Conformal blocks, parenthesized braid operad, and c=1/2 Virasoro vertex operator algebra

Abstract

We review the construction of a pseudo-braided category structure on the C1-cofinite module category of a vertex operator algebra using conformal blocks and analytic continuation along paths in configuration spaces. In the rational C2-cofinite case, the pseudo-braided category is represented by tensor products and becomes a balanced braided tensor category. We then compute all four-point conformal blocks of the Virasoro vertex operator algebra of central charge 1/2 in terms of hypergeometric functions. We explain how analytic continuation of these blocks determines the braiding and associator, and identify the resulting module category with the Tambara--Yamagami category over Z2 as a balanced braided tensor category.