On the Strong Unital Property for the Affine VOAs

Abstract

Representations of vertex operator algebras V (VOAs) have numerous applications, including the construction of sheaves of conformal blocks on moduli spaces of curves. For a V-module W = Wd, a sequence of associative algebras Ad acts on each graded component Wd. When these dth-mode transition algebras Ad are strongly unital - meaning they are unital with units acting as the identity on Wd - the associated sheaves of conformal blocks are vector bundles rather than merely coherent sheaves. This strong unital property, while difficult to verify in practice, has other important implications as well. Here we construct explicit strong units for Lsl2(1,0), the simple affine VOA for sl2 at level 1, and establish that mode transition algebras for universal affine VOAs for sl2 are never strongly unital at any level k not equal to the critical level -2.