Rigidity of the group topology for closed Weyl transitive groups of automorphisms of a regular locally finite building

Published 12 Feb 2014 in math.GR | (1402.2765v14)

Abstract: We prove that if $G$ is a group of automorphisms of a regular locally finite building which is closed in the compact-open topology and acts Weyl transitively on the building, then $G$ admits just one Hausdorff locally compact $\sigma$-compact topology compatible with the group operations.

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Authors (1)

Rupert McCallum

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