Lipschitz constant n almost surely suffices for mapping n grid points onto a cube

Abstract

Kaluza, Kopeck\'a and the author have shown that the best Lipschitz constant for mappings taking a given nd-element set in the integer lattice Zd, with n∈ N, surjectively to the regular n times n grid \1,…,n\d may be arbitrarily large. However, there remain no known, non-trivial asymptotic bounds, either from above or below, on how this best Lipschitz constant grows with n. We approach this problem from a probabilistic point of view. More precisely, we consider the random configuration of nd points inside a given finite lattice and establish almost sure, asymptotic upper bounds of order n on the best Lipschitz constant of mappings taking this set surjectively to the regular n times n grid \1,…,n\d.