Galois coverings, Morita equivalence and smash extensions of categories over a field
Abstract
We consider categories over a field k in order to prove that smash extensions and Galois coverings with respect to a finite group coincide up to Morita equivalence of k-categories. For this purpose we describe processes providing Morita equivalences called contraction and expansion. We prove that composition of these processes provides any Morita equivalence, a result which is related with the karoubianisation (or idempotent completion) and additivisation of a k-category.
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