Representation of n-abelian categories in abelian categories

Abstract

Let M be a small n-abelian category. We show that the category of absolutely pure group valued functors over M, denote by L2(M,G), is an abelian category and M is equivalent to a full subcategory of L2(M,G) in such a way that n-kernels and n-cokernels are precisely exact sequences of L2(M,G) with terms in M. This gives a higher-dimensional version of the Freyd-Mitchell embedding theorem for n-abelian categories.