On the asymptotic dimension of products of coarse spaces

Abstract

We prove that for any coarse spaces X1,…,Xn of asymptotic dimension 1, the product X=X1×…× Xn has asymptotic dimension n. Another result states that a finitary coare space Z has asdim(Z) n if Z admits an almost free action of the group Zn. We deduce these results from the following combinatorial result (that generalized the the Hex Theorem of Gale): for any cover F of a discrete box K=k1× … × kn, either some set F∈ F contains a chain connecting two opposite faces of K or there exists a set B⊂ K of diameter 1 such that |\F∈ F:F B\|>n.