Decomposition of integer-valued polynomial algebras
Abstract
Let be a commutative domain with field of fractions , let be a torsion-free -algebra, and let be the extension of to a -algebra. The set of integer-valued polynomials on is , and the intersection of with is , which is a commutative subring of . The set may or may not be a ring, but it always has the structure of a left -module. A -algebra which is free as a -module and of finite rank is called -decomposable if a -module basis for is also an -module basis for ; in other words, if can be generated by and . A classification of such algebras has been given when is a Dedekind domain with finite residue rings. In the present article, we modify the definition of -decomposable so that it can be applied to -algebras that are not necessarily free by defining to be -decomposable when . We then provide multiple characterizations of such algebras in the case where is a discrete valuation ring or a Dedekind domain with finite residue rings. In particular, if is the ring of integers of a number field , we show that -decomposable algebras correspond to maximal -orders in a separable -algebra , whose simple components have as center the same finite unramified Galois extension of and are unramified at each finite place of . Finally, when both and are rings of integers in number fields, we show that -decomposable algebras correspond to unramified Galois extensions of .
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