The Mapping Class Group of a Minimal Subshift

Abstract

For a homeomorphism T X X of a Cantor set X, the mapping class group M(T) is the group of isotopy classes of orientation-preserving self-homeomorphisms of the suspension TX. The group M(T) can be interpreted as the symmetry group of the system (X,T) with respect to the flow equivalence relation. We study M(T), focusing on the case when (X,T) is a minimal subshift. We show that when (X,T) is a subshift associated to a substitution, the group M(T) is an extension of Z by a finite group; for a large class of substitutions including Pisot type, this finite group is a quotient of the automorphism group of (X,T). When (X,T) is a minimal subshift of linear complexity satisfying a no-infinitesimals condition, we show that M(T) is virtually abelian. We also show that when (X,T) is minimal, M(T) embeds into the Picard group of the crossed product algebra C(X) T Z.