English

Partial generalized crossed products and a seven term exact sequence (expanded version)

Rings and Algebras 2022-11-08 v4

Abstract

Given a non-necessarily commutative unital ring RR and a unital partial representation Θ\Theta of a group GG into the Picard semigroup PicS(R)\mathbf{PicS} (R) of the isomorphism classes of partially invertible RR-bimodules, we construct an abelian group C(Θ/R)\mathcal{C}(\Theta /R) formed by the isomorphism classes of partial generalized crossed products related to Θ\Theta and identify an appropriate second partial cohomology group of GG with a naturally defined subgroup C0(Θ/R)\mathcal{C}_0(\Theta /R) of C(Θ/R).\mathcal{C}(\Theta /R). Then we use the obtained results to give an analogue of the Chase-Harrison-Rosenberg exact sequence associated with an extension of non-necessarily commutative rings RSR\subseteq S with the same unity and a unital partial representation GSR(S) G \to \mathcal{S}_R(S) of an arbitrary group GG into the monoid SR(S)\mathcal{S}_R(S) of the RR-subbimodules of S.S. This generalizes the works by Kanzaki and Miyashita.

Keywords

Cite

@article{arxiv.2105.01268,
  title  = {Partial generalized crossed products and a seven term exact sequence (expanded version)},
  author = {Mikhailo Dokuchaev and Itailma Rocha},
  journal= {arXiv preprint arXiv:2105.01268},
  year   = {2022}
}
R2 v1 2026-06-24T01:45:17.553Z