Irreducibility of Virasoro representations in Liouville CFT

Guillaume Baverez, Baojun Wu

Published 2023-12-12Version 1

In the context of Liouville conformal field theory, we construct the highest-weight representations of the Virasoro algebra at the degenerate values of the conformal weight (Kac table). We show that these modules are irreducible, giving a complete characterization of the algebraic structure of Liouville CFT. It also implies that all singular vectors vanish, which is one of the main assumptions usually made in theoretical physics. Our proof uses inputs from both probability theory and algebra, and gives new probabilistic content to the Kac table. Combining the information that singular vectors vanish with the main geometric properties of conformal blocks, we deduce that conformal blocks involving degenerate primary fields satisfy null-vector equations. These equations take the form of PDEs on the Teichm\"uller space of the underlying surface and generalize previous works in several directions.