| // This file is part of Eigen, a lightweight C++ template library |
| // for linear algebra. |
| // |
| // Copyright (C) 2012 Desire Nuentsa Wakam <desire.nuentsa_wakam@inria.fr> |
| // Copyright (C) 2014 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 |
| #include "sparse.h" |
| #include <Eigen/SparseQR> |
| |
| template<typename MatrixType,typename DenseMat> |
| int generate_sparse_rectangular_problem(MatrixType& A, DenseMat& dA, int maxRows = 300, int maxCols = 150) |
| { |
| eigen_assert(maxRows >= maxCols); |
| typedef typename MatrixType::Scalar Scalar; |
| int rows = internal::random<int>(1,maxRows); |
| int cols = internal::random<int>(1,maxCols); |
| double density = (std::max)(8./(rows*cols), 0.01); |
| |
| A.resize(rows,cols); |
| dA.resize(rows,cols); |
| initSparse<Scalar>(density, dA, A,ForceNonZeroDiag); |
| A.makeCompressed(); |
| int nop = internal::random<int>(0, internal::random<double>(0,1) > 0.5 ? cols/2 : 0); |
| for(int k=0; k<nop; ++k) |
| { |
| int j0 = internal::random<int>(0,cols-1); |
| int j1 = internal::random<int>(0,cols-1); |
| Scalar s = internal::random<Scalar>(); |
| A.col(j0) = s * A.col(j1); |
| dA.col(j0) = s * dA.col(j1); |
| } |
| |
| // if(rows<cols) { |
| // A.conservativeResize(cols,cols); |
| // dA.conservativeResize(cols,cols); |
| // dA.bottomRows(cols-rows).setZero(); |
| // } |
| |
| return rows; |
| } |
| |
| template<typename Scalar> void test_sparseqr_scalar() |
| { |
| typedef typename NumTraits<Scalar>::Real RealScalar; |
| typedef SparseMatrix<Scalar,ColMajor> MatrixType; |
| typedef Matrix<Scalar,Dynamic,Dynamic> DenseMat; |
| typedef Matrix<Scalar,Dynamic,1> DenseVector; |
| MatrixType A; |
| DenseMat dA; |
| DenseVector refX,x,b; |
| SparseQR<MatrixType, COLAMDOrdering<int> > solver; |
| generate_sparse_rectangular_problem(A,dA); |
| |
| b = dA * DenseVector::Random(A.cols()); |
| solver.compute(A); |
| |
| // Q should be MxM |
| VERIFY_IS_EQUAL(solver.matrixQ().rows(), A.rows()); |
| VERIFY_IS_EQUAL(solver.matrixQ().cols(), A.rows()); |
| |
| // R should be MxN |
| VERIFY_IS_EQUAL(solver.matrixR().rows(), A.rows()); |
| VERIFY_IS_EQUAL(solver.matrixR().cols(), A.cols()); |
| |
| // Q and R can be multiplied |
| DenseMat recoveredA = solver.matrixQ() |
| * DenseMat(solver.matrixR().template triangularView<Upper>()) |
| * solver.colsPermutation().transpose(); |
| VERIFY_IS_EQUAL(recoveredA.rows(), A.rows()); |
| VERIFY_IS_EQUAL(recoveredA.cols(), A.cols()); |
| |
| // and in the full rank case the original matrix is recovered |
| if (solver.rank() == A.cols()) |
| { |
| VERIFY_IS_APPROX(A, recoveredA); |
| } |
| |
| if(internal::random<float>(0,1)>0.5f) |
| solver.factorize(A); // this checks that calling analyzePattern is not needed if the pattern do not change. |
| if (solver.info() != Success) |
| { |
| std::cerr << "sparse QR factorization failed\n"; |
| exit(0); |
| return; |
| } |
| x = solver.solve(b); |
| if (solver.info() != Success) |
| { |
| std::cerr << "sparse QR factorization failed\n"; |
| exit(0); |
| return; |
| } |
| |
| // Compare with a dense QR solver |
| ColPivHouseholderQR<DenseMat> dqr(dA); |
| refX = dqr.solve(b); |
| |
| bool rank_deficient = A.cols()>A.rows() || dqr.rank()<A.cols(); |
| if(rank_deficient) |
| { |
| // rank deficient problem -> we might have to increase the threshold |
| // to get a correct solution. |
| RealScalar th = RealScalar(20)*dA.colwise().norm().maxCoeff()*(A.rows()+A.cols()) * NumTraits<RealScalar>::epsilon(); |
| for(Index k=0; (k<16) && !test_isApprox(A*x,b); ++k) |
| { |
| th *= RealScalar(10); |
| solver.setPivotThreshold(th); |
| solver.compute(A); |
| x = solver.solve(b); |
| } |
| } |
| |
| VERIFY_IS_APPROX(A * x, b); |
| |
| // For rank deficient problem, the estimated rank might |
| // be slightly off, so let's only raise a warning in such cases. |
| if(rank_deficient) ++g_test_level; |
| VERIFY_IS_EQUAL(solver.rank(), dqr.rank()); |
| if(rank_deficient) --g_test_level; |
| |
| if(solver.rank()==A.cols()) // full rank |
| VERIFY_IS_APPROX(x, refX); |
| // else |
| // VERIFY((dA * refX - b).norm() * 2 > (A * x - b).norm() ); |
| |
| // Compute explicitly the matrix Q |
| MatrixType Q, QtQ, idM; |
| Q = solver.matrixQ(); |
| //Check ||Q' * Q - I || |
| QtQ = Q * Q.adjoint(); |
| idM.resize(Q.rows(), Q.rows()); idM.setIdentity(); |
| VERIFY(idM.isApprox(QtQ)); |
| |
| // Q to dense |
| DenseMat dQ; |
| dQ = solver.matrixQ(); |
| VERIFY_IS_APPROX(Q, dQ); |
| } |
| EIGEN_DECLARE_TEST(sparseqr) |
| { |
| for(int i=0; i<g_repeat; ++i) |
| { |
| CALL_SUBTEST_1(test_sparseqr_scalar<double>()); |
| CALL_SUBTEST_2(test_sparseqr_scalar<std::complex<double> >()); |
| } |
| } |
| |
