Asymptotic dimension and small subsets in locally compact topological groups
Abstract
We prove that for a coarse space X the ideal S(X) of small subsets of X coincides with the ideal D<(X) of subsets A⊂ X of asymptotic dimension asdim(A)<asdim(X) provided that X is coarsely equivalent to an Euclidean space Rn. Also we prove that for a locally compact Abelian group X, the equality S(X)=D<(X) holds if and only if the group X is compactly generated.
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