Azumaya Algebras Without Involution
Abstract
Generalizing a theorem of Albert, Saltman showed that an Azumaya algebra over a ring represents a -torsion class in the Brauer group if and only if there is an algebra in the Brauer class of admitting an involution of the first kind. Knus, Parimala, and Srinivas later showed that one can choose such that . We show that is the lowest degree one can expect in general. Specifically, we construct an Azumaya algebra of degree and period such that the degree of any algebra in the Brauer class of admitting an involution is divisible by . Separately, we provide examples of split and non-split Azumaya algebras of degree admitting symplectic involutions, but no orthogonal involutions. These stand in contrast to the case of central simple algebras of even degree over fields, where the presence of a symplectic involution implies the existence of an orthogonal involution and vice versa.
Keywords
Cite
@article{arxiv.1510.06133,
title = {Azumaya Algebras Without Involution},
author = {Asher Auel and Uriya A. First and Ben Williams},
journal= {arXiv preprint arXiv:1510.06133},
year = {2020}
}
Comments
18 pages; change from previous version: very mild correction to Proposition 9