Abstract

AbstractWe present a geometrically oriented classification theory for non-Abelian extensions of groupoids generalizing the classification theory for Abelian extensions of groupoids by Westman as well as the familiar classification theory for non-Abelian extensions of groups by Schreier and Eilenberg-MacLane. As an application of our techniques we demonstrate that each extension of groupoids $${\mathcal {N}}\rightarrow {\mathcal {E}}\rightarrow {\mathcal {G}}$$ N → E → G gives rise to a groupoid crossed product of $${\mathcal {G}}$$ G by the groupoid ring of $${\mathcal {N}}$$ N which recovers the groupoid ring of $${\mathcal {E}}$$ E up to isomorphism. Furthermore, we make the somewhat surprising observation that our classification methods naturally transfer to the class of groupoid crossed products, thus providing a classification theory for this class of rings. Our study is motivated by the search for natural examples of groupoid crossed products.

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