High-level convexity for products of squared Euclidean distance functions

Abstract

We study smooth functions on Euclidean space whose Hessian is positive definite outside a bounded set, with emphasis on products of squared distance functions. More precisely, we first prove a simple convexity principle: if the superlevel region f-1([c,∞)) is contained in the Hessian-positive region of f, then the sublevel set \f c\ is convex. We apply this to finite products FP(x)=Πp∈ P\|x-p\|2, proving that their Hessian-positive complements are bounded. For the two-centre product Fp,q(x)=\|x-p\|2\|x-q\|2 in dimension n2, we compute the Hessian-positive region and the exact value \[ hmax(Fp,q)=\|p-q\|44. \] This value is sharp for convexity of sublevel sets in the following sense: we prove convexity above it and nonconvexity below it. This also gives the exact convexity and quasiconvexity truncation levels for the two-centre model.