The structure of corings: Induction functors, Maschke-type theorem, and Frobenius and Galois-type properties

Abstract

Given a ring A and an A-coring we study when the forgetful functor from the category of right -comodules to the category of right A-modules and its right adjoint -A are separable. We then proceed to study when the induction functor -A is also the left adjoint of the forgetful functor. This question is closely related to the problem when A A Hom(,A) is a Frobenius extension. We introduce the notion of a Galois coring and analyse when the tensor functor over the subring of A fixed under the coaction of is an equivalence. We also comment on possible dualisation of the notion of a coring.

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