Higher extensions in exact Mal'tsev categories: distributivity of congruences and the 3n-Lemma

Abstract

The aim of this article is to better understand the correspondence between n-cubic extensions and 3n-diagrams, which may be seen as non-abelian Yoneda extensions, useful in (co)homology of non-abelian algebraic structures. We study a higher-dimensional version of the coequaliser/kernel pair adjunction, which relates n-fold reflexive graphs with n-fold arrows in any exact Mal'tsev category. We first ask ourselves how this adjunction restricts to an equivalence of categories. This leads to the concept of an effective n-fold equivalence relation, corresponding to the n-fold regular epimorphisms. We characterise those in terms of what (when n=2) Bourn calls parallelistic n-fold equivalence relations. We then further restrict the equivalence, with the aim of characterising the n-cubic extensions. We find a congruence distributivity condition, resulting in a denormalised 3n-Lemma valid in exact Mal'tsev categories. We deduce a 3n-Lemma for short exact sequences in semi-abelian categories, which involves a distributivity condition between joins and meets of normal subobjects. This turns out to be new even in the abelian case.