A new construction of universal spaces for asymptotic dimension

Abstract

For each n, we construct a separable metric space Un that is universal in the coarse category of separable metric spaces with asymptotic dimension (asdim) at most n and universal in the uniform category of separable metric spaces with uniform dimension (udim) at most n. Thus, Un serves as a universal space for dimension n in both the large-scale and infinitesimal topology. More precisely, we prove: \[ asdim Un = udim Un = n \] and such that for each separable metric space X, a) if asdim X ≤ n, then X is coarsely equivalent to a subset of Un; b) if udim X ≤ n, then X is uniformly homeomorphic to a subset of Un.