Invariant measures for B-free systems revisited

Abstract

For B ⊂eq N , the B -free subshift Xη is the orbit closure of the characteristic function of the set of B -free integers. We show that many results about invariant measures and entropy, previously only known for the hereditary closure of Xη , have their analogues for Xη as well. In particular, we settle in the affirmative a conjecture of Keller about a description of such measures ([Keller, G. Generalized heredity in B-free systems. Stoch. Dyn. 21, 3 (2021), Paper No. 2140008]). A central assumption in our work is that η* (the Toeplitz sequence that generates the unique minimal component of Xη ) is regular. From this we obtain natural periodic approximations that we frequently use in our proofs to bound the elements in Xη from above and below.