English

Decomposition of integer-valued polynomial algebras

Rings and Algebras 2021-07-19 v4

Abstract

Let DD be a commutative domain with field of fractions KK, let AA be a torsion-free DD-algebra, and let BB be the extension of AA to a KK-algebra. The set of integer-valued polynomials on AA is Int(A)={fB[X]f(A)A}{\rm Int}(A) = \{f \in B[X] \mid f(A) \subseteq A\}, and the intersection of Int(A){\rm Int}(A) with K[X]K[X] is IntK(A){\rm Int}_K(A), which is a commutative subring of K[X]K[X]. The set Int(A){\rm Int}(A) may or may not be a ring, but it always has the structure of a left IntK(A){\rm Int}_K(A)-module. A DD-algebra AA which is free as a DD-module and of finite rank is called IntK{\rm Int}_K-decomposable if a DD-module basis for AA is also an IntK(A){\rm Int}_K(A)-module basis for Int(A){\rm Int}(A); in other words, if Int(A){\rm Int}(A) can be generated by IntK(A){\rm Int}_K(A) and AA. A classification of such algebras has been given when DD is a Dedekind domain with finite residue rings. In the present article, we modify the definition of IntK{\rm Int}_K-decomposable so that it can be applied to DD-algebras that are not necessarily free by defining AA to be IntK{\rm Int}_K-decomposable when Int(A)IntK(A)DA{\rm Int}(A) \cong {\rm Int}_K(A) \otimes_D A. We then provide multiple characterizations of such algebras in the case where DD is a discrete valuation ring or a Dedekind domain with finite residue rings. In particular, if DD is the ring of integers of a number field KK, we show that IntK{\rm Int}_K-decomposable algebras AA correspond to maximal DD-orders in a separable KK-algebra BB, whose simple components have as center the same finite unramified Galois extension FF of KK and are unramified at each finite place of FF. Finally, when both DD and AA are rings of integers in number fields, we show that IntK{\rm Int}_K-decomposable algebras correspond to unramified Galois extensions of KK.

Keywords

Cite

@article{arxiv.1604.08337,
  title  = {Decomposition of integer-valued polynomial algebras},
  author = {Giulio Peruginelli and Nicholas J. Werner},
  journal= {arXiv preprint arXiv:1604.08337},
  year   = {2021}
}

Comments

to appear in J. Pure Appl. Algebra (2017). comments are welcome

R2 v1 2026-06-22T13:43:14.202Z