Bounds for k-centers of point sets under L∞-bottleneck distance

Abstract

We consider the k-center problem on the space of fixed-size point sets in the plane under the L∞-bottleneck distance. While this problem is motivated by persistence diagrams in topological data analysis, we illustrate it as a Restaurant Supply Problem: given n restaurant chains of m stores each, we want to place supermarket chains, also of m stores each, such that each restaurant chain can select one supermarket chain to supply all its stores, ensuring that each store is matched to a nearby supermarket. How many supermarket chains are required to supply all restaurants? We address this questions under the constraint that any two restaurant chains are close enough under the L∞-distance to be satisfied by a single supermarket chain. We provide both upper and lower bounds for this problem and investigate its computational complexity.

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