Binary optimization is a central problem in mathematical optimization and its applications are abundant. To solve this problem, we propose a new class of continuous optimization techniques, which is based on Mathematical Programming with Equilibrium Constraints (MPECs). We first reformulate the binary program as an equivalent augmented biconvex optimization problem with a bilinear equality constraint, then we propose an exact penalty method to solve it. The resulting algorithm seeks a desirable solution to the original problem via solving a sequence of linear programming convex relaxation subproblems. In addition, we prove that the penalty function, induced by adding the complementarity constraint to the objective, is exact, i.e., it has th...
An interior-point method for solving mathematical programs with equilibrium constraints (MPECs) is p...
AbstractThis work deals with mathematical programs with fuzzy equilibrium constraints. It shows that...
© 2019, Allerton Press, Inc. We propose a penalty method for general convex constrained optimization...
by photocopy or other means, without the permission of the author. Supervisor: Dr. Jane Ye and Co-Su...
A Mathematical Program with Linear Complementarity Constraints (MPLCC) is an optimization problem wh...
Equilibrium constrained problems form a special class of mathematical programs where the decision va...
Mathematical program with equilibrium constraints, abbreviated as MPEC, is a constrained optimizatio...
Semidefinite relaxation for certain discrete optimization problems involves replacing a vector-value...
Abstract. In this paper a branch-and-bound algorithm is proposed for finding a global min-imum to a ...
In this paper, we consider a general class of nonlinear mixed discrete programming problems. By intr...
An interior-point method for solving mathematical programs with equilibrium constraints (MPECs) is p...
The non-linear programming problem seeks to maximize a function f(x) where the n component vector x ...
The main goal of this work is to solve Mathematical Program with Complementarity Constraints (MPCC)...
. We consider an arbitrary linear program with equilibrium constraints (LPEC) that may possibly be i...
Mathematical programming problems with equilibrium constraints (MPEC) are nonlinear programming prob...
An interior-point method for solving mathematical programs with equilibrium constraints (MPECs) is p...
AbstractThis work deals with mathematical programs with fuzzy equilibrium constraints. It shows that...
© 2019, Allerton Press, Inc. We propose a penalty method for general convex constrained optimization...
by photocopy or other means, without the permission of the author. Supervisor: Dr. Jane Ye and Co-Su...
A Mathematical Program with Linear Complementarity Constraints (MPLCC) is an optimization problem wh...
Equilibrium constrained problems form a special class of mathematical programs where the decision va...
Mathematical program with equilibrium constraints, abbreviated as MPEC, is a constrained optimizatio...
Semidefinite relaxation for certain discrete optimization problems involves replacing a vector-value...
Abstract. In this paper a branch-and-bound algorithm is proposed for finding a global min-imum to a ...
In this paper, we consider a general class of nonlinear mixed discrete programming problems. By intr...
An interior-point method for solving mathematical programs with equilibrium constraints (MPECs) is p...
The non-linear programming problem seeks to maximize a function f(x) where the n component vector x ...
The main goal of this work is to solve Mathematical Program with Complementarity Constraints (MPCC)...
. We consider an arbitrary linear program with equilibrium constraints (LPEC) that may possibly be i...
Mathematical programming problems with equilibrium constraints (MPEC) are nonlinear programming prob...
An interior-point method for solving mathematical programs with equilibrium constraints (MPECs) is p...
AbstractThis work deals with mathematical programs with fuzzy equilibrium constraints. It shows that...
© 2019, Allerton Press, Inc. We propose a penalty method for general convex constrained optimization...