The k-Center Problem of Uncertain Points on Graphs

Abstract

In this paper, we study the k-center problem of uncertain points on a graph. Given are an undirected graph G = (V, E) and a set P of n uncertain points where each uncertain point with a non-negative weight has m possible locations on G each associated with a probability. The problem aims to find k centers (points) on G so as to minimize the maximum weighted expected distance of uncertain points to their expected closest centers. No previous work exist for the k-center problem of uncertain points on undirected graphs. We propose exact algorithms that solve respectively the case of k=2 in O(|E|2m2n |E|mn mn ) time and the problem with k≥ 3 in O(\|E|kmknk+1k |E|mn m, |E|knk2mk22 |E|mn\) time, provided with the distance matrix of G. In addition, an O(|E|mn mn)-time algorithmic approach is given for the one-center case.

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