Hopf Galois Extension in Braided Tensor Categories

Abstract

The relation between crossed product and H-Galois extension in braided tensor category C with equivalisers and coequivalisers is established. That is, it is shown that if there exist an equivaliser and a coequivaliser for any two morphisms in C, then A = B #σ H is a crossed product algebra if and only if the extension A/B is Galois, the canonical epic q: A A AB A is split and A is isomorphic as left B-modules and right H-comodules to B H in C.

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