Generalized roundness of vertex transitive graphs

Abstract

We study the generalized roundness of finite metric spaces whose distance matrix D has the property that every row of D is a permutation of the first row. The analysis provides a way to characterize subsets of the Hamming cube \ 0, 1 \n ⊂ 1(n) (n ≥ 1) that have strict 1-negative type. The result can be stated in two ways: a subset S = \ x0,x1,…,xk \ of the Hamming cube \ 0, 1 \n ⊂ 1(n) has generalized roundness one if and only if the vectors \ x1 - x0,x2 - x0,…,xk - x0 \ are linearly dependent in Rn. Equivalently, S has strict 1-negative type if and only if the vectors \ x1 - x0,x2 - x0,…,xk - x0 \ are linearly independent in Rn.