Optimizing convex functions over nonconvex sets
Abstract
In this paper we derive strong linear inequalities for sets of the form (x, q) ∈ Rd × R : q ≥ Q(x), x ∈ Rd - int(P), where Q(x) : Rd → R is a quadratic function, P ⊂ Rd and "int" denotes interior. Of particular but not exclusive interest is the case where P denotes a closed convex set. In this paper, we present several cases where it is possible to characterize the convex hull by efficiently separable linear inequalities.
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