A categorification of the boson-fermion correspondence via representation theory of $sl(∞)

Abstract

In recent years different aspects of categorification of the boson-fermion correspondence have been studied. In this paper we propose a categorification of the boson-fermion correspondence based on the category of tensor modules of the Lie algebra sl(∞) of finitary infinite matrices. By T+ we denote the category of "polynomial" tensor sl(∞)-modules. There is a natural "creation" functor TN: T+ T+, M N M, M,N∈ T+. The key idea of the paper is to employ the entire category T of tensor sl(∞)-modules in order to define the "annihilation" functor DN: T+ T+ corresponding to TN. We show that the relations allowing to express fermions via bosons arise from relations in the cohomology of complexes of linear endofunctors on T+.