Abstract homomorphisms from some topological groups to acylindrically hyperbolic groups

Abstract

We describe homomorphisms :H→ G for which the codomain is acylindrically hyperbolic and the domain is a topological group which is either completely metrizable or locally countably compact Hausdorff. It is shown that, in a certain sense, either the image of is small or is almost continuous. We also describe homomorphisms from the Hawaiian earring group to G as above. We prove a more precise result for homomorphisms :H→ Mod(), where H as above and Mod() is the mapping class group of a connected compact surface . In this case there exists an open normal subgroup V≤slant H such that (V) is finite. We also prove the analogous statement for homomorphisms :H→ Out(G), where G is a one-ended hyperbolic group. Some automatic continuity results for relatively hyperbolic groups and fundamental groups of graphs of groups are also deduced. As a by-product, we prove that the Hawaiian earring group is acylindrically hyperbolic, but does not admit any universal acylindrical action on a hyperbolic space.