Authors: Caenepeel, Stefaan
Femić, Bojana 
Title: The brauer group of azumaya corings and the second cohomology group
Journal: K-Theory
Volume: 34
Issue: 4
First page: 361
Last page: 393
Issue Date: 1-Apr-2005
Rank: M22
ISSN: 0920-3036
DOI: 10.1007/s10977-005-3108-4
Abstract: 
Let R be a commutative ring. An Azumaya coring consists of a couple (S,C), with S a faithfully flat commutative R-algebra, and an S-coring C satisfying certain properties. If S is faithfully projective, then the dual of C is an Azumaya algebra. Equivalence classes of Azumaya corings form an abelian group, called the Brauer group of Azumaya corings. This group is canonically isomorphic to the second flat cohomology group. We also give algebraic interpretations of the second Amitsur cohomology group and the first Villamayor-Zelinsky cohomology group in terms of corings.
Keywords: Comatrix coring | Descent theory | Galois coring
Publisher: Springer Link

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