unsupported/Eigen/NNLS - eigen - Git at Google

 /* Non-Negagive Least Squares Algorithm for Eigen.
  *
  * Copyright (C) 2021 Essex Edwards, <essex.edwards@gmail.com>
  * Copyright (C) 2013 Hannes Matuschek, hannes.matuschek at uni-potsdam.de
  *
  * 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/.
  */

 /** \defgroup nnls Non-Negative Least Squares (NNLS) Module
  * This module provides a single class @c Eigen::NNLS implementing the NNLS algorithm.
  * The algorithm is described in "SOLVING LEAST SQUARES PROBLEMS", by Charles L. Lawson and
  * Richard J. Hanson, Prentice-Hall, 1974 and solves optimization problems of the form
  *
  * \f[ \min \left\Vert Ax-b\right\Vert_2^2\quad s.t.\, x\ge 0\,.\f]
  *
  * The algorithm solves the constrained least-squares problem above by iteratively improving
  * an estimate of which constraints are active (elements of \f$x\f$ equal to zero)
  * and which constraints are inactive (elements of \f$x\f$ greater than zero).
  * Each iteration, an unconstrained linear least-squares problem solves for the
  * components of \f$x\f$ in the (estimated) inactive set and the sets are updated.
  * The unconstrained problem minimizes \f$\left\Vert A^Nx^N-b\right\Vert_2^2\f$,
  * where \f$A^N\f$ is a matrix formed by selecting all columns of A which are
  * in the inactive set \f$N\f$.
  *
  */

 #ifndef EIGEN_NNLS_H
 #define EIGEN_NNLS_H

 #include "../../Eigen/Core"
 #include "../../Eigen/QR"

 #include <limits>

 namespace Eigen {

 /** \ingroup nnls
  * \class NNLS
  * \brief Implementation of the Non-Negative Least Squares (NNLS) algorithm.
  * \tparam MatrixType The type of the system matrix \f$A\f$.
  *
  * This class implements the NNLS algorithm as described in "SOLVING LEAST SQUARES PROBLEMS",
  * Charles L. Lawson and Richard J. Hanson, Prentice-Hall, 1974. This algorithm solves a least
  * squares problem iteratively and ensures that the solution is non-negative. I.e.
  *
  * \f[ \min \left\Vert Ax-b\right\Vert_2^2\quad s.t.\, x\ge 0 \f]
  *
  * The algorithm solves the constrained least-squares problem above by iteratively improving
  * an estimate of which constraints are active (elements of \f$x\f$ equal to zero)
  * and which constraints are inactive (elements of \f$x\f$ greater than zero).
  * Each iteration, an unconstrained linear least-squares problem solves for the
  * components of \f$x\f$ in the (estimated) inactive set and the sets are updated.
  * The unconstrained problem minimizes \f$\left\Vert A^Nx^N-b\right\Vert_2^2\f$,
  * where \f$A^N\f$ is a matrix formed by selecting all columns of A which are
  * in the inactive set \f$N\f$.
  *
  * See <a href="https://en.wikipedia.org/wiki/Non-negative_least_squares">the
  * wikipedia page on non-negative least squares</a> for more background information.
  *
  * \note Please note that it is possible to construct an NNLS problem for which the
  *       algorithm does not converge. In practice these cases are extremely rare.
  */
 template <class MatrixType_>
 class NNLS {
  public:
   typedef MatrixType_ MatrixType;

   enum {
     RowsAtCompileTime = MatrixType::RowsAtCompileTime,
     ColsAtCompileTime = MatrixType::ColsAtCompileTime,
     Options = MatrixType::Options,
     MaxRowsAtCompileTime = MatrixType::MaxRowsAtCompileTime,
     MaxColsAtCompileTime = MatrixType::MaxColsAtCompileTime
   };

   typedef typename MatrixType::Scalar Scalar;
   typedef typename MatrixType::RealScalar RealScalar;
   typedef typename MatrixType::Index Index;

   /** Type of a row vector of the system matrix \f$A\f$. */
   typedef Matrix<Scalar, ColsAtCompileTime, 1> SolutionVectorType;
   /** Type of a column vector of the system matrix \f$A\f$. */
   typedef Matrix<Scalar, RowsAtCompileTime, 1> RhsVectorType;
   typedef Matrix<Index, ColsAtCompileTime, 1> IndicesType;

   /** */
   NNLS();

   /** \brief Constructs a NNLS sovler and initializes it with the given system matrix @c A.
    * \param A Specifies the system matrix.
    * \param max_iter Specifies the maximum number of iterations to solve the system.
    * \param tol Specifies the precision of the optimum.
    *        This is an absolute tolerance on the gradient of the Lagrangian, \f$A^T(Ax-b)-\lambda\f$
    *        (with Lagrange multipliers \f$\lambda\f$).
    */
   NNLS(const MatrixType &A, Index max_iter = -1, Scalar tol = NumTraits<Scalar>::dummy_precision());

   /** Initializes the solver with the matrix \a A for further solving NNLS problems.
    *
    * This function mostly initializes/computes the preconditioner. In the future
    * we might, for instance, implement column reordering for faster matrix vector products.
    */
   template <typename MatrixDerived>
   NNLS<MatrixType> &compute(const EigenBase<MatrixDerived> &A);

   /** \brief Solves the NNLS problem.
    *
    * The dimension of @c b must be equal to the number of rows of @c A, given to the constructor.
    *
    * \returns The approximate solution vector \f$ x \f$. Use info() to determine if the solve was a success or not.
    * \sa info()
    */
   const SolutionVectorType &solve(const RhsVectorType &b);

   /** \brief Returns the solution if a problem was solved.
    * If not, an uninitialized vector may be returned. */
   const SolutionVectorType &x() const { return x_; }

   /** \returns the tolerance threshold used by the stopping criteria.
    * \sa setTolerance()
    */
   Scalar tolerance() const { return tolerance_; }

   /** Sets the tolerance threshold used by the stopping criteria.
    *
    * This is an absolute tolerance on the gradient of the Lagrangian, \f$A^T(Ax-b)-\lambda\f$
    * (with Lagrange multipliers \f$\lambda\f$).
    */
   NNLS<MatrixType> &setTolerance(const Scalar &tolerance) {
     tolerance_ = tolerance;
     return *this;
   }

   /** \returns the max number of iterations.
    * It is either the value set by setMaxIterations or, by default, twice the number of columns of the matrix.
    */
   Index maxIterations() const { return max_iter_ < 0 ? 2 * A_.cols() : max_iter_; }

   /** Sets the max number of iterations.
    * Default is twice the number of columns of the matrix.
    * The algorithm requires at least k iterations to produce a solution vector with k non-zero entries.
    */
   NNLS<MatrixType> &setMaxIterations(Index maxIters) {
     max_iter_ = maxIters;
     return *this;
   }

   /** \returns the number of iterations (least-squares solves) performed during the last solve */
   Index iterations() const { return iterations_; }

   /** \returns Success if the iterations converged, and an error values otherwise. */
   ComputationInfo info() const { return info_; }

  private:
   /** \internal Adds the given index @c idx to the inactive set N and updates the QR decomposition of \f$A^N\f$. */
   void moveToInactiveSet_(Index idx);

   /** \internal Removes the given index idx from the inactive set N and updates the QR decomposition of \f$A^N\f$. */
   void moveToActiveSet_(Index idx);

   /** \internal Solves the least-squares problem \f$\left\Vert y-A^Nx\right\Vert_2^2\f$. */
   void solveInactiveSet_(const RhsVectorType &b);

  private:
   typedef Matrix<Scalar, ColsAtCompileTime, ColsAtCompileTime> MatrixAtAType;

   /** \internal Holds the maximum number of iterations for the NNLS algorithm.
    *  @c -1 means to use the default value. */
   Index max_iter_;
   /** \internal Holds the number of iterations. */
   Index iterations_;
   /** \internal Holds success/fail of the last solve. */
   ComputationInfo info_;
   /** \internal Size of the inactive set. */
   Index numInactive_;
   /** \internal Accuracy of the algorithm w.r.t the optimality of the solution (gradient). */
   Scalar tolerance_;
   /** \internal The system matrix, a copy of the one given to the constructor. */
   MatrixType A_;
   /** \internal Precomputed product \f$A^TA\f$. */
   MatrixAtAType AtA_;
   /** \internal Will hold the solution. */
   SolutionVectorType x_;
   /** \internal Will hold the current gradient.\f$A^Tb - A^TAx\f$ */
   SolutionVectorType gradient_;
   /** \internal Will hold the partial solution. */
   SolutionVectorType y_;
   /** \internal Precomputed product \f$A^Tb\f$. */
   SolutionVectorType Atb_;
   /** \internal Holds the current permutation partitioning the active and inactive sets.
    * The first @c numInactive_ elements form the inactive set and the rest the active set. */
   IndicesType index_sets_;
   /** \internal QR decomposition to solve the (inactive) sub system (together with @c qrCoeffs_). */
   MatrixType QR_;
   /** \internal QR decomposition to solve the (inactive) sub system (together with @c QR_). */
   SolutionVectorType qrCoeffs_;
   /** \internal Some workspace for QR decomposition. */
   SolutionVectorType tempSolutionVector_;
   RhsVectorType tempRhsVector_;
 };

 /* ********************************************************************************************
  * Implementation
  * ******************************************************************************************** */

 template <typename MatrixType>
 NNLS<MatrixType>::NNLS()
     : max_iter_(-1),
       iterations_(0),
       info_(ComputationInfo::InvalidInput),
       numInactive_(0),
       tolerance_(NumTraits<Scalar>::dummy_precision()) {}

 template <typename MatrixType>
 NNLS<MatrixType>::NNLS(const MatrixType &A, Index max_iter, Scalar tol) : max_iter_(max_iter), tolerance_(tol) {
   compute(A);
 }

 template <typename MatrixType>
 template <typename MatrixDerived>
 NNLS<MatrixType> &NNLS<MatrixType>::compute(const EigenBase<MatrixDerived> &A) {
   // Ensure Scalar type is real. The non-negativity constraint doesn't obviously extend to complex numbers.
   EIGEN_STATIC_ASSERT(!NumTraits<Scalar>::IsComplex, NUMERIC_TYPE_MUST_BE_REAL);

   // max_iter_: unchanged
   iterations_ = 0;
   info_ = ComputationInfo::Success;
   numInactive_ = 0;
   // tolerance: unchanged
   A_ = A.derived();
   AtA_.noalias() = A_.transpose() * A_;
   x_.resize(A_.cols());
   gradient_.resize(A_.cols());
   y_.resize(A_.cols());
   Atb_.resize(A_.cols());
   index_sets_.resize(A_.cols());
   QR_.resize(A_.rows(), A_.cols());
   qrCoeffs_.resize(A_.cols());
   tempSolutionVector_.resize(A_.cols());
   tempRhsVector_.resize(A_.rows());

   return *this;
 }

 template <typename MatrixType>
 const typename NNLS<MatrixType>::SolutionVectorType &NNLS<MatrixType>::solve(const RhsVectorType &b) {
   // Initialize solver
   iterations_ = 0;
   info_ = ComputationInfo::NumericalIssue;
   x_.setZero();

   index_sets_ = IndicesType::LinSpaced(A_.cols(), 0, A_.cols() - 1);  // Identity permutation.
   numInactive_ = 0;

   // Precompute A^T*b
   Atb_.noalias() = A_.transpose() * b;

   const Index maxIterations = this->maxIterations();

   // OUTER LOOP
   while (true) {
     // Early exit if all variables are inactive, which breaks 'maxCoeff' below.
     if (A_.cols() == numInactive_) {
       info_ = ComputationInfo::Success;
       return x_;
     }

     // Find the maximum element of the gradient in the active set.
     // If it is small or negative, then we have converged.
     // Else, we move that variable to the inactive set.
     gradient_.noalias() = Atb_ - AtA_ * x_;

     const Index numActive = A_.cols() - numInactive_;
     Index argmaxGradient = -1;
     const Scalar maxGradient = gradient_(index_sets_.tail(numActive)).maxCoeff(&argmaxGradient);
     argmaxGradient += numInactive_;  // beacause tail() skipped the first numInactive_ elements

     if (maxGradient < tolerance_) {
       info_ = ComputationInfo::Success;
       return x_;
     }

     moveToInactiveSet_(argmaxGradient);

     // INNER LOOP
     while (true) {
       // Check if max. number of iterations is reached
       if (iterations_ >= maxIterations) {
         info_ = ComputationInfo::NoConvergence;
         return x_;
       }

       // Solve least-squares problem in inactive set only,
       // this step is rather trivial as moveToInactiveSet_ & moveToActiveSet_
       // updates the QR decomposition of inactive columns A^N.
       // solveInactiveSet_ puts the solution in y_
       solveInactiveSet_(b);
       ++iterations_;  // The solve is expensive, so that is what we count as an iteration.

       // Check feasability...
       bool feasible = true;
       Scalar alpha = NumTraits<Scalar>::highest();
       Index infeasibleIdx = -1;  // Which variable became infeasible first.
       for (Index i = 0; i < numInactive_; i++) {
         Index idx = index_sets_[i];
         if (y_(idx) < 0) {
           // t should always be in [0,1].
           Scalar t = -x_(idx) / (y_(idx) - x_(idx));
           if (alpha > t) {
             alpha = t;
             infeasibleIdx = i;
             feasible = false;
           }
         }
       }
       eigen_assert(feasible || 0 <= infeasibleIdx);

       // If solution is feasible, exit to outer loop
       if (feasible) {
         x_ = y_;
         break;
       }

       // Infeasible solution -> interpolate to feasible one
       for (Index i = 0; i < numInactive_; i++) {
         Index idx = index_sets_[i];
         x_(idx) += alpha * (y_(idx) - x_(idx));
       }

       // Remove these indices from the inactive set and update QR decomposition
       moveToActiveSet_(infeasibleIdx);
     }
   }
 }

 template <typename MatrixType>
 void NNLS<MatrixType>::moveToInactiveSet_(Index idx) {
   // Update permutation matrix:
   std::swap(index_sets_(idx), index_sets_(numInactive_));
   numInactive_++;

   // Perform rank-1 update of the QR decomposition stored in QR_ & qrCoeff_
   internal::householder_qr_inplace_update(QR_, qrCoeffs_, A_.col(index_sets_(numInactive_ - 1)), numInactive_ - 1,
                                           tempSolutionVector_.data());
 }

 template <typename MatrixType>
 void NNLS<MatrixType>::moveToActiveSet_(Index idx) {
   // swap index with last inactive one & reduce number of inactive columns
   std::swap(index_sets_(idx), index_sets_(numInactive_ - 1));
   numInactive_--;
   // Update QR decomposition starting from the removed index up to the end [idx, ..., numInactive_]
   for (Index i = idx; i < numInactive_; i++) {
     Index col = index_sets_(i);
     internal::householder_qr_inplace_update(QR_, qrCoeffs_, A_.col(col), i, tempSolutionVector_.data());
   }
 }

 template <typename MatrixType>
 void NNLS<MatrixType>::solveInactiveSet_(const RhsVectorType &b) {
   eigen_assert(numInactive_ > 0);

   tempRhsVector_ = b;

   // tmpRHS(0:numInactive_-1) := Q'*b
   // tmpRHS(numInactive_:end) := useless stuff we would rather not compute at all.
   tempRhsVector_.applyOnTheLeft(
       householderSequence(QR_.leftCols(numInactive_), qrCoeffs_.head(numInactive_)).transpose());

   // tempSol(0:numInactive_-1) := inv(R) * Q' * b
   //  = the least-squares solution for the inactive variables.
   tempSolutionVector_.head(numInactive_) =            //
       QR_.topLeftCorner(numInactive_, numInactive_)   //
           .template triangularView<Upper>()           //
           .solve(tempRhsVector_.head(numInactive_));  //

   // tempSol(numInactive_:end) := 0 = the value for the constrained variables.
   tempSolutionVector_.tail(y_.size() - numInactive_).setZero();

   // Back permute into original column order of A
   y_.noalias() = index_sets_.asPermutation() * tempSolutionVector_.head(y_.size());
 }

 }  // namespace Eigen

 #endif  // EIGEN_NNLS_H
	/* Non-Negagive Least Squares Algorithm for Eigen.
	*
	* Copyright (C) 2021 Essex Edwards, <essex.edwards@gmail.com>
	* Copyright (C) 2013 Hannes Matuschek, hannes.matuschek at uni-potsdam.de
	*
	* 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/.
	*/

	/** \defgroup nnls Non-Negative Least Squares (NNLS) Module
	* This module provides a single class @c Eigen::NNLS implementing the NNLS algorithm.
	* The algorithm is described in "SOLVING LEAST SQUARES PROBLEMS", by Charles L. Lawson and
	* Richard J. Hanson, Prentice-Hall, 1974 and solves optimization problems of the form
	*
	* \f[ \min \left\Vert Ax-b\right\Vert_2^2\quad s.t.\, x\ge 0\,.\f]
	*
	* The algorithm solves the constrained least-squares problem above by iteratively improving
	* an estimate of which constraints are active (elements of \f$x\f$ equal to zero)
	* and which constraints are inactive (elements of \f$x\f$ greater than zero).
	* Each iteration, an unconstrained linear least-squares problem solves for the
	* components of \f$x\f$ in the (estimated) inactive set and the sets are updated.
	* The unconstrained problem minimizes \f$\left\Vert A^Nx^N-b\right\Vert_2^2\f$,
	* where \f$A^N\f$ is a matrix formed by selecting all columns of A which are
	* in the inactive set \f$N\f$.
	*
	*/

	#ifndef EIGEN_NNLS_H
	#define EIGEN_NNLS_H

	#include "../../Eigen/Core"
	#include "../../Eigen/QR"

	#include <limits>

	namespace Eigen {

	/** \ingroup nnls
	* \class NNLS
	* \brief Implementation of the Non-Negative Least Squares (NNLS) algorithm.
	* \tparam MatrixType The type of the system matrix \f$A\f$.
	*
	* This class implements the NNLS algorithm as described in "SOLVING LEAST SQUARES PROBLEMS",
	* Charles L. Lawson and Richard J. Hanson, Prentice-Hall, 1974. This algorithm solves a least
	* squares problem iteratively and ensures that the solution is non-negative. I.e.
	*
	* \f[ \min \left\Vert Ax-b\right\Vert_2^2\quad s.t.\, x\ge 0 \f]
	*
	* The algorithm solves the constrained least-squares problem above by iteratively improving
	* an estimate of which constraints are active (elements of \f$x\f$ equal to zero)
	* and which constraints are inactive (elements of \f$x\f$ greater than zero).
	* Each iteration, an unconstrained linear least-squares problem solves for the
	* components of \f$x\f$ in the (estimated) inactive set and the sets are updated.
	* The unconstrained problem minimizes \f$\left\Vert A^Nx^N-b\right\Vert_2^2\f$,
	* where \f$A^N\f$ is a matrix formed by selecting all columns of A which are
	* in the inactive set \f$N\f$.
	*
	* See <a href="https://en.wikipedia.org/wiki/Non-negative_least_squares">the
	* wikipedia page on non-negative least squares</a> for more background information.
	*
	* \note Please note that it is possible to construct an NNLS problem for which the
	* algorithm does not converge. In practice these cases are extremely rare.
	*/
	template <class MatrixType_>
	class NNLS {
	public:
	typedef MatrixType_ MatrixType;

	enum {
	RowsAtCompileTime = MatrixType::RowsAtCompileTime,
	ColsAtCompileTime = MatrixType::ColsAtCompileTime,
	Options = MatrixType::Options,
	MaxRowsAtCompileTime = MatrixType::MaxRowsAtCompileTime,
	MaxColsAtCompileTime = MatrixType::MaxColsAtCompileTime
	};

	typedef typename MatrixType::Scalar Scalar;
	typedef typename MatrixType::RealScalar RealScalar;
	typedef typename MatrixType::Index Index;

	/** Type of a row vector of the system matrix \f$A\f$. */
	typedef Matrix<Scalar, ColsAtCompileTime, 1> SolutionVectorType;
	/** Type of a column vector of the system matrix \f$A\f$. */
	typedef Matrix<Scalar, RowsAtCompileTime, 1> RhsVectorType;
	typedef Matrix<Index, ColsAtCompileTime, 1> IndicesType;

	/** */
	NNLS();

	/** \brief Constructs a NNLS sovler and initializes it with the given system matrix @c A.
	* \param A Specifies the system matrix.
	* \param max_iter Specifies the maximum number of iterations to solve the system.
	* \param tol Specifies the precision of the optimum.
	* This is an absolute tolerance on the gradient of the Lagrangian, \f$A^T(Ax-b)-\lambda\f$
	* (with Lagrange multipliers \f$\lambda\f$).
	*/
	NNLS(const MatrixType &A, Index max_iter = -1, Scalar tol = NumTraits<Scalar>::dummy_precision());

	/** Initializes the solver with the matrix \a A for further solving NNLS problems.
	*
	* This function mostly initializes/computes the preconditioner. In the future
	* we might, for instance, implement column reordering for faster matrix vector products.
	*/
	template <typename MatrixDerived>
	NNLS<MatrixType> &compute(const EigenBase<MatrixDerived> &A);

	/** \brief Solves the NNLS problem.
	*
	* The dimension of @c b must be equal to the number of rows of @c A, given to the constructor.
	*
	* \returns The approximate solution vector \f$ x \f$. Use info() to determine if the solve was a success or not.
	* \sa info()
	*/
	const SolutionVectorType &solve(const RhsVectorType &b);

	/** \brief Returns the solution if a problem was solved.
	* If not, an uninitialized vector may be returned. */
	const SolutionVectorType &x() const { return x_; }

	/** \returns the tolerance threshold used by the stopping criteria.
	* \sa setTolerance()
	*/
	Scalar tolerance() const { return tolerance_; }

	/** Sets the tolerance threshold used by the stopping criteria.
	*
	* This is an absolute tolerance on the gradient of the Lagrangian, \f$A^T(Ax-b)-\lambda\f$
	* (with Lagrange multipliers \f$\lambda\f$).
	*/
	NNLS<MatrixType> &setTolerance(const Scalar &tolerance) {
	tolerance_ = tolerance;
	return *this;
	}

	/** \returns the max number of iterations.
	* It is either the value set by setMaxIterations or, by default, twice the number of columns of the matrix.
	*/
	Index maxIterations() const { return max_iter_ < 0 ? 2 * A_.cols() : max_iter_; }

	/** Sets the max number of iterations.
	* Default is twice the number of columns of the matrix.
	* The algorithm requires at least k iterations to produce a solution vector with k non-zero entries.
	*/
	NNLS<MatrixType> &setMaxIterations(Index maxIters) {
	max_iter_ = maxIters;
	return *this;
	}

	/** \returns the number of iterations (least-squares solves) performed during the last solve */
	Index iterations() const { return iterations_; }

	/** \returns Success if the iterations converged, and an error values otherwise. */
	ComputationInfo info() const { return info_; }

	private:
	/** \internal Adds the given index @c idx to the inactive set N and updates the QR decomposition of \f$A^N\f$. */
	void moveToInactiveSet_(Index idx);

	/** \internal Removes the given index idx from the inactive set N and updates the QR decomposition of \f$A^N\f$. */
	void moveToActiveSet_(Index idx);

	/** \internal Solves the least-squares problem \f$\left\Vert y-A^Nx\right\Vert_2^2\f$. */
	void solveInactiveSet_(const RhsVectorType &b);

	private:
	typedef Matrix<Scalar, ColsAtCompileTime, ColsAtCompileTime> MatrixAtAType;

	/** \internal Holds the maximum number of iterations for the NNLS algorithm.
	* @c -1 means to use the default value. */
	Index max_iter_;
	/** \internal Holds the number of iterations. */
	Index iterations_;
	/** \internal Holds success/fail of the last solve. */
	ComputationInfo info_;
	/** \internal Size of the inactive set. */
	Index numInactive_;
	/** \internal Accuracy of the algorithm w.r.t the optimality of the solution (gradient). */
	Scalar tolerance_;
	/** \internal The system matrix, a copy of the one given to the constructor. */
	MatrixType A_;
	/** \internal Precomputed product \f$A^TA\f$. */
	MatrixAtAType AtA_;
	/** \internal Will hold the solution. */
	SolutionVectorType x_;
	/** \internal Will hold the current gradient.\f$A^Tb - A^TAx\f$ */
	SolutionVectorType gradient_;
	/** \internal Will hold the partial solution. */
	SolutionVectorType y_;
	/** \internal Precomputed product \f$A^Tb\f$. */
	SolutionVectorType Atb_;
	/** \internal Holds the current permutation partitioning the active and inactive sets.
	* The first @c numInactive_ elements form the inactive set and the rest the active set. */
	IndicesType index_sets_;
	/** \internal QR decomposition to solve the (inactive) sub system (together with @c qrCoeffs_). */
	MatrixType QR_;
	/** \internal QR decomposition to solve the (inactive) sub system (together with @c QR_). */
	SolutionVectorType qrCoeffs_;
	/** \internal Some workspace for QR decomposition. */
	SolutionVectorType tempSolutionVector_;
	RhsVectorType tempRhsVector_;
	};

	/* ********************************************************************************************
	* Implementation
	* ******************************************************************************************** */

	template <typename MatrixType>
	NNLS<MatrixType>::NNLS()
	: max_iter_(-1),
	iterations_(0),
	info_(ComputationInfo::InvalidInput),
	numInactive_(0),
	tolerance_(NumTraits<Scalar>::dummy_precision()) {}

	template <typename MatrixType>
	NNLS<MatrixType>::NNLS(const MatrixType &A, Index max_iter, Scalar tol) : max_iter_(max_iter), tolerance_(tol) {
	compute(A);
	}

	template <typename MatrixType>
	template <typename MatrixDerived>
	NNLS<MatrixType> &NNLS<MatrixType>::compute(const EigenBase<MatrixDerived> &A) {
	// Ensure Scalar type is real. The non-negativity constraint doesn't obviously extend to complex numbers.
	EIGEN_STATIC_ASSERT(!NumTraits<Scalar>::IsComplex, NUMERIC_TYPE_MUST_BE_REAL);

	// max_iter_: unchanged
	iterations_ = 0;
	info_ = ComputationInfo::Success;
	numInactive_ = 0;
	// tolerance: unchanged
	A_ = A.derived();
	AtA_.noalias() = A_.transpose() * A_;
	x_.resize(A_.cols());
	gradient_.resize(A_.cols());
	y_.resize(A_.cols());
	Atb_.resize(A_.cols());
	index_sets_.resize(A_.cols());
	QR_.resize(A_.rows(), A_.cols());
	qrCoeffs_.resize(A_.cols());
	tempSolutionVector_.resize(A_.cols());
	tempRhsVector_.resize(A_.rows());

	return *this;
	}

	template <typename MatrixType>
	const typename NNLS<MatrixType>::SolutionVectorType &NNLS<MatrixType>::solve(const RhsVectorType &b) {
	// Initialize solver
	iterations_ = 0;
	info_ = ComputationInfo::NumericalIssue;
	x_.setZero();

	index_sets_ = IndicesType::LinSpaced(A_.cols(), 0, A_.cols() - 1); // Identity permutation.
	numInactive_ = 0;

	// Precompute A^T*b
	Atb_.noalias() = A_.transpose() * b;

	const Index maxIterations = this->maxIterations();

	// OUTER LOOP
	while (true) {
	// Early exit if all variables are inactive, which breaks 'maxCoeff' below.
	if (A_.cols() == numInactive_) {
	info_ = ComputationInfo::Success;
	return x_;
	}

	// Find the maximum element of the gradient in the active set.
	// If it is small or negative, then we have converged.
	// Else, we move that variable to the inactive set.
	gradient_.noalias() = Atb_ - AtA_ * x_;

	const Index numActive = A_.cols() - numInactive_;
	Index argmaxGradient = -1;
	const Scalar maxGradient = gradient_(index_sets_.tail(numActive)).maxCoeff(&argmaxGradient);
	argmaxGradient += numInactive_; // beacause tail() skipped the first numInactive_ elements

	if (maxGradient < tolerance_) {
	info_ = ComputationInfo::Success;
	return x_;
	}

	moveToInactiveSet_(argmaxGradient);

	// INNER LOOP
	while (true) {
	// Check if max. number of iterations is reached
	if (iterations_ >= maxIterations) {
	info_ = ComputationInfo::NoConvergence;
	return x_;
	}

	// Solve least-squares problem in inactive set only,
	// this step is rather trivial as moveToInactiveSet_ & moveToActiveSet_
	// updates the QR decomposition of inactive columns A^N.
	// solveInactiveSet_ puts the solution in y_
	solveInactiveSet_(b);
	++iterations_; // The solve is expensive, so that is what we count as an iteration.

	// Check feasability...
	bool feasible = true;
	Scalar alpha = NumTraits<Scalar>::highest();
	Index infeasibleIdx = -1; // Which variable became infeasible first.
	for (Index i = 0; i < numInactive_; i++) {
	Index idx = index_sets_[i];
	if (y_(idx) < 0) {
	// t should always be in [0,1].
	Scalar t = -x_(idx) / (y_(idx) - x_(idx));
	if (alpha > t) {
	alpha = t;
	infeasibleIdx = i;
	feasible = false;
	}
	}
	}
	eigen_assert(feasible \|\| 0 <= infeasibleIdx);

	// If solution is feasible, exit to outer loop
	if (feasible) {
	x_ = y_;
	break;
	}

	// Infeasible solution -> interpolate to feasible one
	for (Index i = 0; i < numInactive_; i++) {
	Index idx = index_sets_[i];
	x_(idx) += alpha * (y_(idx) - x_(idx));
	}

	// Remove these indices from the inactive set and update QR decomposition
	moveToActiveSet_(infeasibleIdx);
	}
	}
	}

	template <typename MatrixType>
	void NNLS<MatrixType>::moveToInactiveSet_(Index idx) {
	// Update permutation matrix:
	std::swap(index_sets_(idx), index_sets_(numInactive_));
	numInactive_++;

	// Perform rank-1 update of the QR decomposition stored in QR_ & qrCoeff_
	internal::householder_qr_inplace_update(QR_, qrCoeffs_, A_.col(index_sets_(numInactive_ - 1)), numInactive_ - 1,
	tempSolutionVector_.data());
	}

	template <typename MatrixType>
	void NNLS<MatrixType>::moveToActiveSet_(Index idx) {
	// swap index with last inactive one & reduce number of inactive columns
	std::swap(index_sets_(idx), index_sets_(numInactive_ - 1));
	numInactive_--;
	// Update QR decomposition starting from the removed index up to the end [idx, ..., numInactive_]
	for (Index i = idx; i < numInactive_; i++) {
	Index col = index_sets_(i);
	internal::householder_qr_inplace_update(QR_, qrCoeffs_, A_.col(col), i, tempSolutionVector_.data());
	}
	}

	template <typename MatrixType>
	void NNLS<MatrixType>::solveInactiveSet_(const RhsVectorType &b) {
	eigen_assert(numInactive_ > 0);

	tempRhsVector_ = b;

	// tmpRHS(0:numInactive_-1) := Q'*b
	// tmpRHS(numInactive_:end) := useless stuff we would rather not compute at all.
	tempRhsVector_.applyOnTheLeft(
	householderSequence(QR_.leftCols(numInactive_), qrCoeffs_.head(numInactive_)).transpose());

	// tempSol(0:numInactive_-1) := inv(R) * Q' * b
	// = the least-squares solution for the inactive variables.
	tempSolutionVector_.head(numInactive_) = //
	QR_.topLeftCorner(numInactive_, numInactive_) //
	.template triangularView<Upper>() //
	.solve(tempRhsVector_.head(numInactive_)); //

	// tempSol(numInactive_:end) := 0 = the value for the constrained variables.
	tempSolutionVector_.tail(y_.size() - numInactive_).setZero();

	// Back permute into original column order of A
	y_.noalias() = index_sets_.asPermutation() * tempSolutionVector_.head(y_.size());
	}

	} // namespace Eigen

	#endif // EIGEN_NNLS_H