Few distance sets in p spaces and p product spaces

Abstract

Kusner asked if n+1 points is the maximum number of points in Rn such that the p distance (1<p<∞) between any two points is 1. We present an improvement to the best known upper bound when p is large in terms of n, as well as a generalization of the bound to s-distance sets. We also study equilateral sets in the p sums of Euclidean spaces, deriving upper bounds on the size of an equilateral set for when p=∞, p is even, and for any 1 p<∞.