English

Submaximal Integral Domains

Rings and Algebras 2012-08-28 v1

Abstract

It is proved that if DD is a UFDUFD and RR is a DD-algebra, such that U(R)DU(D)U(R)\cap D\neq U(D), then RR has a maximal subring. In particular, if RR is a ring which either contains a unit xx which is not algebraic over the prime subring of RR, or RR has zero characteristic and there exists a natural number n>1n>1 such that 1nR\frac{1}{n}\in R, then RR has a maximal subring. It is shown that if RR is a reduced ring with R>220|R|>2^{2^{\aleph_0}} or J(R)0J(R)\neq 0, then any RR-algebra has a maximal subring. Residually finite rings without maximal subrings are fully characterized. It is observed that every uncountable UFDUFD has a maximal subring. The existence of maximal subrings in a noetherian integral domain RR, in relation to either the cardinality of the set of divisors of some of its elements or the height of its maximal ideals, is also investigated.

Keywords

Cite

@article{arxiv.1208.5298,
  title  = {Submaximal Integral Domains},
  author = {A. Azarang},
  journal= {arXiv preprint arXiv:1208.5298},
  year   = {2012}
}
R2 v1 2026-06-21T21:55:34.580Z