// This file is part of Eigen, a lightweight C++ template library // for linear algebra. // // Copyright (C) 2009 Hauke Heibel // // 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_UMEYAMA_H #define EIGEN_UMEYAMA_H // This file requires the user to include // * Eigen/Core // * Eigen/LU // * Eigen/SVD // * Eigen/Array // IWYU pragma: private #include "./InternalHeaderCheck.h" namespace Eigen { // These helpers are required since it allows to use mixed types as parameters // for the Umeyama. The problem with mixed parameters is that the return type // cannot trivially be deduced when float and double types are mixed. namespace internal { // Compile time return type deduction for different MatrixBase types. // Different means here different alignment and parameters but the same underlying // real scalar type. template struct umeyama_transform_matrix_type { enum { MinRowsAtCompileTime = internal::min_size_prefer_dynamic(MatrixType::RowsAtCompileTime, OtherMatrixType::RowsAtCompileTime), // When possible we want to choose some small fixed size value since the result // is likely to fit on the stack. So here, min_size_prefer_dynamic is not what we want. HomogeneousDimension = int(MinRowsAtCompileTime) == Dynamic ? Dynamic : int(MinRowsAtCompileTime) + 1 }; typedef Matrix::Scalar, HomogeneousDimension, HomogeneousDimension, AutoAlign | (traits::Flags & RowMajorBit ? RowMajor : ColMajor), HomogeneousDimension, HomogeneousDimension> type; }; } // namespace internal /** * \geometry_module \ingroup Geometry_Module * * \brief Returns the transformation between two point sets. * * The algorithm is based on: * "Least-squares estimation of transformation parameters between two point patterns", * Shinji Umeyama, PAMI 1991, DOI: 10.1109/34.88573 * * It estimates parameters \f$ c, \mathbf{R}, \f$ and \f$ \mathbf{t} \f$ such that * \f{align*} * \frac{1}{n} \sum_{i=1}^n \vert\vert y_i - (c\mathbf{R}x_i + \mathbf{t}) \vert\vert_2^2 * \f} * is minimized. * * The algorithm is based on the analysis of the covariance matrix * \f$ \Sigma_{\mathbf{x}\mathbf{y}} \in \mathbb{R}^{d \times d} \f$ * of the input point sets \f$ \mathbf{x} \f$ and \f$ \mathbf{y} \f$ where * \f$d\f$ is corresponding to the dimension (which is typically small). * The analysis is involving the SVD having a complexity of \f$O(d^3)\f$ * though the actual computational effort lies in the covariance * matrix computation which has an asymptotic lower bound of \f$O(dm)\f$ when * the input point sets have dimension \f$d \times m\f$. * * Currently the method is working only for floating point matrices. * * \todo Should the return type of umeyama() become a Transform? * * \param src Source points \f$ \mathbf{x} = \left( x_1, \hdots, x_n \right) \f$. * \param dst Destination points \f$ \mathbf{y} = \left( y_1, \hdots, y_n \right) \f$. * \param with_scaling Sets \f$ c=1 \f$ when false is passed. * \return The homogeneous transformation * \f{align*} * T = \begin{bmatrix} c\mathbf{R} & \mathbf{t} \\ \mathbf{0} & 1 \end{bmatrix} * \f} * minimizing the residual above. This transformation is always returned as an * Eigen::Matrix. */ template typename internal::umeyama_transform_matrix_type::type umeyama( const MatrixBase& src, const MatrixBase& dst, bool with_scaling = true) { typedef typename internal::umeyama_transform_matrix_type::type TransformationMatrixType; typedef typename internal::traits::Scalar Scalar; typedef typename NumTraits::Real RealScalar; EIGEN_STATIC_ASSERT(!NumTraits::IsComplex, NUMERIC_TYPE_MUST_BE_REAL) EIGEN_STATIC_ASSERT( (internal::is_same::Scalar>::value), YOU_MIXED_DIFFERENT_NUMERIC_TYPES__YOU_NEED_TO_USE_THE_CAST_METHOD_OF_MATRIXBASE_TO_CAST_NUMERIC_TYPES_EXPLICITLY) enum { Dimension = internal::min_size_prefer_dynamic(Derived::RowsAtCompileTime, OtherDerived::RowsAtCompileTime) }; typedef Matrix VectorType; typedef Matrix MatrixType; typedef typename internal::plain_matrix_type_row_major::type RowMajorMatrixType; const Index m = src.rows(); // dimension const Index n = src.cols(); // number of measurements // required for demeaning ... const RealScalar one_over_n = RealScalar(1) / static_cast(n); // computation of mean const VectorType src_mean = src.rowwise().sum() * one_over_n; const VectorType dst_mean = dst.rowwise().sum() * one_over_n; // demeaning of src and dst points const RowMajorMatrixType src_demean = src.colwise() - src_mean; const RowMajorMatrixType dst_demean = dst.colwise() - dst_mean; // Eq. (38) const MatrixType sigma = one_over_n * dst_demean * src_demean.transpose(); JacobiSVD svd(sigma); // Initialize the resulting transformation with an identity matrix... TransformationMatrixType Rt = TransformationMatrixType::Identity(m + 1, m + 1); // Eq. (39) VectorType S = VectorType::Ones(m); if (svd.matrixU().determinant() * svd.matrixV().determinant() < 0) { Index tmp = m - 1; S(tmp) = -1; } // Eq. (40) and (43) Rt.block(0, 0, m, m).noalias() = svd.matrixU() * S.asDiagonal() * svd.matrixV().transpose(); if (with_scaling) { // Eq. (36)-(37) const Scalar src_var = src_demean.rowwise().squaredNorm().sum() * one_over_n; // Eq. (42) const Scalar c = Scalar(1) / src_var * svd.singularValues().dot(S); // Eq. (41) Rt.col(m).head(m) = dst_mean; Rt.col(m).head(m).noalias() -= c * Rt.topLeftCorner(m, m) * src_mean; Rt.block(0, 0, m, m) *= c; } else { Rt.col(m).head(m) = dst_mean; Rt.col(m).head(m).noalias() -= Rt.topLeftCorner(m, m) * src_mean; } return Rt; } } // end namespace Eigen #endif // EIGEN_UMEYAMA_H