Coarse structures on groups defined by T-sequences

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