On the convexity for the range set of two quadratic functions

Abstract

Given n× n symmetric matrices A and B, Dines in 1941 proved that the joint range set \(xTAx,xTBx)|~x∈Rn\ is always convex. Our paper is concerned with non-homogeneous extension of the Dines theorem for the range set R(f,g) = \(f(x),g(x))|~x ∈ Rn \, f(x) = xT A x + 2aT x + a0 and g(x) = xT B x + 2bT x + b0. We show that R(f,g) is convex if, and only if, any pair of level sets, \x∈Rn|f(x)=α\ and \x∈Rn|g(x)=β\, do not separate each other. With the novel geometric concept about separation, we provide a polynomial-time procedure to practically check whether a given R(f,g) is convex or not.

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