222 lines
8.9 KiB
C++
222 lines
8.9 KiB
C++
/* ----------------------------------------------------------------------------
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* GTSAM Copyright 2010, Georgia Tech Research Corporation,
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* Atlanta, Georgia 30332-0415
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* All Rights Reserved
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* Authors: Frank Dellaert, et al. (see THANKS for the full author list)
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* See LICENSE for the license information
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* -------------------------------------------------------------------------- */
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/**
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* @file QPSolver.h
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* @brief A quadratic programming solver implements the active set method
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* @date Apr 15, 2014
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* @author Duy-Nguyen Ta
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*/
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#pragma once
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#include <gtsam/linear/VectorValues.h>
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#include <gtsam_unstable/linear/QP.h>
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#include <vector>
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#include <set>
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namespace gtsam {
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/// This struct holds the state of QPSolver at each iteration
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struct QPState {
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VectorValues values;
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VectorValues duals;
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InequalityFactorGraph workingSet;
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bool converged;
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size_t iterations;
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/// default constructor
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QPState() :
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values(), duals(), workingSet(), converged(false), iterations(0) {
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}
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/// constructor with initial values
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QPState(const VectorValues& initialValues, const VectorValues& initialDuals,
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const InequalityFactorGraph& initialWorkingSet, bool _converged, size_t _iterations) :
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values(initialValues), duals(initialDuals), workingSet(initialWorkingSet), converged(
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_converged), iterations(_iterations) {
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}
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};
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/**
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* This QPSolver uses the active set method to solve a quadratic programming problem
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* defined in the QP struct.
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* Note: This version of QPSolver only works with a feasible initial value.
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*/
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class QPSolver {
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const QP& qp_; //!< factor graphs of the QP problem, can't be modified!
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GaussianFactorGraph baseGraph_; //!< factor graphs of cost factors and linear equalities.
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//!< used to initialize the working set factor graph,
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//!< to which active inequalities will be added
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VariableIndex costVariableIndex_, equalityVariableIndex_,
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inequalityVariableIndex_; //!< index to corresponding factors to build dual graphs
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FastSet<Key> constrainedKeys_; //!< all constrained keys, will become factors in dual graphs
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public:
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/// Constructor
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QPSolver(const QP& qp);
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/// Find solution with the current working set
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VectorValues solveWithCurrentWorkingSet(
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const InequalityFactorGraph& workingSet) const;
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/// @name Build the dual graph
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/// @{
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/// Collect the Jacobian terms for a dual factor
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template<typename FACTOR>
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std::vector<std::pair<Key, Matrix> > collectDualJacobians(Key key,
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const FactorGraph<FACTOR>& graph,
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const VariableIndex& variableIndex) const {
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std::vector<std::pair<Key, Matrix> > Aterms;
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if (variableIndex.find(key) != variableIndex.end()) {
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BOOST_FOREACH(size_t factorIx, variableIndex[key]) {
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typename FACTOR::shared_ptr factor = graph.at(factorIx);
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if (!factor->active()) continue;
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Matrix Ai = factor->getA(factor->find(key)).transpose();
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Aterms.push_back(std::make_pair(factor->dualKey(), Ai));
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}
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}
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return Aterms;
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}
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/// Create a dual factor
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JacobianFactor::shared_ptr createDualFactor(Key key,
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const InequalityFactorGraph& workingSet,
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const VectorValues& delta) const;
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/**
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* Build the dual graph to solve for the Lagrange multipliers.
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*
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* The Lagrangian function is:
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* L(X,lambdas) = f(X) - \sum_k lambda_k * c_k(X),
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* where the unconstrained part is
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* f(X) = 0.5*X'*G*X - X'*g + 0.5*f0
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* and the linear equality constraints are
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* c1(X), c2(X), ..., cm(X)
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*
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* Take the derivative of L wrt X at the solution and set it to 0, we have
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* \grad f(X) = \sum_k lambda_k * \grad c_k(X) (*)
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*
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* For each set of rows of (*) corresponding to a variable xi involving in some constraints
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* we have:
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* \grad f(xi) = \frac{\partial f}{\partial xi}' = \sum_j G_ij*xj - gi
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* \grad c_k(xi) = \frac{\partial c_k}{\partial xi}'
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*
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* Note: If xi does not involve in any constraint, we have the trivial condition
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* \grad f(Xi) = 0, which should be satisfied as a usual condition for unconstrained variables.
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*
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* So each variable xi involving in some constraints becomes a linear factor A*lambdas - b = 0
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* on the constraints' lambda multipliers, as follows:
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* - The jacobian term A_k for each lambda_k is \grad c_k(xi)
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* - The constant term b is \grad f(xi), which can be computed from all unconstrained
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* Hessian factors connecting to xi: \grad f(xi) = \sum_j G_ij*xj - gi
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*/
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GaussianFactorGraph::shared_ptr buildDualGraph(
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const InequalityFactorGraph& workingSet,
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const VectorValues& delta) const;
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/// @}
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/**
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* The goal of this function is to find currently active inequality constraints
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* that violate the condition to be active. The one that violates the condition
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* the most will be removed from the active set. See Nocedal06book, pg 469-471
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*
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* Find the BAD active inequality that pulls x strongest to the wrong direction
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* of its constraint (i.e. it is pulling towards >0, while its feasible region is <=0)
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*
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* For active inequality constraints (those that are enforced as equality constraints
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* in the current working set), we want lambda < 0.
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* This is because:
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* - From the Lagrangian L = f - lambda*c, we know that the constraint force
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* is (lambda * \grad c) = \grad f. Intuitively, to keep the solution x stay
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* on the constraint surface, the constraint force has to balance out with
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* other unconstrained forces that are pulling x towards the unconstrained
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* minimum point. The other unconstrained forces are pulling x toward (-\grad f),
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* hence the constraint force has to be exactly \grad f, so that the total
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* force is 0.
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* - We also know that at the constraint surface c(x)=0, \grad c points towards + (>= 0),
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* while we are solving for - (<=0) constraint.
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* - We want the constraint force (lambda * \grad c) to pull x towards the - (<=0) direction
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* i.e., the opposite direction of \grad c where the inequality constraint <=0 is satisfied.
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* That means we want lambda < 0.
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* - This is because when the constrained force pulls x towards the infeasible region (+),
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* the unconstrained force is pulling x towards the opposite direction into
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* the feasible region (again because the total force has to be 0 to make x stay still)
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* So we can drop this constraint to have a lower error but feasible solution.
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*
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* In short, active inequality constraints with lambda > 0 are BAD, because they
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* violate the condition to be active.
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*
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* And we want to remove the worst one with the largest lambda from the active set.
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*
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*/
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int identifyLeavingConstraint(const InequalityFactorGraph& workingSet,
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const VectorValues& lambdas) const;
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/**
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* Compute step size alpha for the new solution x' = xk + alpha*p, where alpha \in [0,1]
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*
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* @return a tuple of (alpha, factorIndex, sigmaIndex) where (factorIndex, sigmaIndex)
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* is the constraint that has minimum alpha, or (-1,-1) if alpha = 1.
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* This constraint will be added to the working set and become active
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* in the next iteration
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*/
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boost::tuple<double, int> computeStepSize(
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const InequalityFactorGraph& workingSet, const VectorValues& xk,
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const VectorValues& p) const;
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/** Iterate 1 step, return a new state with a new workingSet and values */
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QPState iterate(const QPState& state) const;
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/**
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* Identify active constraints based on initial values.
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*/
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InequalityFactorGraph identifyActiveConstraints(
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const InequalityFactorGraph& inequalities,
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const VectorValues& initialValues,
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const VectorValues& duals = VectorValues(), bool useWarmStart = true) const;
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/** Optimize with a provided initial values
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* For this version, it is the responsibility of the caller to provide
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* a feasible initial value, otherwise, an exception will be thrown.
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* @return a pair of <primal, dual> solutions
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*/
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std::pair<VectorValues, VectorValues> optimize(
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const VectorValues& initialValues, const VectorValues& duals = VectorValues(), bool useWarmStart = true) const;
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};
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/* ************************************************************************* */
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/** An exception indicating that the noise model dimension passed into a
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* JacobianFactor has a different dimensionality than the factor. */
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class InfeasibleInitialValues : public ThreadsafeException<InfeasibleInitialValues> {
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public:
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InfeasibleInitialValues() {}
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virtual ~InfeasibleInitialValues() throw() {}
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virtual const char* what() const throw() {
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if(description_.empty())
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description_ = "An infeasible intial value was provided for the QPSolver.\n"
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"This current version of QPSolver does not handle infeasible"
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"initial point due to the lack of a LPSolver.\n";
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return description_.c_str();
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}
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private:
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mutable std::string description_;
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};
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} /* namespace gtsam */
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