Partial generalized crossed products, Brauer groups and a comparison of seven-term exact sequences
Abstract
Given a unital partial action α of a group G on a commutative ring R we denote by PicS Rα(R) the Picard monoid of the isomorphism classes of partially invertible R-bimodules, which are central over the subring Rα ⊂eq R of α-invariant elements, and consider a specific unital partial representation : G PicS Rα(R), along with the abelian group C(/R) of the isomorphism classes of partial generalized crossed products related to , which already showed their importance in obtaining a partial action analogue of the Chase-Harrison-Rosenberg seven-term exact sequence. We give a description of C(/R) in terms partial generalized products of the form D(f ) where f is partial 1-cocycle of G with values in a submonoid of PicSRα(R). Assuming that G is finite and that Rα ⊂eq R is a partial Galois extension, we prove that any Azumaya Rα-algebra, containing R as a maximal commutative subalgebra, is isomorphic to a partial generalized crossed product. Furthermore, we show that the relative Brauer group B(R/Rα) can be seen as a quotient of C(/R) by a subgroup isomorphic to the Picard group of R. Finally, we prove that the analogue of the Chase-Harrison-Rosenberg sequence, obtained earlier for partial Galois extensions of commutative rings, can be derived from a recent seven-term exact sequence established in a non-commutative setting.
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