Combinatorics of the Lipschitz polytope

Abstract

Let be a metric on the set X=\1,2,…,n+1\. Consider the n-dimensional polytope of functions f:X→ R, which satisfy the conditions f(n+1)=0, |f(x)-f(y)|≤ (x,y). The question on classifying metrics depending on the combinatorics of this polytope have been recently posed by A. M. Vershik V. We prove that for any "generic" metric the number of (n-m)-dimensional faces, 0≤ m≤ n, equals n+mm,m,n-m=(n+m)!/m!m!(n-m)!. This fact is intimately related to regular triangulations of the root polytope (the convex hull of the roots of An root system). Also we get two-sided estimates for the logarithm of the number of Vershik classes of metrics: n3 n from above and n2 from below.