On the Ball-Constrained Weighted Maximin Dispersion Problem

Abstract

The ball-constrained weighted maximin dispersion problem ( Pball) is to find a point in an n-dimensional Euclidean ball such that the minimum of the weighted Euclidean distance from given m points is maximized. We propose a new second-order cone programming relaxation for ( Pball). Under the condition m n, ( Pball) is polynomial-time solvable since the new relaxation is shown to be tight. In general, we prove that ( Pball) is NP-hard. Then, we propose a new randomized approximation algorithm for solving ( Pball), which provides a new approximation bound of 1-O((m)/n)2.