Deligne categories and the periplectic Lie superalgebra

Abstract

We study stabilization of finite-dimensional representations of the periplectic Lie superalgebras p(n) as n ∞. The paper gives a construction of the tensor category Rep(P), possessing nice universal properties among tensor categories over the category sVect of finite-dimensional complex vector superspaces. First, it is the "abelian envelope" of the Deligne category corresponding to the periplectic Lie superalgebra, in the sense of arXiv:1511.07699. Secondly, given a tensor category C over sVect, exact tensor functors Rep(P) C classify pairs (X, ω) in C where ω: X X 1 is a non-degenerate symmetric form and X not annihilated by any Schur functor. The category Rep(P) is constructed in two ways. The first construction is through an explicit limit of the tensor categories Rep(p(n)) (n≥ 1) under Duflo-Serganova functors. The second construction (inspired by P. Etingof) describes Rep(P) as the category of representations of a periplectic Lie supergroup in the Deligne category sVect Rep(GLt). An upcoming paper by the authors will give results on the abelian and tensor structure of Rep(P).