Coarse structures on groups defined by T-sequences

Abstract

A sequence (an) in an Abelian group is called a T-sequence if there exists a Hausdorff group topology on G in which (an) converges to 0. For a T-sequence (an) , τ(an) denotes the strongest group topology on G in which (an) converges to 0. The ideal I(an) of all precompact subsets of (G, τ(an) ) defines a coarse structure on G with base of entourages \(x, y): x-y ∈ P \, P∈I(an). We prove that asdim \ \ (G, I(an) ) =∞ for every non-trivial T-sequence (an) on G, and the coarse group (G, I(an) ) has 1 end provided that (an) generates G. The keypart play asymorphic copies of the Hamming space in (G, I(an)).