Skolem-Noether algebras
Abstract
An algebra is called a Skolem-Noether algebra (SN algebra for short) if for every central simple algebra , every homomorphism extends to an inner automorphism of . One of the important properties of such an algebra is that each automorphism of a matrix algebra over is the composition of an inner automorphism with an automorphism of . The bulk of the paper is devoted to finding properties and examples of SN algebras. The classical Skolem-Noether theorem implies that every central simple algebra is SN. In this article it is shown that actually so is every semilocal, and hence every finite-dimensional algebra. Not every domain is SN, but, for instance, unique factorization domains, polynomial algebras and free algebras are. Further, an algebra is SN if and only if the power series algebra is SN.
Cite
@article{arxiv.1706.08976,
title = {Skolem-Noether algebras},
author = {Matej Brešar and Christoph Hanselka and Igor Klep and Jurij Volčič},
journal= {arXiv preprint arXiv:1706.08976},
year = {2018}
}