Derived H-module endomorphism rings

Abstract

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 M·∈ D(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∈ZD(A)(M·,M·[i]) and EB(M·)=i∈ZD(B)(M·,M·[i]). If H is a finite dimensional semisimple Hopf algebra, then EA(M·) is a graded subalgebra 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.