Sequential coarse structures of topological groups
Abstract
We endow a topological group (G, τ) with a coarse structure defined by the smallest group ideal Sτ on G containing all converging sequences with their limits and denote the obtained coarse group by (G, Sτ). If G is discrete then (G, Sτ) is a finitary coarse group studding in Geometric Group Theory. The main result: if a topological abelian group (G, τ) contains a non-trivial converging sequence then asdim \ (G, Sτ)= ∞ .
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