A standard quadratic optimization problem (StQP) consists in minimizing a quadratic form over a simplex. Among the problems which can be transformed into a StQP are the general quadratic problem over a polytope, and the maximum clique problem in a graph. In this paper we present several new polynomial-time bounds for StQP ranging from very simple and cheap ones to more complex and tight constructions. The main tools employed in the conception and analysis of most bounds are Semidefinite Programming and decomposition of the objective function into a sum of two quadratic functions, each of which is easy to minimize. We provide a complete diagram of the dominance, incomparability, or equivalence relations among the bounds proposed in this and in previous works. In particular, we show that one of our new bounds dominates all the others. Furthermore, a specialization of such bound dominates Schrijver's improvement of Lovasz's theta function bound for the maximum size of a clique in a graph.

New and old bounds for standard quadratic optimization: dominance, equivalence and incomparability / Immanuel M. Bomze; Marco Locatelli; TARDELLA, Fabio. - In: MATHEMATICAL PROGRAMMING. - ISSN 0025-5610. - STAMPA. - 115:(2008), pp. 31-64. [10.1007/s10107-007-0138-0]

New and old bounds for standard quadratic optimization: dominance, equivalence and incomparability

TARDELLA, Fabio
2008

Abstract

A standard quadratic optimization problem (StQP) consists in minimizing a quadratic form over a simplex. Among the problems which can be transformed into a StQP are the general quadratic problem over a polytope, and the maximum clique problem in a graph. In this paper we present several new polynomial-time bounds for StQP ranging from very simple and cheap ones to more complex and tight constructions. The main tools employed in the conception and analysis of most bounds are Semidefinite Programming and decomposition of the objective function into a sum of two quadratic functions, each of which is easy to minimize. We provide a complete diagram of the dominance, incomparability, or equivalence relations among the bounds proposed in this and in previous works. In particular, we show that one of our new bounds dominates all the others. Furthermore, a specialization of such bound dominates Schrijver's improvement of Lovasz's theta function bound for the maximum size of a clique in a graph.
2008
115
31
64
Immanuel M. Bomze; Marco Locatelli; TARDELLA, Fabio
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Utilizza questo identificatore per citare o creare un link a questa risorsa: https://hdl.handle.net/2158/1247722
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