On automorphisms of B-admissible and related subshifts

Abstract

We adapt ideas of Kim and Roush [15], originally developed in the study of automorphisms of sofic subshifts, to obtain sufficient conditions under which a subshift has a huge automorphism group. We apply this approach to non-sofic subshifts defined by sets of multiples. In particular, we establish a dichotomy for the B-admissible subshift: its automorphism group is either trivial or contains an embedded copy of the automorphism group of the full shift \0,1\ Z. In the latter case, we say that the automorphism group is huge. We further show that the automorphism group of the hereditary closure of the B-free subshift is huge whenever B⊂ N is infinite and contains no infinite pairwise coprime subset.