Solutions and optimality criteria for nonconvex quadratic-exponential minimization problem |
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| Authors: | David Yang Gao Ning Ruan |
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| Affiliation: | (1) Department of Mathematics, Virginia Polytechnic Institute and State University, Blacksburg, VA 24061, USA;(2) School of Management, University of Shanghai for Science and Technology, Jungong Road, Shanghai, 200093, China |
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| Abstract: | This paper presents a set of complete solutions and optimality conditions for a nonconvex quadratic-exponential optimization problem. By using the canonical duality theory developed by the first author, the nonconvex primal problem in n-dimensional space can be converted into an one-dimensional canonical dual problem with zero duality gap, which can be solved easily to obtain all dual solutions. Each dual solution leads to a primal solution. Both global and local extremality conditions of these primal solutions can be identified by the triality theory associated with the canonical duality theory. Several examples are illustrated. |
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| Keywords: | Duality theory Nonconvex programming Global optimization Quadratic-exponential function Nonlinear algebraic equation Triality |
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