English

Split absolutely irreducible integer-valued polynomials over discrete valuation domains

Commutative Algebra 2022-03-16 v3

Abstract

Regarding non-unique factorization of integer-valued polynomials over a discrete valuation domain (R,M)(R,M) with finite residue field, it is known that there exist absolutely irreducible elements, that is, irreducible elements all of whose powers factor uniquely, and non-absolutely irreducible elements. We completely and constructively characterize the absolutely irreducible elements among split integer-valued polynomials. They correspond bijectively to finite sets, which we call \emph{balanced}, characterized by a combinatorial property regarding the distribution of their elements among residue classes of powers of MM. For each such balanced set as the set of roots of a split polynomial, there exists a unique vector of multiplicities and a unique constant so that the corresponding product of monic linear factors times the constant is an absolutely irreducible integer-valued polynomial. This also yields sufficient criteria for integer-valued polynomials over Dedekind domains to be absolutely irreducible.

Keywords

Cite

@article{arxiv.2107.14276,
  title  = {Split absolutely irreducible integer-valued polynomials over discrete valuation domains},
  author = {Sophie Frisch and Sarah Nakato and Roswitha Rissner},
  journal= {arXiv preprint arXiv:2107.14276},
  year   = {2022}
}

Comments

This version comes with the shortened introduction as it appears in the journal version. [v2] contains an extended introduction, the remaining sections are identical to [v3]

R2 v1 2026-06-24T04:39:59.544Z