Tensor envelopes of regular categories

Abstract

We extend the calculus of relations to embed a regular category A into a family of pseudo-abelian tensor categories T(A,d) depending on a degree function d. Under the condition that all objects of A have only finitely many subobjects, our main results are as follows: 1. Let N be the maximal proper tensor ideal of T(A,d). We show that T(A,d)/N is semisimple provided that A is exact and Mal'cev. Thereby, we produce many new semisimple, hence abelian, tensor categories. 2. Using lattice theory, we give a simple numerical criterion for the vanishing of N. 3. We determine all degree functions for which T(A,d) is Tannakian. As a result, we are able to interpolate the representation categories of many series of profinite groups such as the symmetric groups Sn, the hyperoctahedral groups Sn Z2n, or the general linear groups GL(n,Fq) over a fixed finite field. This paper generalizes work of Deligne, who first constructed the interpolating category for the symmetric groups Sn. It also extends (and provides proofs for) a previous paper math.CT/0605126 on the special case of abelian categories.

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