Minimality of B-free systems in number fields

Abstract

Let K be a finite extension of Q and OK be its ring of integers. Let B be a primitive collection of ideals in OK. We show that any B-free system is essentially minimal. Moreoever, the B-free system is minimal if and only if the characteristic function of B-free numbers is a Toeplitz sequence. Equivalently, there are no ideal d and no infinite pairwise coprime collection of ideals C such that dC⊂eqB. Moreover, we find a periodic structure in the Toeplitz case. Last but not least, we describe the restrictions on the cosets of ideals contained in unions of ideals.

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