Rationality of the vertex algebra VL+ when L is a nondegenerate even lattice of arbitrary rank

Abstract

In this paper we prove that the vertex algebra VL+ is rational if L is a negative definite even lattice of finite rank, or if L is a non-degenerate even lattice of a finite rank that is neither positive definite nor negative definite. In particular, for such even lattices L, we show that the Zhu algebras of the vertex algebras VL+ are semisimple. This extends the result of Abe which establishes the rationality of VL+ when L is a positive definite even lattice of finite rank.