Semi-Invariant Subrings
Abstract
We say that a subring of a ring is semi-invariant if is the ring of invariants in under some set of ring endomorphisms of some ring containing . We show that is semi-invariant if and only if there is a ring and a set such that ; in particular, centralizers of subsets of are semi-invariant subrings. We prove various properties of semi-invariant subrings and show how they can be used for various applications including: (1) The center of a semiprimary (resp. right perfect) ring is semiprimary (resp. right perfect). (2) If is a finitely presented module over a "good" semiperfect ring (e.g. an inverse limit of semiprimary rings), then is semiperfect, hence has a Krull-Schmidt decomposition. (This generalizes results of Bjork and Rowen). (3) If is a representation of a monoid or a ring over a module with a "good" semiperfect endomorphism ring (in the sense of (2)), then has a Krull-Schmidt decomposition. (4) If is a "good" commutative semiperfect ring and is an -algebra that is f.p.\ as an -module, then is semiperfect. (5) Let be rings and let be a right -module. If is semiprimary (resp. right perfect), then is semiprimary (resp. right perfect).
Cite
@article{arxiv.1212.2124,
title = {Semi-Invariant Subrings},
author = {Uriya A. First},
journal= {arXiv preprint arXiv:1212.2124},
year = {2015}
}
Comments
31 pages