arXiv:2207.08233 Abstract | arXiv Analytics

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Simultaneous $\mathfrak{p}$-orderings and equidistribution

Published 2022-07-17Version 1

Let $D$ be a Dedekind domain. Roughly speaking, a simultaneous $\mathfrak{p}$-ordering is a sequence of elements from $D$ which is equidistributed modulo every power of every prime ideal in $D$ as well as possible. Bhargava asked which subsets of the Dedekind domains admit simultaneous $\mathfrak{p}$-orderings. We give an overview on the progress in this problem. We also explain how it relates to the theory of integer valued polynomials and list some open problems.

Comments: 14 pages, survey, to appear in conference proceedings "Algebras and Polynomials: Algebraic, Number Theoretic, and Topological Aspects of Ring Theory"

Categories: math.NT, math.AC

Subjects: 11N25, 11K38, 13F20, 11D57

Keywords: equidistribution, integer valued polynomials, open problems, prime ideal, dedekind domains admit simultaneous

Tags: conference paper

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