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A Global Optimization Method for Solving Convex Quadratic Bilevel Programming Problems |
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| Authors: | Le Dung Muu Nguyen Van Quy |
| Institution: | (1) Hanoi Institute of Mathematics, P.O. Box 631, Bo Ho, 10000, Hanoi, Vietnam;(2) The Accounting and Finance University of Hanoi, Dong Ngac, Tu Liem, Hanoi, Vietnam |
| Abstract: | We use the merit function technique to formulate a linearly constrained bilevel convex quadratic problem as a convex program with an additional convex-d.c. constraint. To solve the latter problem we approximate it by convex programs with an additional convex-concave constraint using an adaptive simplicial subdivision. This approximation leads to a branch-and-bound algorithm for finding a global optimal solution to the bilevel convex quadratic problem. We illustrate our approach with an optimization problem over the equilibrium points of an n-person parametric noncooperative game. |
| Keywords: | Convex quadratic bilevel programming Merit function Saddle function Branch-and-bound algorithm Optimization over an equilibrium set |
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