Sets in Rd determining k taxicab distances

Abstract

We address an analog of a problem introduced by Erdos and Fishburn, itself an inverse formulation of the famous Erdos distance problem, in which the usual Euclidean distance is replaced with the metric induced by the 1-norm, commonly referred to as the taxicab metric. Specifically, we investigate the following question: given d,k∈ N, what is the maximum size of a subset of Rd that determines at most k distinct taxicab distances, and can all such optimal arrangements be classified? We completely resolve the question in dimension d=2, as well as the k=1 case in dimension d=3, and we also provide a full resolution in the general case under an additional hypothesis.