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Global optimality principles for polynomial optimization over box or bivalent constraints by separable polynomial approximations

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dc.contributor.author Jeyakumar, V
dc.contributor.author Li, G
dc.contributor.author Srisatkunarajah, S
dc.date.accessioned 2014-02-01T08:33:47Z
dc.date.accessioned 2022-06-28T06:46:01Z
dc.date.available 2014-02-01T08:33:47Z
dc.date.available 2022-06-28T06:46:01Z
dc.date.issued 2013
dc.identifier.issn 09255001
dc.identifier.uri http://repo.lib.jfn.ac.lk/ujrr/handle/123456789/169
dc.description.abstract In this paper we present necessary conditions for global optimality for polynomial problems with box or bivalent constraints using separable polynomial relaxations. We achieve this by first deriving a numerically checkable characterization of global optimality for separable polynomial problems with box as well as bivalent constraints. Our necessary optimality conditions can be numerically checked by solving semi-definite programming problems. Then, by employing separable polynomial under-estimators, we establish sufficient conditions for global optimality for classes of polynomial optimization problems with box or bivalent constraints. We construct underestimators using the sum of squares convex (SOS-convex) polynomials of real algebraic geometry. An important feature of SOS-convexity that is generally not shared by the standard convexity is that whether a polynomial is SOS-convex or not can be checked by solving a semidefinite programming problem. We illustrate the versatility of our optimality conditions by simple numerical examples. en_US
dc.language.iso en en_US
dc.publisher Springer Science+Business Media New York en_US
dc.subject Bivalent constraints en_US
dc.subject Box constraints en_US
dc.subject Global optimality conditions en_US
dc.subject Global optimization en_US
dc.subject Polynomial optimization en_US
dc.title Global optimality principles for polynomial optimization over box or bivalent constraints by separable polynomial approximations en_US
dc.type Article en_US


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