Automatic continuity for groups whose torsion subgroups are small

Abstract

We prove that a group homomorphism L G from a locally compact Hausdorff group L into a discrete group G either is continuous, or there exists a normal open subgroup N⊂eq L such that (N) is a torsion group provided that G does not include Q or the p-adic integers Zp or the Pr\"ufer p-group Z(p∞) for any prime p as a subgroup, and if the torsion subgroups of G are small in the sense that any torsion subgroup of G is artinian. In particular, if is surjective and G additionaly does not have non-trivial normal torsion subgroups, then is continuous. As an application we obtain results concerning the continuity of group homomorphisms from locally compact Hausdorff groups to many groups from geometric group theory, in particular to automorphism groups of right-angled Artin groups and to Helly groups.

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