Abstract twisted Brin--Thompson groups

Abstract

Given a group G acting faithfully on a set S, one gets a simple group denoted SVG, called a twisted Brin--Thompson group. In this paper we drop the faithfulness assumption, and get an abstract version of a twisted Brin--Thompson group SVG. While the resulting group is not simple, since SVG surjects onto SVG/(G S), we prove that every proper normal subgroup of SVG lies in the kernel of this surjection, so SVG is ``relatively simple''. The advantage is that now we can prove that every finitely presented simple group embeds in a finitely presented abstract twisted Brin--Thompson group intersecting this kernel trivially. In particular, if the Boone--Higman conjecture is true, then so is a related conjectural characterization of groups with solvable word problem, arising purely in the world of twisted Brin--Thompson groups. We also prove a variety of additional results about abstract twisted Brin--Thompson groups, some of which are new even in the faithful case: they are all uniformly perfect, have property NL and property FW∞, are boundedly acyclic and 2-invisible, and are C*-simple as soon as they have trivial amenable radical. Along the way we formulate a new general criterion for 2-invisibility that is interesting in its own right.

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