A note on the affine vertex algebra associated to gl(1 1) at the critical level and its generalizations

Abstract

In this note we present an explicit realization of the affine vertex algebra Vcri(gl(1 1)) inside of the tensor product F M where F is a fermionic verex algebra and M is a commutative vertex algebra. This immediately gives an alternative description of the center of Vcri(gl(1 1) ) ) as a subalgebra M 0 of M. We reconstruct the Molev-Mukhin formula for the Hilbert-Poincare series of the center of V cri(gl(1 1) ). Moreover, we construct a family of irreducible Vcri(gl(1 1)) -modules realized on F and parameterized by +, - ∈ C((z)). We propose a generalization of V cri(gl(1 1)) as a critical level version of the super W1+∞ vertex algebra.