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Coordinate relaxation methods for multivalued complementarity problems of the splitting type are proposed for complementarity problems with multivalued mappings. The convergence
Optimality conditions for linear copositive programming problems with isolated immobile indices-infinite programming to a problem of linear copositive programming (LCP). We prove explicit optimality conditions
Value Functions and Their Directional Derivatives in Parametric Nonlinear Programming of nonlinear mathematical programming problems depending on
parameters. To this end, we use
A combined relaxation method for variational inequalities with nonlinear constraints The Mathematical Programming Society, Inc. Published by Elsevier Science B.V.
Portfolio Replication: Its Forward-Dual Decompositionrisk control (mathematical programming)
On strong and weak second-order necessary optimality conditions for nonlinear programming. These conditions are closely related to second-order
constraint qualifications, which guarantee
Necessary optimality conditions for problems with equality and inequality constraints: Abnormal case nonlinear optimization problem with equality and inequality constraints. The obtained optimality conditions
Quasisolution of an inverse boundary-value problem in aerohydrodynamics with a limited maximum velocity on a contour in a range of angles of attack of attack. We reduce this problem to the minimization of a quadratic functional subject to constraints
An extension of the Jacobi algorithm for multi-valued mixed complementarity problemsWe consider a generalized mixed complementarity problem (MCP) with box constraints and multi
A combined relaxation method for variational inequalities with nonlinear constraints The Mathematical Programming Society, Inc. Published by Elsevier Science B.V.
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