A new separable property of the joint numerical range of quadratic functions and its applications to the Smallest Enclosing Ball Problem

Abstract

We explore separable property of the joint numerical range G( Rn) of a special class of quadratic functions and apply it to solving the smallest enclosing ball (SEB) problem which asks to find a ball B(a,r) in Rn with smallest radius r such that B(a,r) contains the intersection i=1mB(ai,ri) of m given balls B(ai,ri). We show that G( Rn) is convex if and only if rank\a1-a, a2-a, …, am-a\ n-1. Otherwise, rank\a1-a, a2-a, …, am-a\=n and G( Rn) is not convex. In this case we propose a new set G( Rn) which allows to show that if m=n then G( Rn) is convex even G( Rn) is not. Importantly, the separable property of G( Rn) then implies the separable property for G( Rn). As a result, a new progress on solving the SEB problem is obtained.