Distance matrices of subsets of the Hamming cube

Abstract

Graham and Winkler derived a formula for the determinant of the distance matrix of a full-dimensional set of n + 1 points \ x0, x1, … , xn \ in the Hamming cube Hn = ( \ 0,1 \n, 1 ). In this article we derive a formula for the determinant of the distance matrix D of an arbitrary set of m + 1 points \ x0, x1, … , xm \ in Hn. It follows from this more general formula that (D) = 0 if and only if the vectors x0, x1, … , xm are affinely independent. Specializing to the case m = n provides new insights into the original formula of Graham and Winkler. A significant difference that arises between the cases m < n and m = n is noted. We also show that if D is the distance matrix of an unweighted tree on n + 1 vertices, then D-1 1, 1 = 2/n where 1 is the column vector all of whose coordinates are 1. Finally, we derive a new proof of Murugan's classification of the subsets of Hn that have strict 1-negative type.