Approximate Minimum Diameter

Abstract

We study the minimum diameter problem for a set of inexact points. By inexact, we mean that the precise location of the points is not known. Instead, the location of each point is restricted to a contineus region ( model) or a finite set of points (∈dec model). Given a set of inexact points in one of or ∈dec models, we wish to provide a lower-bound on the diameter of the real points. In the first part of the paper, we focus on ∈dec model. We present an O(21εd · ε-2d · n3 ) time approximation algorithm of factor (1+ε) for finding minimum diameter of a set of points in d dimensions. This improves the previously proposed algorithms for this problem substantially. Next, we consider the problem in model. In d-dimensional space, we propose a polynomial time d-approximation algorithm. In addition, for d=2, we define the notion of α-separability and use our algorithm for ∈dec model to obtain (1+ε)-approximation algorithm for a set of α-separable regions in time O(21ε2 . n3ε10 .(α/2)3 ).