On the commutant of the principal subalgebra in the A1 lattice vertex algebra

Abstract

The coset (commutant) construction is a fundamental tool to construct vertex operator algebras from known vertex operator algebras. The aim of this paper is to provide a fundamental example of the commutants of vertex algebras ouside vertex operator algebras. Namely, the commutant C of the principal subalgebra W of the A1 lattice vertex operator algebra VA1 is investigated. An explicit minimal set of generators of C, which consists of infinitely many elements and strongly generates C, is introduced. It implies that the algebra C is not finitely generated. Furthermore, Zhu's Poisson algebra of C is shown to be isomorphic to an infinite-dimensional algebra C[x1,x2,…]/(xixj\,|\,i,j=1,2,…). In particular, the associated variety of C consists of a point. Moreover, W and C are verified to form a dual pair in VA1.