The Brauer group of Azumaya-Poisson \(S\)-algebras (Q2316770)

Let \(R\) be a commutative ring, \(H\) a Hopf algebra over \(R\), \(S\) an \(H\)-module algebra, and \(S\#H\) the smash product algebra of \(S\) and \(H\). The Brauer-Clifford group and Azumaya algebras in this category have been studied in [the author and \textit{A. Herman}, Algebr. Represent. Theory 16, No. 1, 101--127 (2013; Zbl 1270.16015)]. Consider the case, when \(S\) is a Poisson algebra over a field \(k\) and \(H\) is the enveloping algebra \(U(S)\) of \(S\). In the present paper, the author defines the Brauer group in the category of Poisson \(S\)-modules. This Brauer group turns out to be a subgroup of the Brauer-Clifford group of Azumaya algebras in the category of \(S\#U(S)\)-modules. It is an example of a Brauer group of a symmetric monoidal category. The author generalizes the Rosenberg-Zelinsky exact sequence for automorphisms of Azumaya-Poisson \(S\)-algebras and discusses the central twist group actions on the Brauer group of Azumaya-Poisson \(S\)-algebras.