand()/(double)RAND_MAX - .5), (T)(rand()/(double)RAND_MAX - .5) );
     fft.fwd( outbuf , inbuf);

     VERIFY( fft_rmse(outbuf,inbuf) < test_precision<T>()  );// gross check
     fft.inv( buf3 , outbuf);

     VERIFY( dif_rmse(inbuf,buf3) < test_precision<T>()  );// gross check

     // verify that the Unscaled flag takes effect
     ComplexVector buf4;
     fft.SetFlag(fft.Unscaled);
     fft.inv( buf4 , outbuf);
     for (int k=0;k<nfft;++k)
         buf4[k] *= T(1./nfft);
     VERIFY( dif_rmse(inbuf,buf4) < test_precision<T>()  );// gross check

     // verify that ClearFlag works
     fft.ClearFlag(fft.Unscaled);
     fft.inv( buf3 , outbuf);
     VERIFY( dif_rmse(inbuf,buf3) < test_precision<T>()  );// gross check
 }

 template <typename T>
 void test_complex(int nfft)
 {
   test_complex_generic<StdVectorContainer,T>(nfft);
   test_complex_generic<EigenVectorContainer,T>(nfft);
 }
 /*
 template <typename T,int nrows,int ncols>
 void test_complex2d()
 {
     typedef typename Eigen::FFT<T>::Complex Complex;
     FFT<T> fft;
     Eigen::Matrix<Complex,nrows,ncols> src,src2,dst,dst2;

     src = Eigen::Matrix<Complex,nrows,ncols>::Random();
     //src =  Eigen::Matrix<Complex,nrows,ncols>::Identity();

     for (int k=0;k<ncols;k++) {
         Eigen::Matrix<Complex,nrows,1> tmpOut;
         fft.fwd( tmpOut,src.col(k) );
         dst2.col(k) = tmpOut;
     }

     for (int k=0;k<nrows;k++) {
         Eigen::Matrix<Complex,1,ncols> tmpOut;
         fft.fwd( tmpOut,  dst2.row(k) );
         dst2.row(k) = tmpOut;
     }

     fft.fwd2(dst.data(),src.data(),ncols,nrows);
     fft.inv2(src2.data(),dst.data(),ncols,nrows);
     VERIFY( (src-src2).norm() < test_precision<T>() );
     VERIFY( (dst-dst2).norm() < test_precision<T>() );
 }
 */


 void test_return_by_value(int len)
 {
     VectorXf in;
     VectorXf in1;
     in.setRandom( len );
     VectorXcf out1,out2;
     FFT<float> fft;

     fft.SetFlag(fft.HalfSpectrum );

     fft.fwd(out1,in);
     out2 = fft.fwd(in);
     VERIFY( (out1-out2).norm() < test_precision<float>() );
     in1 = fft.inv(out1);
     VERIFY( (in1-in).norm() < test_precision<float>() );
 }

 void test_FFTW()
 {
   CALL_SUBTEST( test_return_by_value(32) );
   //CALL_SUBTEST( ( test_complex2d<float,4,8> () ) ); CALL_SUBTEST( ( test_complex2d<double,4,8> () ) );
   //CALL_SUBTEST( ( test_complex2d<long double,4,8> () ) );
   CALL_SUBTEST( test_complex<float>(32) ); CALL_SUBTEST( test_complex<double>(32) );
   CALL_SUBTEST( test_complex<float>(256) ); CALL_SUBTEST( test_complex<double>(256) );
   CALL_SUBTEST( test_complex<float>(3*8) ); CALL_SUBTEST( test_complex<double>(3*8) );
   CALL_SUBTEST( test_complex<float>(5*32) ); CALL_SUBTEST( test_complex<double>(5*32) );
   CALL_SUBTEST( test_complex<float>(2*3*4) ); CALL_SUBTEST( test_complex<double>(2*3*4) );
   CALL_SUBTEST( test_complex<float>(2*3*4*5) ); CALL_SUBTEST( test_complex<double>(2*3*4*5) );
   CALL_SUBTEST( test_complex<float>(2*3*4*5*7) ); CALL_SUBTEST( test_complex<double>(2*3*4*5*7) );

   CALL_SUBTEST( test_scalar<float>(32) ); CALL_SUBTEST( test_scalar<double>(32) );
   CALL_SUBTEST( test_scalar<float>(45) ); CALL_SUBTEST( test_scalar<double>(45) );
   CALL_SUBTEST( test_scalar<float>(50) ); CALL_SUBTEST( test_scalar<double>(50) );
   CALL_SUBTEST( test_scalar<float>(256) ); CALL_SUBTEST( test_scalar<double>(256) );
   CALL_SUBTEST( test_scalar<float>(2*3*4*5*7) ); CALL_SUBTEST( test_scalar<double>(2*3*4*5*7) );

   #ifdef EIGEN_HAS_FFTWL
   CALL_SUBTEST( test_complex<long double>(32) );
   CALL_SUBTEST( test_complex<long double>(256) );
   CALL_SUBTEST( test_complex<long double>(3*8) );
   CALL_SUBTEST( test_complex<long double>(5*32) );
   CALL_SUBTEST( test_complex<long double>(2*3*4) );
   CALL_SUBTEST( test_complex<long double>(2*3*4*5) );
   CALL_SUBTEST( test_complex<long double>(2*3*4*5*7) );

   CALL_SUBTEST( test_scalar<long double>(32) );
   CALL_SUBTEST( test_scalar<long double>(45) );
   CALL_SUBTEST( test_scalar<long double>(50) );
   CALL_SUBTEST( test_scalar<long double>(256) );
   CALL_SUBTEST( test_scalar<long double>(2*3*4*5*7) );
   #endif
 }
	// This file is part of Eigen, a lightweight C++ template library
	// for linear algebra.
	//
	// Copyright (C) 2009 Mark Borgerding mark a borgerding net
	//
	// 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/FFT>

	template <typename T>
	std::complex<T> RandomCpx() { return std::complex<T>( (T)(rand()/(T)RAND_MAX - .5), (T)(rand()/(T)RAND_MAX - .5) ); }

	using namespace std;
	using namespace Eigen;


	template < typename T>
	complex<long double> promote(complex<T> x) { return complex<long double>(x.real(),x.imag()); }

	complex<long double> promote(float x) { return complex<long double>( x); }
	complex<long double> promote(double x) { return complex<long double>( x); }
	complex<long double> promote(long double x) { return complex<long double>( x); }


	template <typename VT1,typename VT2>
	long double fft_rmse( const VT1 & fftbuf,const VT2 & timebuf)
	{
	long double totalpower=0;
	long double difpower=0;
	long double pi = acos((long double)-1 );
	for (size_t k0=0;k0<(size_t)fftbuf.size();++k0) {
	complex<long double> acc = 0;
	long double phinc = -2.k0 pi / timebuf.size();
	for (size_t k1=0;k1<(size_t)timebuf.size();++k1) {
	acc += promote( timebuf[k1] ) * exp( complex<long double>(0,k1*phinc) );
	}
	totalpower += numext::abs2(acc);
	complex<long double> x = promote(fftbuf[k0]);
	complex<long double> dif = acc - x;
	difpower += numext::abs2(dif);
	//cerr << k0 << "\t" << acc << "\t" << x << "\t" << sqrt(numext::abs2(dif)) << endl;
	}
	cerr << "rmse:" << sqrt(difpower/totalpower) << endl;
	return sqrt(difpower/totalpower);
	}

	template <typename VT1,typename VT2>
	long double dif_rmse( const VT1 buf1,const VT2 buf2)
	{
	long double totalpower=0;
	long double difpower=0;
	size_t n = (min)( buf1.size(),buf2.size() );
	for (size_t k=0;k<n;++k) {
	totalpower += (numext::abs2( buf1[k] ) + numext::abs2(buf2[k]) )/2.;
	difpower += numext::abs2(buf1[k] - buf2[k]);
	}
	return sqrt(difpower/totalpower);
	}

	enum { StdVectorContainer, EigenVectorContainer };

	template<int Container, typename Scalar> struct VectorType;

	template<typename Scalar> struct VectorType<StdVectorContainer,Scalar>
	{
	typedef vector<Scalar> type;
	};

	template<typename Scalar> struct VectorType<EigenVectorContainer,Scalar>
	{
	typedef Matrix<Scalar,Dynamic,1> type;
	};

	template <int Container, typename T>
	void test_scalar_generic(int nfft)
	{
	typedef typename FFT<T>::Complex Complex;
	typedef typename FFT<T>::Scalar Scalar;
	typedef typename VectorType<Container,Scalar>::type ScalarVector;
	typedef typename VectorType<Container,Complex>::type ComplexVector;

	FFT<T> fft;
	ScalarVector tbuf(nfft);
	ComplexVector freqBuf;
	for (int k=0;k<nfft;++k)
	tbuf[k]= (T)( rand()/(double)RAND_MAX - .5);

	// make sure it DOESN'T give the right full spectrum answer
	// if we've asked for half-spectrum
	fft.SetFlag(fft.HalfSpectrum );
	fft.fwd( freqBuf,tbuf);
	VERIFY((size_t)freqBuf.size() == (size_t)( (nfft>>1)+1) );
	VERIFY( fft_rmse(freqBuf,tbuf) < test_precision<T>() );// gross check

	fft.ClearFlag(fft.HalfSpectrum );
	fft.fwd( freqBuf,tbuf);
	VERIFY( (size_t)freqBuf.size() == (size_t)nfft);
	VERIFY( fft_rmse(freqBuf,tbuf) < test_precision<T>() );// gross check

	if (nfft&1)
	return; // odd FFTs get the wrong size inverse FFT

	ScalarVector tbuf2;
	fft.inv( tbuf2 , freqBuf);
	VERIFY( dif_rmse(tbuf,tbuf2) < test_precision<T>() );// gross check


	// verify that the Unscaled flag takes effect
	ScalarVector tbuf3;
	fft.SetFlag(fft.Unscaled);

	fft.inv( tbuf3 , freqBuf);

	for (int k=0;k<nfft;++k)
	tbuf3[k] *= T(1./nfft);


	//for (size_t i=0;i<(size_t) tbuf.size();++i)
	// cout << "freqBuf=" << freqBuf[i] << " in2=" << tbuf3[i] << " - in=" << tbuf[i] << " => " << (tbuf3[i] - tbuf[i] ) << endl;

	VERIFY( dif_rmse(tbuf,tbuf3) < test_precision<T>() );// gross check

	// verify that ClearFlag works
	fft.ClearFlag(fft.Unscaled);
	fft.inv( tbuf2 , freqBuf);
	VERIFY( dif_rmse(tbuf,tbuf2) < test_precision<T>() );// gross check
	}

	template <typename T>
	void test_scalar(int nfft)
	{
	test_scalar_generic<StdVectorContainer,T>(nfft);
	//test_scalar_generic<EigenVectorContainer,T>(nfft);
	}


	template <int Container, typename T>
	void test_complex_generic(int nfft)
	{
	typedef typename FFT<T>::Complex Complex;
	typedef typename VectorType<Container,Complex>::type ComplexVector;

	FFT<T> fft;

	ComplexVector inbuf(nfft);
	ComplexVector outbuf;
	ComplexVector buf3;
	for (int k=0;k<nfft;++k)
	inbuf[k]= Complex( (T)(rand()/(double)RAND_MAX - .5), (T)(rand()/(double)RAND_MAX - .5) );
	fft.fwd( outbuf , inbuf);

	VERIFY( fft_rmse(outbuf,inbuf) < test_precision<T>() );// gross check
	fft.inv( buf3 , outbuf);

	VERIFY( dif_rmse(inbuf,buf3) < test_precision<T>() );// gross check

	// verify that the Unscaled flag takes effect
	ComplexVector buf4;
	fft.SetFlag(fft.Unscaled);
	fft.inv( buf4 , outbuf);
	for (int k=0;k<nfft;++k)
	buf4[k] *= T(1./nfft);
	VERIFY( dif_rmse(inbuf,buf4) < test_precision<T>() );// gross check

	// verify that ClearFlag works
	fft.ClearFlag(fft.Unscaled);
	fft.inv( buf3 , outbuf);
	VERIFY( dif_rmse(inbuf,buf3) < test_precision<T>() );// gross check
	}

	template <typename T>
	void test_complex(int nfft)
	{
	test_complex_generic<StdVectorContainer,T>(nfft);
	test_complex_generic<EigenVectorContainer,T>(nfft);
	}
	/*
	template <typename T,int nrows,int ncols>
	void test_complex2d()
	{
	typedef typename Eigen::FFT<T>::Complex Complex;
	FFT<T> fft;
	Eigen::Matrix<Complex,nrows,ncols> src,src2,dst,dst2;

	src = Eigen::Matrix<Complex,nrows,ncols>::Random();
	//src = Eigen::Matrix<Complex,nrows,ncols>::Identity();

	for (int k=0;k<ncols;k++) {
	Eigen::Matrix<Complex,nrows,1> tmpOut;
	fft.fwd( tmpOut,src.col(k) );
	dst2.col(k) = tmpOut;
	}

	for (int k=0;k<nrows;k++) {
	Eigen::Matrix<Complex,1,ncols> tmpOut;
	fft.fwd( tmpOut, dst2.row(k) );
	dst2.row(k) = tmpOut;
	}

	fft.fwd2(dst.data(),src.data(),ncols,nrows);
	fft.inv2(src2.data(),dst.data(),ncols,nrows);
	VERIFY( (src-src2).norm() < test_precision<T>() );
	VERIFY( (dst-dst2).norm() < test_precision<T>() );
	}
	*/


	void test_return_by_value(int len)
	{
	VectorXf in;
	VectorXf in1;
	in.setRandom( len );
	VectorXcf out1,out2;
	FFT<float> fft;

	fft.SetFlag(fft.HalfSpectrum );

	fft.fwd(out1,in);
	out2 = fft.fwd(in);
	VERIFY( (out1-out2).norm() < test_precision<float>() );
	in1 = fft.inv(out1);
	VERIFY( (in1-in).norm() < test_precision<float>() );
	}

	void test_FFTW()
	{
	CALL_SUBTEST( test_return_by_value(32) );
	//CALL_SUBTEST( ( test_complex2d<float,4,8> () ) ); CALL_SUBTEST( ( test_complex2d<double,4,8> () ) );
	//CALL_SUBTEST( ( test_complex2d<long double,4,8> () ) );
	CALL_SUBTEST( test_complex<float>(32) ); CALL_SUBTEST( test_complex<double>(32) );
	CALL_SUBTEST( test_complex<float>(256) ); CALL_SUBTEST( test_complex<double>(256) );
	CALL_SUBTEST( test_complex<float>(38) ); CALL_SUBTEST( test_complex<double>(38) );
	CALL_SUBTEST( test_complex<float>(532) ); CALL_SUBTEST( test_complex<double>(532) );
	CALL_SUBTEST( test_complex<float>(234) ); CALL_SUBTEST( test_complex<double>(234) );
	CALL_SUBTEST( test_complex<float>(2345) ); CALL_SUBTEST( test_complex<double>(2345) );
	CALL_SUBTEST( test_complex<float>(23457) ); CALL_SUBTEST( test_complex<double>(23457) );

	CALL_SUBTEST( test_scalar<float>(32) ); CALL_SUBTEST( test_scalar<double>(32) );
	CALL_SUBTEST( test_scalar<float>(45) ); CALL_SUBTEST( test_scalar<double>(45) );
	CALL_SUBTEST( test_scalar<float>(50) ); CALL_SUBTEST( test_scalar<double>(50) );
	CALL_SUBTEST( test_scalar<float>(256) ); CALL_SUBTEST( test_scalar<double>(256) );
	CALL_SUBTEST( test_scalar<float>(23457) ); CALL_SUBTEST( test_scalar<double>(23457) );

	#ifdef EIGEN_HAS_FFTWL
	CALL_SUBTEST( test_complex<long double>(32) );
	CALL_SUBTEST( test_complex<long double>(256) );
	CALL_SUBTEST( test_complex<long double>(3*8) );
	CALL_SUBTEST( test_complex<long double>(5*32) );
	CALL_SUBTEST( test_complex<long double>(234) );
	CALL_SUBTEST( test_complex<long double>(234*5) );
	CALL_SUBTEST( test_complex<long double>(23457) );

	CALL_SUBTEST( test_scalar<long double>(32) );
	CALL_SUBTEST( test_scalar<long double>(45) );
	CALL_SUBTEST( test_scalar<long double>(50) );
	CALL_SUBTEST( test_scalar<long double>(256) );
	CALL_SUBTEST( test_scalar<long double>(23457) );
	#endif
	}