Self-simulable groups

Abstract

We say that a finitely generated group is self-simulable if every effectively closed action of on a closed subset of \0,1\N is the topological factor of a -subshift of finite type. We show that self-simulable groups exist, that any direct product of non-amenable finitely generated groups is self-simulable, that under technical conditions self-simulability is inherited from subgroups, and that the subclass of self-simulable groups is stable under commensurability and quasi-isometries of finitely presented groups. Some notable examples of self-simulable groups obtained are the direct product Fk × Fk of two free groups of rank k ≥ 2, non-amenable finitely generated branch groups, the simple groups of Burger and Mozes, Thompson's V, the groups GLn(Z), SLn(Z), Aut(Fn) and Out(Fn) for n ≥ 5; The braid groups Bm for m ≥ 7, and certain classes of RAAGs. We also show that Thompson's F is self-simulable if and only if F is non-amenable, thus giving a computability characterization of this well-known open problem. We also exhibit a few applications of self-simulability on the dynamics of these groups, notably, that every self-simulable group with decidable word problem admits a nonempty strongly aperiodic subshift of finite type.