Double groupoids and 2-groupoids in regular Mal'tsev categories

Abstract

We prove that the category 2- Grpd(C) of internal 2-groupoids is a Birkhoff subcategory of the category Grpd2(C) of double groupoids in a regular Mal'tsev category C with finite colimits. In particular, when C is a Mal'tsev variety of universal algebras, the category 2- Grpd(C) is also a Mal'tsev variety, of which we describe the corresponding algebraic theory. When C is a naturally Mal'tsev category, the reflector from Grpd2(C) to 2- Grpd(C) has an additional property related to the commutator of equivalence relations. We prove that the category 2- Grpd(C) is semi-abelian when C is semi-abelian, and then provide sufficient conditions for 2- Grpd(C) to be action representable.

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