Gaining or losing perspective

Abstract

We study MINLO (mixed-integer nonlinear optimization) formulations of the disjunction x∈\0\[l,u], where z is a binary indicatorof x∈[l,u] (u> > 0), and y "captures" f(x), which is assumed to be convex on its domain [l,u], but otherwise y=0 when x=0. This model is useful when activities have operating ranges, we pay a fixed cost for carrying out each activity, and costs on the levels of activities are convex. Using volume as a measure to compare convex bodies, we investigate a variety of continuous relaxations of this model, one of which is the convex-hull, achieved via the "perspective reformulation" inequality y ≥ zf(x/z). We compare this to various weaker relaxations, studying when they may be considered as viable alternatives. In the important special case when f(x) := xp, for p>1, relaxations utilizing the inequality yzq ≥ xp, for q ∈ [0,p-1], are higher-dimensional power-cone representable, and hence tractable in theory. One well-known concrete application (with f(x) := x2) is mean-variance optimization (in the style of Markowitz), and we carry out some experiments to illustrate our theory on this application.