Characterization of finite metric space by their isometric sequences

Abstract

Let (X,d) be a finite metric space with |X|=n. For a positive integer k we define Ak(X) to be the quotient set of all k-subsets of X by isometry, and we denote |Ak(X)| by ak. The sequence (a1,a2,…,an) is called the isometric sequence of (X,d). In this article we aim to characterize finite metric spaces by their isometric sequences under one of the following assumptions: (i) ak=1 for some k with 2≤ k≤ n-2; (ii) ak=2 for some k with 4≤ k≤ 1+1+4n2; (iii) a3=2; (iv) a2=a3=3. Furthermore, we give some criterion on how to embed such finite metric spaces to Euclidean spaces. We give some maximum cardinalities of subsets in the d-dimensional Euclidean space with small a3, which are analogue problems on a sets with few distinct triangles discussed by Epstein, Lott, Miller and Palsson.