Asymmetry in k-center variants

This paper explores three concepts: the k-center problem, some of its variants, and asymmetry. The k-center problem is fundamental in location theory. Variants of k-center may more accurately model real-life problems than the original formulation. Asymmetry is a significant impediment to approximation in many graph problems, such as k-center, facility location, k-median, and the TSP.We give an O(log*n)-approximation algorithm for the asymmetric weighted k-center problem. Here, the vertices have weights and we are given a total budget for opening centers. In the p-neighbor variant each vertex must have p (unweighted) centers nearby: we give an O(log*k)-bicriteria algorithm using 2k centers, for small p.Finally, we show the following three versions of the asymmetric k-center problem to be inapproximable: priority k-center, k-supplier, and outliers with forbidden centers.