Video URL
https://pirsa.org/26030075Modular Functors from Conformal Blocks of Rational Vertex Operator Algebras
APA
Damiolini, C. (2026). Modular Functors from Conformal Blocks of Rational Vertex Operator Algebras. Perimeter Institute for Theoretical Physics. https://pirsa.org/26030075
MLA
Damiolini, Chiara. Modular Functors from Conformal Blocks of Rational Vertex Operator Algebras. Perimeter Institute for Theoretical Physics, Mar. 06, 2026, https://pirsa.org/26030075
BibTex
@misc{ scivideos_PIRSA:26030075,
doi = {10.48660/26030075},
url = {https://pirsa.org/26030075},
author = {Damiolini, Chiara},
keywords = {Mathematical physics},
language = {en},
title = {Modular Functors from Conformal Blocks of Rational Vertex Operator Algebras},
publisher = {Perimeter Institute for Theoretical Physics},
year = {2026},
month = {mar},
note = {PIRSA:26030075 see, \url{https://scivideos.org/pirsa/26030075}}
}
Chiara Damiolini The University of Texas at Austin
Abstract
Given a vertex operator algebra V, one can define sheaves of conformal blocks on moduli spaces of curves following constructions of Ben-Zvi--Frenkel and Damiolini--Gibney--Tarasca. When V is strongly rational, these sheaves are vector bundles equipped with a projectively flat connection. In this talk, I will explain how these bundles satisfy the compatibility conditions required to form a modular functor. A key consequence of this result is that the category C_V of admissible V-modules is a modular fusion category. This provides a purely algebro-geometric construction of the tensor product on C_V, which is expected to agree with the tensor product defined by Huang and Lepowsky using analytic methods. Time permitting, I will discuss open questions concerning extensions beyond the rational setting. This is joint work with Lukas Woike.