Vertex algebras related to regular representations of $SL_2$
Vertex algebras related to regular representations of $SL_2$
We construct a family of potentially quasi-lisse (non-rational) vertex algebras, denoted by $\mathcal{C}_p$, $p \geq 2$, which are closely related to the vertex algebra of chiral differential operators on $SL(2)$ at level $-2+\frac{1}{p}$. The parameter $p$ also serves as a dilation parameter of the weight lattice of $A_1$. We prove …