Intrinsic ergodicity for B-free integers in number fields
Abstract
Let K be a number field with ring of integers OK, and let B be an Erdős family of ideals in OK. We prove that the associated B-free subshift (XB,(Sa)a∈OK) is intrinsically ergodic: it carries a unique measure of maximal entropy, which we identify explicitly as a relatively independent extension of the Haar rotation on Πb∈BOK/b. This is the first proof of intrinsic ergodicity for B-free systems beyond dimension one, and relies on the work of Araújo--Dymek--Kułaga-Przymus. Via their reductions, we also settle the k-free and B-free lattice-point cases and the k-free number-field case. We give two independent proofs of the underlying rigidity statement: one through a single-site relative-entropy argument, and one through an exact-tiling realisation of Peckner's induce-and-split scheme.
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