English

Epsilon-strongly graded rings, separability and semisimplicity

Rings and Algebras 2018-02-13 v3

Abstract

We introduce the class of epsilon-strongly graded rings and show that it properly contains both the class of strongly graded rings and the class of unital partial crossed products. We determine precisely when an epsilon-strongly graded ring is separable over its principal component. Thereby, we simultaneously generalize a result for strongly group graded rings by Nastasescu, Van den Bergh and Van Oystaeyen, and a result for unital partial crossed products by Bagio, Lazzarin and Paques. We also show that the class of unital partial crossed products appear in the class of epsilon-strongly graded rings in a fashion similar to how the classical crossed products present themselves in the class of strongly graded rings. Thereby, we obtain, in the special case of unital partial crossed products, a short proof of a general result by Dokuchaev, Exel and Sim\'{o}n concerning when graded rings can be presented as partial crossed products. We also provide some interesting classes of examples of separable epsilon-strongly graded rings, with finite as well as infinite grading groups. In particular, we obtain an answer to a question raised by Le Bruyn, Van den Bergh and Van Oystaeyen in 1988.

Cite

@article{arxiv.1606.07592,
  title  = {Epsilon-strongly graded rings, separability and semisimplicity},
  author = {Patrik Nystedt and Johan Öinert and Héctor Pinedo},
  journal= {arXiv preprint arXiv:1606.07592},
  year   = {2018}
}

Comments

20 pages

R2 v1 2026-06-22T14:33:19.984Z