APD profiles and transfinite asymptotic dimension

Abstract

We develop the theory of APD profiles introduced by J. Dydak for ∞-pseudometric spaces. We connect them with transfinite asymptotic dimension defined by T. Radul. We give a characterization of spaces with transfinite asymptotic dimension at most ω+n for n∈ω and a sufficient condition for a space to have transfinite asymptotic dimension at most m· ω+n for m,n∈ω, using the language of APD profiles.