Deligne categories and the limit of categories Rep(GL(m|n))

Abstract

For each integer t a tensor category Vt is constructed, such that exact tensor functors Vt C classify dualizable t-dimensional objects in C not annihilated by any Schur functor. This means that Vt is the "abelian envelope" of the Deligne category Rep(GLt). Any tensor functor Rep(GLt) C is proved to factor either through Vt or through one of the classical categories Rep(GL(m|n)) with m-n=t. The universal property of Vt implies that it is equivalent to the categories RepRep(GLt1) Rep(GLt2)(GL(X),ε), (t=t1+t2, t1 not integer) suggested by Deligne as candidates for the role of abelian envelope.