Generalized heredity in B-free systems

Abstract

Let B⊂eq N be a primitive set. We complement results on heredity of the B-free subshift Xη from [arxiv:1509.08010] in two directions: In the proximal case we prove that a subshift X, which micht be slightly larger than the subshift Xη, is always hereditary. (There is no need to assume that the set B is taut or even has light tails, but if B is taut, then X=Xη.) We also generalize the the concept of heredity to the non-proximal (and hence non-hereditary) case by proving that X is always "hereditary away from its unique minimal subsystem" (which is always Toeplitz). Finally we characterize regularity of this Toeplitz subsystem equivalently by the condition mH(int(W))=0, where W ("the window") is a subset of a compact abelian group H canonically associated with the set B, and mH denotes Haar measure on H. Throughout, results from [arxiv:1702.02375] are heavily used.