A geometric simulation theorem on direct products of finitely generated groups

Abstract

We show that every effectively closed action of a finitely generated group G on a closed subset of \0,1\N can be obtained as a topological factor of the G-subaction of a (G × H1 × H2)-subshift of finite type (SFT) for any choice of infinite and finitely generated groups H1,H2. As a consequence, we obtain that every group of the form G1 × G2 × G3 admits a non-empty strongly aperiodic SFT subject to the condition that each Gi is finitely generated and has decidable word problem. As a corollary of this last result we prove the existence of non-empty strongly aperiodic SFT in a large class of branch groups, notably including the Grigorchuk group.