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DERIVED H-MODULE ENDOMORPHISM RINGS

Published online by Cambridge University Press:  25 August 2010

JI-WEI HE
Affiliation:
Department of Mathematics, Shaoxing College of Arts and Sciences, Shaoxing, Zhejiang 312000, China Department of Mathematics and Computer Science, University of Antwerp, Middelheimlaan 1, B-2020 Antwerp, Belgium e-mail: jwhe@usx.edu.cn
FRED VAN OYSTAEYEN
Affiliation:
Department of Mathematics and Computer Science, University of Antwerp, Middelheimlaan 1, B-2020 Antwerp, Belgium e-mail: fred.vanoystaeyen@ua.ac.be
YINHUO ZHANG
Affiliation:
Department WNI, University of Hasselt, 3590 Diepenbeek, Belgium e-mail: yinhuo.zhang@uhasselt.be
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Abstract

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Let H be a Hopf algebra, A/B be an H-Galois extension. Let D(A) and D(B) be the derived categories of right A-modules and of right B-modules, respectively. An object MD(A) may be regarded as an object in D(B) via the restriction functor. We discuss the relations of the derived endomorphism rings EA(M) = ⊕i∈ℤHomD(A)(M, M[i]) and EB(M) = ⊕i∈ℤHomD(B)(M, M[i]). If H is a finite-dimensional semi-simple Hopf algebra, then EA(M) is a graded sub-algebra of EB(M). In particular, if M is a usual A-module, a necessary and sufficient condition for EB(M) to be an H*-Galois graded extension of EA(M) is obtained. As an application of the results, we show that the Koszul property is preserved under Hopf Galois graded extensions.

Keywords

Type
Research Article
Copyright
Copyright © Glasgow Mathematical Journal Trust 2010

References

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