| // This file is part of Eigen, a lightweight C++ template library |
| // for linear algebra. |
| // |
| // Copyright (C) 2009-2010 Benoit Jacob <jacob.benoit.1@gmail.com> |
| // Copyright (C) 2013-2014 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 |
| // with this file, You can obtain one at http://mozilla.org/MPL/2.0/. |
| |
| #ifndef EIGEN_JACOBISVD_H |
| #define EIGEN_JACOBISVD_H |
| |
| namespace Eigen { |
| |
| namespace internal { |
| // forward declaration (needed by ICC) |
| // the empty body is required by MSVC |
| template<typename MatrixType, int QRPreconditioner, |
| bool IsComplex = NumTraits<typename MatrixType::Scalar>::IsComplex> |
| struct svd_precondition_2x2_block_to_be_real {}; |
| |
| /*** QR preconditioners (R-SVD) |
| *** |
| *** Their role is to reduce the problem of computing the SVD to the case of a square matrix. |
| *** This approach, known as R-SVD, is an optimization for rectangular-enough matrices, and is a requirement for |
| *** JacobiSVD which by itself is only able to work on square matrices. |
| ***/ |
| |
| enum { PreconditionIfMoreColsThanRows, PreconditionIfMoreRowsThanCols }; |
| |
| template<typename MatrixType, int QRPreconditioner, int Case> |
| struct qr_preconditioner_should_do_anything |
| { |
| enum { a = MatrixType::RowsAtCompileTime != Dynamic && |
| MatrixType::ColsAtCompileTime != Dynamic && |
| MatrixType::ColsAtCompileTime <= MatrixType::RowsAtCompileTime, |
| b = MatrixType::RowsAtCompileTime != Dynamic && |
| MatrixType::ColsAtCompileTime != Dynamic && |
| MatrixType::RowsAtCompileTime <= MatrixType::ColsAtCompileTime, |
| ret = !( (QRPreconditioner == NoQRPreconditioner) || |
| (Case == PreconditionIfMoreColsThanRows && bool(a)) || |
| (Case == PreconditionIfMoreRowsThanCols && bool(b)) ) |
| }; |
| }; |
| |
| template<typename MatrixType, int QRPreconditioner, int Case, |
| bool DoAnything = qr_preconditioner_should_do_anything<MatrixType, QRPreconditioner, Case>::ret |
| > struct qr_preconditioner_impl {}; |
| |
| template<typename MatrixType, int QRPreconditioner, int Case> |
| class qr_preconditioner_impl<MatrixType, QRPreconditioner, Case, false> |
| { |
| public: |
| void allocate(const JacobiSVD<MatrixType, QRPreconditioner>&) {} |
| bool run(JacobiSVD<MatrixType, QRPreconditioner>&, const MatrixType&) |
| { |
| return false; |
| } |
| }; |
| |
| /*** preconditioner using FullPivHouseholderQR ***/ |
| |
| template<typename MatrixType> |
| class qr_preconditioner_impl<MatrixType, FullPivHouseholderQRPreconditioner, PreconditionIfMoreRowsThanCols, true> |
| { |
| public: |
| typedef typename MatrixType::Scalar Scalar; |
| enum |
| { |
| RowsAtCompileTime = MatrixType::RowsAtCompileTime, |
| MaxRowsAtCompileTime = MatrixType::MaxRowsAtCompileTime |
| }; |
| typedef Matrix<Scalar, 1, RowsAtCompileTime, RowMajor, 1, MaxRowsAtCompileTime> WorkspaceType; |
| |
| void allocate(const JacobiSVD<MatrixType, FullPivHouseholderQRPreconditioner>& svd) |
| { |
| if (svd.rows() != m_qr.rows() || svd.cols() != m_qr.cols()) |
| { |
| m_qr.~QRType(); |
| ::new (&m_qr) QRType(svd.rows(), svd.cols()); |
| } |
| if (svd.m_computeFullU) m_workspace.resize(svd.rows()); |
| } |
| |
| bool run(JacobiSVD<MatrixType, FullPivHouseholderQRPreconditioner>& svd, const MatrixType& matrix) |
| { |
| if(matrix.rows() > matrix.cols()) |
| { |
| m_qr.compute(matrix); |
| svd.m_workMatrix = m_qr.matrixQR().block(0,0,matrix.cols(),matrix.cols()).template triangularView<Upper>(); |
| if(svd.m_computeFullU) m_qr.matrixQ().evalTo(svd.m_matrixU, m_workspace); |
| if(svd.computeV()) svd.m_matrixV = m_qr.colsPermutation(); |
| return true; |
| } |
| return false; |
| } |
| private: |
| typedef FullPivHouseholderQR<MatrixType> QRType; |
| QRType m_qr; |
| WorkspaceType m_workspace; |
| }; |
| |
| template<typename MatrixType> |
| class qr_preconditioner_impl<MatrixType, FullPivHouseholderQRPreconditioner, PreconditionIfMoreColsThanRows, true> |
| { |
| public: |
| typedef typename MatrixType::Scalar Scalar; |
| enum |
| { |
| RowsAtCompileTime = MatrixType::RowsAtCompileTime, |
| ColsAtCompileTime = MatrixType::ColsAtCompileTime, |
| MaxRowsAtCompileTime = MatrixType::MaxRowsAtCompileTime, |
| MaxColsAtCompileTime = MatrixType::MaxColsAtCompileTime, |
| Options = MatrixType::Options |
| }; |
| typedef Matrix<Scalar, ColsAtCompileTime, RowsAtCompileTime, Options, MaxColsAtCompileTime, MaxRowsAtCompileTime> |
| TransposeTypeWithSameStorageOrder; |
| |
| void allocate(const JacobiSVD<MatrixType, FullPivHouseholderQRPreconditioner>& svd) |
| { |
| if (svd.cols() != m_qr.rows() || svd.rows() != m_qr.cols()) |
| { |
| m_qr.~QRType(); |
| ::new (&m_qr) QRType(svd.cols(), svd.rows()); |
| } |
| m_adjoint.resize(svd.cols(), svd.rows()); |
| if (svd.m_computeFullV) m_workspace.resize(svd.cols()); |
| } |
| |
| bool run(JacobiSVD<MatrixType, FullPivHouseholderQRPreconditioner>& svd, const MatrixType& matrix) |
| { |
| if(matrix.cols() > matrix.rows()) |
| { |
| m_adjoint = matrix.adjoint(); |
| m_qr.compute(m_adjoint); |
| svd.m_workMatrix = m_qr.matrixQR().block(0,0,matrix.rows(),matrix.rows()).template triangularView<Upper>().adjoint(); |
| if(svd.m_computeFullV) m_qr.matrixQ().evalTo(svd.m_matrixV, m_workspace); |
| if(svd.computeU()) svd.m_matrixU = m_qr.colsPermutation(); |
| return true; |
| } |
| else return false; |
| } |
| private: |
| typedef FullPivHouseholderQR<TransposeTypeWithSameStorageOrder> QRType; |
| QRType m_qr; |
| TransposeTypeWithSameStorageOrder m_adjoint; |
| typename internal::plain_row_type<MatrixType>::type m_workspace; |
| }; |
| |
| /*** preconditioner using ColPivHouseholderQR ***/ |
| |
| template<typename MatrixType> |
| class qr_preconditioner_impl<MatrixType, ColPivHouseholderQRPreconditioner, PreconditionIfMoreRowsThanCols, true> |
| { |
| public: |
| void allocate(const JacobiSVD<MatrixType, ColPivHouseholderQRPreconditioner>& svd) |
| { |
| if (svd.rows() != m_qr.rows() || svd.cols() != m_qr.cols()) |
| { |
| m_qr.~QRType(); |
| ::new (&m_qr) QRType(svd.rows(), svd.cols()); |
| } |
| if (svd.m_computeFullU) m_workspace.resize(svd.rows()); |
| else if (svd.m_computeThinU) m_workspace.resize(svd.cols()); |
| } |
| |
| bool run(JacobiSVD<MatrixType, ColPivHouseholderQRPreconditioner>& svd, const MatrixType& matrix) |
| { |
| if(matrix.rows() > matrix.cols()) |
| { |
| m_qr.compute(matrix); |
| svd.m_workMatrix = m_qr.matrixQR().block(0,0,matrix.cols(),matrix.cols()).template triangularView<Upper>(); |
| if(svd.m_computeFullU) m_qr.householderQ().evalTo(svd.m_matrixU, m_workspace); |
| else if(svd.m_computeThinU) |
| { |
| svd.m_matrixU.setIdentity(matrix.rows(), matrix.cols()); |
| m_qr.householderQ().applyThisOnTheLeft(svd.m_matrixU, m_workspace); |
| } |
| if(svd.computeV()) svd.m_matrixV = m_qr.colsPermutation(); |
| return true; |
| } |
| return false; |
| } |
| |
| private: |
| typedef ColPivHouseholderQR<MatrixType> QRType; |
| QRType m_qr; |
| typename internal::plain_col_type<MatrixType>::type m_workspace; |
| }; |
| |
| template<typename MatrixType> |
| class qr_preconditioner_impl<MatrixType, ColPivHouseholderQRPreconditioner, PreconditionIfMoreColsThanRows, true> |
| { |
| public: |
| typedef typename MatrixType::Scalar Scalar; |
| enum |
| { |
| RowsAtCompileTime = MatrixType::RowsAtCompileTime, |
| ColsAtCompileTime = MatrixType::ColsAtCompileTime, |
| MaxRowsAtCompileTime = MatrixType::MaxRowsAtCompileTime, |
| MaxColsAtCompileTime = MatrixType::MaxColsAtCompileTime, |
| Options = MatrixType::Options |
| }; |
| |
| typedef Matrix<Scalar, ColsAtCompileTime, RowsAtCompileTime, Options, MaxColsAtCompileTime, MaxRowsAtCompileTime> |
| TransposeTypeWithSameStorageOrder; |
| |
| void allocate(const JacobiSVD<MatrixType, ColPivHouseholderQRPreconditioner>& svd) |
| { |
| if (svd.cols() != m_qr.rows() || svd.rows() != m_qr.cols()) |
| { |
| m_qr.~QRType(); |
| ::new (&m_qr) QRType(svd.cols(), svd.rows()); |
| } |
| if (svd.m_computeFullV) m_workspace.resize(svd.cols()); |
| else if (svd.m_computeThinV) m_workspace.resize(svd.rows()); |
| m_adjoint.resize(svd.cols(), svd.rows()); |
| } |
| |
| bool run(JacobiSVD<MatrixType, ColPivHouseholderQRPreconditioner>& svd, const MatrixType& matrix) |
| { |
| if(matrix.cols() > matrix.rows()) |
| { |
| m_adjoint = matrix.adjoint(); |
| m_qr.compute(m_adjoint); |
| |
| svd.m_workMatrix = m_qr.matrixQR().block(0,0,matrix.rows(),matrix.rows()).template triangularView<Upper>().adjoint(); |
| if(svd.m_computeFullV) m_qr.householderQ().evalTo(svd.m_matrixV, m_workspace); |
| else if(svd.m_computeThinV) |
| { |
| svd.m_matrixV.setIdentity(matrix.cols(), matrix.rows()); |
| m_qr.householderQ().applyThisOnTheLeft(svd.m_matrixV, m_workspace); |
| } |
| if(svd.computeU()) svd.m_matrixU = m_qr.colsPermutation(); |
| return true; |
| } |
| else return false; |
| } |
| |
| private: |
| typedef ColPivHouseholderQR<TransposeTypeWithSameStorageOrder> QRType; |
| QRType m_qr; |
| TransposeTypeWithSameStorageOrder m_adjoint; |
| typename internal::plain_row_type<MatrixType>::type m_workspace; |
| }; |
| |
| /*** preconditioner using HouseholderQR ***/ |
| |
| template<typename MatrixType> |
| class qr_preconditioner_impl<MatrixType, HouseholderQRPreconditioner, PreconditionIfMoreRowsThanCols, true> |
| { |
| public: |
| void allocate(const JacobiSVD<MatrixType, HouseholderQRPreconditioner>& svd) |
| { |
| if (svd.rows() != m_qr.rows() || svd.cols() != m_qr.cols()) |
| { |
| m_qr.~QRType(); |
| ::new (&m_qr) QRType(svd.rows(), svd.cols()); |
| } |
| if (svd.m_computeFullU) m_workspace.resize(svd.rows()); |
| else if (svd.m_computeThinU) m_workspace.resize(svd.cols()); |
| } |
| |
| bool run(JacobiSVD<MatrixType, HouseholderQRPreconditioner>& svd, const MatrixType& matrix) |
| { |
| if(matrix.rows() > matrix.cols()) |
| { |
| m_qr.compute(matrix); |
| svd.m_workMatrix = m_qr.matrixQR().block(0,0,matrix.cols(),matrix.cols()).template triangularView<Upper>(); |
| if(svd.m_computeFullU) m_qr.householderQ().evalTo(svd.m_matrixU, m_workspace); |
| else if(svd.m_computeThinU) |
| { |
| svd.m_matrixU.setIdentity(matrix.rows(), matrix.cols()); |
| m_qr.householderQ().applyThisOnTheLeft(svd.m_matrixU, m_workspace); |
| } |
| if(svd.computeV()) svd.m_matrixV.setIdentity(matrix.cols(), matrix.cols()); |
| return true; |
| } |
| return false; |
| } |
| private: |
| typedef HouseholderQR<MatrixType> QRType; |
| QRType m_qr; |
| typename internal::plain_col_type<MatrixType>::type m_workspace; |
| }; |
| |
| template<typename MatrixType> |
| class qr_preconditioner_impl<MatrixType, HouseholderQRPreconditioner, PreconditionIfMoreColsThanRows, true> |
| { |
| public: |
| typedef typename MatrixType::Scalar Scalar; |
| enum |
| { |
| RowsAtCompileTime = MatrixType::RowsAtCompileTime, |
| ColsAtCompileTime = MatrixType::ColsAtCompileTime, |
| MaxRowsAtCompileTime = MatrixType::MaxRowsAtCompileTime, |
| MaxColsAtCompileTime = MatrixType::MaxColsAtCompileTime, |
| Options = MatrixType::Options |
| }; |
| |
| typedef Matrix<Scalar, ColsAtCompileTime, RowsAtCompileTime, Options, MaxColsAtCompileTime, MaxRowsAtCompileTime> |
| TransposeTypeWithSameStorageOrder; |
| |
| void allocate(const JacobiSVD<MatrixType, HouseholderQRPreconditioner>& svd) |
| { |
| if (svd.cols() != m_qr.rows() || svd.rows() != m_qr.cols()) |
| { |
| m_qr.~QRType(); |
| ::new (&m_qr) QRType(svd.cols(), svd.rows()); |
| } |
| if (svd.m_computeFullV) m_workspace.resize(svd.cols()); |
| else if (svd.m_computeThinV) m_workspace.resize(svd.rows()); |
| m_adjoint.resize(svd.cols(), svd.rows()); |
| } |
| |
| bool run(JacobiSVD<MatrixType, HouseholderQRPreconditioner>& svd, const MatrixType& matrix) |
| { |
| if(matrix.cols() > matrix.rows()) |
| { |
| m_adjoint = matrix.adjoint(); |
| m_qr.compute(m_adjoint); |
| |
| svd.m_workMatrix = m_qr.matrixQR().block(0,0,matrix.rows(),matrix.rows()).template triangularView<Upper>().adjoint(); |
| if(svd.m_computeFullV) m_qr.householderQ().evalTo(svd.m_matrixV, m_workspace); |
| else if(svd.m_computeThinV) |
| { |
| svd.m_matrixV.setIdentity(matrix.cols(), matrix.rows()); |
| m_qr.householderQ().applyThisOnTheLeft(svd.m_matrixV, m_workspace); |
| } |
| if(svd.computeU()) svd.m_matrixU.setIdentity(matrix.rows(), matrix.rows()); |
| return true; |
| } |
| else return false; |
| } |
| |
| private: |
| typedef HouseholderQR<TransposeTypeWithSameStorageOrder> QRType; |
| QRType m_qr; |
| TransposeTypeWithSameStorageOrder m_adjoint; |
| typename internal::plain_row_type<MatrixType>::type m_workspace; |
| }; |
| |
| /*** 2x2 SVD implementation |
| *** |
| *** JacobiSVD consists in performing a series of 2x2 SVD subproblems |
| ***/ |
| |
| template<typename MatrixType, int QRPreconditioner> |
| struct svd_precondition_2x2_block_to_be_real<MatrixType, QRPreconditioner, false> |
| { |
| typedef JacobiSVD<MatrixType, QRPreconditioner> SVD; |
| typedef typename SVD::Index Index; |
| static void run(typename SVD::WorkMatrixType&, SVD&, Index, Index) {} |
| }; |
| |
| template<typename MatrixType, int QRPreconditioner> |
| struct svd_precondition_2x2_block_to_be_real<MatrixType, QRPreconditioner, true> |
| { |
| typedef JacobiSVD<MatrixType, QRPreconditioner> SVD; |
| typedef typename MatrixType::Scalar Scalar; |
| typedef typename MatrixType::RealScalar RealScalar; |
| typedef typename SVD::Index Index; |
| static void run(typename SVD::WorkMatrixType& work_matrix, SVD& svd, Index p, Index q) |
| { |
| using std::sqrt; |
| Scalar z; |
| JacobiRotation<Scalar> rot; |
| RealScalar n = sqrt(numext::abs2(work_matrix.coeff(p,p)) + numext::abs2(work_matrix.coeff(q,p))); |
| if(n==0) |
| { |
| z = abs(work_matrix.coeff(p,q)) / work_matrix.coeff(p,q); |
| work_matrix.row(p) *= z; |
| if(svd.computeU()) svd.m_matrixU.col(p) *= conj(z); |
| if(work_matrix.coeff(q,q)!=Scalar(0)) |
| z = abs(work_matrix.coeff(q,q)) / work_matrix.coeff(q,q); |
| else |
| z = Scalar(0); |
| work_matrix.row(q) *= z; |
| if(svd.computeU()) svd.m_matrixU.col(q) *= conj(z); |
| } |
| else |
| { |
| rot.c() = conj(work_matrix.coeff(p,p)) / n; |
| rot.s() = work_matrix.coeff(q,p) / n; |
| work_matrix.applyOnTheLeft(p,q,rot); |
| if(svd.computeU()) svd.m_matrixU.applyOnTheRight(p,q,rot.adjoint()); |
| if(work_matrix.coeff(p,q) != Scalar(0)) |
| { |
| Scalar z = abs(work_matrix.coeff(p,q)) / work_matrix.coeff(p,q); |
| work_matrix.col(q) *= z; |
| if(svd.computeV()) svd.m_matrixV.col(q) *= z; |
| } |
| if(work_matrix.coeff(q,q) != Scalar(0)) |
| { |
| z = abs(work_matrix.coeff(q,q)) / work_matrix.coeff(q,q); |
| work_matrix.row(q) *= z; |
| if(svd.computeU()) svd.m_matrixU.col(q) *= conj(z); |
| } |
| } |
| } |
| }; |
| |
| template<typename _MatrixType, int QRPreconditioner> |
| struct traits<JacobiSVD<_MatrixType,QRPreconditioner> > |
| { |
| typedef _MatrixType MatrixType; |
| }; |
| |
| template<typename MatrixType, typename RealScalar, typename Index> |
| void real_2x2_jacobi_svd(const MatrixType& matrix, Index p, Index q, |
| JacobiRotation<RealScalar> *j_left, |
| JacobiRotation<RealScalar> *j_right) |
| { |
| using std::sqrt; |
| using std::abs; |
| Matrix<RealScalar,2,2> m; |
| m << numext::real(matrix.coeff(p,p)), numext::real(matrix.coeff(p,q)), |
| numext::real(matrix.coeff(q,p)), numext::real(matrix.coeff(q,q)); |
| JacobiRotation<RealScalar> rot1; |
| RealScalar t = m.coeff(0,0) + m.coeff(1,1); |
| RealScalar d = m.coeff(1,0) - m.coeff(0,1); |
| if(t == RealScalar(0)) |
| { |
| rot1.c() = RealScalar(0); |
| rot1.s() = d > RealScalar(0) ? RealScalar(1) : RealScalar(-1); |
| } |
| else |
| { |
| RealScalar t2d2 = numext::hypot(t,d); |
| rot1.c() = abs(t)/t2d2; |
| rot1.s() = d/t2d2; |
| if(t<RealScalar(0)) |
| rot1.s() = -rot1.s(); |
| } |
| m.applyOnTheLeft(0,1,rot1); |
| j_right->makeJacobi(m,0,1); |
| *j_left = rot1 * j_right->transpose(); |
| } |
| |
| } // end namespace internal |
| |
| /** \ingroup SVD_Module |
| * |
| * |
| * \class JacobiSVD |
| * |
| * \brief Two-sided Jacobi SVD decomposition of a rectangular matrix |
| * |
| * \tparam _MatrixType the type of the matrix of which we are computing the SVD decomposition |
| * \tparam QRPreconditioner this optional parameter allows to specify the type of QR decomposition that will be used internally |
| * for the R-SVD step for non-square matrices. See discussion of possible values below. |
| * |
| * SVD decomposition consists in decomposing any n-by-p matrix \a A as a product |
| * \f[ A = U S V^* \f] |
| * where \a U is a n-by-n unitary, \a V is a p-by-p unitary, and \a S is a n-by-p real positive matrix which is zero outside of its main diagonal; |
| * the diagonal entries of S are known as the \em singular \em values of \a A and the columns of \a U and \a V are known as the left |
| * and right \em singular \em vectors of \a A respectively. |
| * |
| * Singular values are always sorted in decreasing order. |
| * |
| * This JacobiSVD decomposition computes only the singular values by default. If you want \a U or \a V, you need to ask for them explicitly. |
| * |
| * You can ask for only \em thin \a U or \a V to be computed, meaning the following. In case of a rectangular n-by-p matrix, letting \a m be the |
| * smaller value among \a n and \a p, there are only \a m singular vectors; the remaining columns of \a U and \a V do not correspond to actual |
| * singular vectors. Asking for \em thin \a U or \a V means asking for only their \a m first columns to be formed. So \a U is then a n-by-m matrix, |
| * and \a V is then a p-by-m matrix. Notice that thin \a U and \a V are all you need for (least squares) solving. |
| * |
| * Here's an example demonstrating basic usage: |
| * \include JacobiSVD_basic.cpp |
| * Output: \verbinclude JacobiSVD_basic.out |
| * |
| * This JacobiSVD class is a two-sided Jacobi R-SVD decomposition, ensuring optimal reliability and accuracy. The downside is that it's slower than |
| * bidiagonalizing SVD algorithms for large square matrices; however its complexity is still \f$ O(n^2p) \f$ where \a n is the smaller dimension and |
| * \a p is the greater dimension, meaning that it is still of the same order of complexity as the faster bidiagonalizing R-SVD algorithms. |
| * In particular, like any R-SVD, it takes advantage of non-squareness in that its complexity is only linear in the greater dimension. |
| * |
| * If the input matrix has inf or nan coefficients, the result of the computation is undefined, but the computation is guaranteed to |
| * terminate in finite (and reasonable) time. |
| * |
| * The possible values for QRPreconditioner are: |
| * \li ColPivHouseholderQRPreconditioner is the default. In practice it's very safe. It uses column-pivoting QR. |
| * \li FullPivHouseholderQRPreconditioner, is the safest and slowest. It uses full-pivoting QR. |
| * Contrary to other QRs, it doesn't allow computing thin unitaries. |
| * \li HouseholderQRPreconditioner is the fastest, and less safe and accurate than the pivoting variants. It uses non-pivoting QR. |
| * This is very similar in safety and accuracy to the bidiagonalization process used by bidiagonalizing SVD algorithms (since bidiagonalization |
| * is inherently non-pivoting). However the resulting SVD is still more reliable than bidiagonalizing SVDs because the Jacobi-based iterarive |
| * process is more reliable than the optimized bidiagonal SVD iterations. |
| * \li NoQRPreconditioner allows not to use a QR preconditioner at all. This is useful if you know that you will only be computing |
| * JacobiSVD decompositions of square matrices. Non-square matrices require a QR preconditioner. Using this option will result in |
| * faster compilation and smaller executable code. It won't significantly speed up computation, since JacobiSVD is always checking |
| * if QR preconditioning is needed before applying it anyway. |
| * |
| * \sa MatrixBase::jacobiSvd() |
| */ |
| template<typename _MatrixType, int QRPreconditioner> class JacobiSVD |
| : public SVDBase<JacobiSVD<_MatrixType,QRPreconditioner> > |
| { |
| typedef SVDBase<JacobiSVD> Base; |
| public: |
| |
| typedef _MatrixType MatrixType; |
| typedef typename MatrixType::Scalar Scalar; |
| typedef typename NumTraits<typename MatrixType::Scalar>::Real RealScalar; |
| enum { |
| RowsAtCompileTime = MatrixType::RowsAtCompileTime, |
| ColsAtCompileTime = MatrixType::ColsAtCompileTime, |
| DiagSizeAtCompileTime = EIGEN_SIZE_MIN_PREFER_DYNAMIC(RowsAtCompileTime,ColsAtCompileTime), |
| MaxRowsAtCompileTime = MatrixType::MaxRowsAtCompileTime, |
| MaxColsAtCompileTime = MatrixType::MaxColsAtCompileTime, |
| MaxDiagSizeAtCompileTime = EIGEN_SIZE_MIN_PREFER_FIXED(MaxRowsAtCompileTime,MaxColsAtCompileTime), |
| MatrixOptions = MatrixType::Options |
| }; |
| |
| typedef typename Base::MatrixUType MatrixUType; |
| typedef typename Base::MatrixVType MatrixVType; |
| typedef typename Base::SingularValuesType SingularValuesType; |
| |
| typedef typename internal::plain_row_type<MatrixType>::type RowType; |
| typedef typename internal::plain_col_type<MatrixType>::type ColType; |
| typedef Matrix<Scalar, DiagSizeAtCompileTime, DiagSizeAtCompileTime, |
| MatrixOptions, MaxDiagSizeAtCompileTime, MaxDiagSizeAtCompileTime> |
| WorkMatrixType; |
| |
| /** \brief Default Constructor. |
| * |
| * The default constructor is useful in cases in which the user intends to |
| * perform decompositions via JacobiSVD::compute(const MatrixType&). |
| */ |
| JacobiSVD() |
| {} |
| |
| |
| /** \brief Default Constructor with memory preallocation |
| * |
| * Like the default constructor but with preallocation of the internal data |
| * according to the specified problem size. |
| * \sa JacobiSVD() |
| */ |
| JacobiSVD(Index rows, Index cols, unsigned int computationOptions = 0) |
| { |
| allocate(rows, cols, computationOptions); |
| } |
| |
| /** \brief Constructor performing the decomposition of given matrix. |
| * |
| * \param matrix the matrix to decompose |
| * \param computationOptions optional parameter allowing to specify if you want full or thin U or V unitaries to be computed. |
| * By default, none is computed. This is a bit-field, the possible bits are #ComputeFullU, #ComputeThinU, |
| * #ComputeFullV, #ComputeThinV. |
| * |
| * Thin unitaries are only available if your matrix type has a Dynamic number of columns (for example MatrixXf). They also are not |
| * available with the (non-default) FullPivHouseholderQR preconditioner. |
| */ |
| explicit JacobiSVD(const MatrixType& matrix, unsigned int computationOptions = 0) |
| { |
| compute(matrix, computationOptions); |
| } |
| |
| /** \brief Method performing the decomposition of given matrix using custom options. |
| * |
| * \param matrix the matrix to decompose |
| * \param computationOptions optional parameter allowing to specify if you want full or thin U or V unitaries to be computed. |
| * By default, none is computed. This is a bit-field, the possible bits are #ComputeFullU, #ComputeThinU, |
| * #ComputeFullV, #ComputeThinV. |
| * |
| * Thin unitaries are only available if your matrix type has a Dynamic number of columns (for example MatrixXf). They also are not |
| * available with the (non-default) FullPivHouseholderQR preconditioner. |
| */ |
| JacobiSVD& compute(const MatrixType& matrix, unsigned int computationOptions); |
| |
| /** \brief Method performing the decomposition of given matrix using current options. |
| * |
| * \param matrix the matrix to decompose |
| * |
| * This method uses the current \a computationOptions, as already passed to the constructor or to compute(const MatrixType&, unsigned int). |
| */ |
| JacobiSVD& compute(const MatrixType& matrix) |
| { |
| return compute(matrix, m_computationOptions); |
| } |
| |
| using Base::computeU; |
| using Base::computeV; |
| using Base::rows; |
| using Base::cols; |
| using Base::rank; |
| |
| /** \returns a (least squares) solution of \f$ A x = b \f$ using the current SVD decomposition of A. |
| * |
| * \param b the right-hand-side of the equation to solve. |
| * |
| * \note Solving requires both U and V to be computed. Thin U and V are enough, there is no need for full U or V. |
| * |
| * \note SVD solving is implicitly least-squares. Thus, this method serves both purposes of exact solving and least-squares solving. |
| * In other words, the returned solution is guaranteed to minimize the Euclidean norm \f$ \Vert A x - b \Vert \f$. |
| */ |
| template<typename Rhs> |
| inline const internal::solve_retval<JacobiSVD, Rhs> |
| solve(const MatrixBase<Rhs>& b) const |
| { |
| eigen_assert(this->m_isInitialized && "JacobiSVD is not initialized."); |
| eigen_assert(Base::computeU() && Base::computeV() && "JacobiSVD::solve() requires both unitaries U and V to be computed (thin unitaries suffice)."); |
| return internal::solve_retval<JacobiSVD<_MatrixType,QRPreconditioner>, Rhs>(*this, b.derived()); |
| } |
| |
| |
| private: |
| void allocate(Index rows, Index cols, unsigned int computationOptions); |
| |
| protected: |
| using Base::m_matrixU; |
| using Base::m_matrixV; |
| using Base::m_singularValues; |
| using Base::m_isInitialized; |
| using Base::m_isAllocated; |
| using Base::m_usePrescribedThreshold; |
| using Base::m_computeFullU; |
| using Base::m_computeThinU; |
| using Base::m_computeFullV; |
| using Base::m_computeThinV; |
| using Base::m_computationOptions; |
| using Base::m_nonzeroSingularValues; |
| using Base::m_rows; |
| using Base::m_cols; |
| using Base::m_diagSize; |
| using Base::m_prescribedThreshold; |
| WorkMatrixType m_workMatrix; |
| |
| template<typename __MatrixType, int _QRPreconditioner, bool _IsComplex> |
| friend struct internal::svd_precondition_2x2_block_to_be_real; |
| template<typename __MatrixType, int _QRPreconditioner, int _Case, bool _DoAnything> |
| friend struct internal::qr_preconditioner_impl; |
| |
| internal::qr_preconditioner_impl<MatrixType, QRPreconditioner, internal::PreconditionIfMoreColsThanRows> m_qr_precond_morecols; |
| internal::qr_preconditioner_impl<MatrixType, QRPreconditioner, internal::PreconditionIfMoreRowsThanCols> m_qr_precond_morerows; |
| }; |
| |
| template<typename MatrixType, int QRPreconditioner> |
| void JacobiSVD<MatrixType, QRPreconditioner>::allocate(Index rows, Index cols, unsigned int computationOptions) |
| { |
| eigen_assert(rows >= 0 && cols >= 0); |
| |
| if (m_isAllocated && |
| rows == m_rows && |
| cols == m_cols && |
| computationOptions == m_computationOptions) |
| { |
| return; |
| } |
| |
| m_rows = rows; |
| m_cols = cols; |
| m_isInitialized = false; |
| m_isAllocated = true; |
| m_computationOptions = computationOptions; |
| m_computeFullU = (computationOptions & ComputeFullU) != 0; |
| m_computeThinU = (computationOptions & ComputeThinU) != 0; |
| m_computeFullV = (computationOptions & ComputeFullV) != 0; |
| m_computeThinV = (computationOptions & ComputeThinV) != 0; |
| eigen_assert(!(m_computeFullU && m_computeThinU) && "JacobiSVD: you can't ask for both full and thin U"); |
| eigen_assert(!(m_computeFullV && m_computeThinV) && "JacobiSVD: you can't ask for both full and thin V"); |
| eigen_assert(EIGEN_IMPLIES(m_computeThinU || m_computeThinV, MatrixType::ColsAtCompileTime==Dynamic) && |
| "JacobiSVD: thin U and V are only available when your matrix has a dynamic number of columns."); |
| if (QRPreconditioner == FullPivHouseholderQRPreconditioner) |
| { |
| eigen_assert(!(m_computeThinU || m_computeThinV) && |
| "JacobiSVD: can't compute thin U or thin V with the FullPivHouseholderQR preconditioner. " |
| "Use the ColPivHouseholderQR preconditioner instead."); |
| } |
| m_diagSize = (std::min)(m_rows, m_cols); |
| m_singularValues.resize(m_diagSize); |
| if(RowsAtCompileTime==Dynamic) |
| m_matrixU.resize(m_rows, m_computeFullU ? m_rows |
| : m_computeThinU ? m_diagSize |
| : 0); |
| if(ColsAtCompileTime==Dynamic) |
| m_matrixV.resize(m_cols, m_computeFullV ? m_cols |
| : m_computeThinV ? m_diagSize |
| : 0); |
| m_workMatrix.resize(m_diagSize, m_diagSize); |
| |
| if(m_cols>m_rows) m_qr_precond_morecols.allocate(*this); |
| if(m_rows>m_cols) m_qr_precond_morerows.allocate(*this); |
| } |
| |
| template<typename MatrixType, int QRPreconditioner> |
| JacobiSVD<MatrixType, QRPreconditioner>& |
| JacobiSVD<MatrixType, QRPreconditioner>::compute(const MatrixType& matrix, unsigned int computationOptions) |
| { |
| using std::abs; |
| allocate(matrix.rows(), matrix.cols(), computationOptions); |
| |
| // currently we stop when we reach precision 2*epsilon as the last bit of precision can require an unreasonable number of iterations, |
| // only worsening the precision of U and V as we accumulate more rotations |
| const RealScalar precision = RealScalar(2) * NumTraits<Scalar>::epsilon(); |
| |
| // limit for very small denormal numbers to be considered zero in order to avoid infinite loops (see bug 286) |
| const RealScalar considerAsZero = RealScalar(2) * std::numeric_limits<RealScalar>::denorm_min(); |
| |
| /*** step 1. The R-SVD step: we use a QR decomposition to reduce to the case of a square matrix */ |
| |
| if(!m_qr_precond_morecols.run(*this, matrix) && !m_qr_precond_morerows.run(*this, matrix)) |
| { |
| m_workMatrix = matrix.block(0,0,m_diagSize,m_diagSize); |
| if(m_computeFullU) m_matrixU.setIdentity(m_rows,m_rows); |
| if(m_computeThinU) m_matrixU.setIdentity(m_rows,m_diagSize); |
| if(m_computeFullV) m_matrixV.setIdentity(m_cols,m_cols); |
| if(m_computeThinV) m_matrixV.setIdentity(m_cols, m_diagSize); |
| } |
| |
| // Scaling factor to reducover/under-flows |
| RealScalar scale = m_workMatrix.cwiseAbs().maxCoeff(); |
| if(scale==RealScalar(0)) scale = RealScalar(1); |
| m_workMatrix /= scale; |
| |
| /*** step 2. The main Jacobi SVD iteration. ***/ |
| |
| bool finished = false; |
| while(!finished) |
| { |
| finished = true; |
| |
| // do a sweep: for all index pairs (p,q), perform SVD of the corresponding 2x2 sub-matrix |
| |
| for(Index p = 1; p < m_diagSize; ++p) |
| { |
| for(Index q = 0; q < p; ++q) |
| { |
| // if this 2x2 sub-matrix is not diagonal already... |
| // notice that this comparison will evaluate to false if any NaN is involved, ensuring that NaN's don't |
| // keep us iterating forever. Similarly, small denormal numbers are considered zero. |
| RealScalar threshold = numext::maxi(considerAsZero, precision * numext::maxi(abs(m_workMatrix.coeff(p,p)), |
| abs(m_workMatrix.coeff(q,q)))); |
| if(numext::maxi(abs(m_workMatrix.coeff(p,q)),abs(m_workMatrix.coeff(q,p))) > threshold) |
| { |
| finished = false; |
| |
| // perform SVD decomposition of 2x2 sub-matrix corresponding to indices p,q to make it diagonal |
| internal::svd_precondition_2x2_block_to_be_real<MatrixType, QRPreconditioner>::run(m_workMatrix, *this, p, q); |
| JacobiRotation<RealScalar> j_left, j_right; |
| internal::real_2x2_jacobi_svd(m_workMatrix, p, q, &j_left, &j_right); |
| |
| // accumulate resulting Jacobi rotations |
| m_workMatrix.applyOnTheLeft(p,q,j_left); |
| if(computeU()) m_matrixU.applyOnTheRight(p,q,j_left.transpose()); |
| |
| m_workMatrix.applyOnTheRight(p,q,j_right); |
| if(computeV()) m_matrixV.applyOnTheRight(p,q,j_right); |
| } |
| } |
| } |
| } |
| |
| /*** step 3. The work matrix is now diagonal, so ensure it's positive so its diagonal entries are the singular values ***/ |
| |
| for(Index i = 0; i < m_diagSize; ++i) |
| { |
| RealScalar a = abs(m_workMatrix.coeff(i,i)); |
| m_singularValues.coeffRef(i) = a; |
| if(computeU() && (a!=RealScalar(0))) m_matrixU.col(i) *= m_workMatrix.coeff(i,i)/a; |
| } |
| |
| m_singularValues *= scale; |
| |
| /*** step 4. Sort singular values in descending order and compute the number of nonzero singular values ***/ |
| |
| m_nonzeroSingularValues = m_diagSize; |
| for(Index i = 0; i < m_diagSize; i++) |
| { |
| Index pos; |
| RealScalar maxRemainingSingularValue = m_singularValues.tail(m_diagSize-i).maxCoeff(&pos); |
| if(maxRemainingSingularValue == RealScalar(0)) |
| { |
| m_nonzeroSingularValues = i; |
| break; |
| } |
| if(pos) |
| { |
| pos += i; |
| std::swap(m_singularValues.coeffRef(i), m_singularValues.coeffRef(pos)); |
| if(computeU()) m_matrixU.col(pos).swap(m_matrixU.col(i)); |
| if(computeV()) m_matrixV.col(pos).swap(m_matrixV.col(i)); |
| } |
| } |
| |
| m_isInitialized = true; |
| return *this; |
| } |
| |
| namespace internal { |
| template<typename _MatrixType, int QRPreconditioner, typename Rhs> |
| struct solve_retval<JacobiSVD<_MatrixType, QRPreconditioner>, Rhs> |
| : solve_retval_base<JacobiSVD<_MatrixType, QRPreconditioner>, Rhs> |
| { |
| typedef JacobiSVD<_MatrixType, QRPreconditioner> JacobiSVDType; |
| EIGEN_MAKE_SOLVE_HELPERS(JacobiSVDType,Rhs) |
| |
| template<typename Dest> void evalTo(Dest& dst) const |
| { |
| dec()._solve_impl(rhs(), dst); |
| } |
| }; |
| } // end namespace internal |
| |
| |
| #ifndef __CUDACC__ |
| /** \svd_module |
| * |
| * \return the singular value decomposition of \c *this computed by two-sided |
| * Jacobi transformations. |
| * |
| * \sa class JacobiSVD |
| */ |
| template<typename Derived> |
| JacobiSVD<typename MatrixBase<Derived>::PlainObject> |
| MatrixBase<Derived>::jacobiSvd(unsigned int computationOptions) const |
| { |
| return JacobiSVD<PlainObject>(*this, computationOptions); |
| } |
| #endif // __CUDACC__ |
| |
| } // end namespace Eigen |
| |
| #endif // EIGEN_JACOBISVD_H |
