A class of modulus-based matrix splitting methods for vertical linear complementarity problem
Cui-Xia Li, Shi-Liang Wu
Abstract
In this paper, by transforming the vertical linear complementarity problem (VLCP) as a certain absolute value equation, we design a class of modulus-based matrix splitting iteration methods for solving the VLCP. The convergence properties of the proposed methods are discussed in depth. By making use of some numerical experiments, we confirm the efficiency of the proposed methods. Numerical results show that the proposed methods are superior to the classical modulus-based matrix splitting iteration methods.
Topics & Concepts
MathematicsLinear complementarity problemModulusComplementarity (molecular biology)Mixed complementarity problemMatrix splittingConvergence (economics)Applied mathematicsMatrix (chemical analysis)Complementarity theoryMathematical optimizationConvergent matrixClass (philosophy)Iterative methodNumerical analysisMathematical analysisState-transition matrixSymmetric matrixGeometryNonlinear systemComputer scienceBiologyEconomicsComposite materialGeneticsEigenvalues and eigenvectorsEconomic growthPhysicsQuantum mechanicsArtificial intelligenceMaterials scienceMatrix Theory and AlgorithmsAdvanced Optimization Algorithms ResearchIterative Methods for Nonlinear Equations