Date(s) : 15/01/2021 iCal
11 h 00 min - 12 h 00 min
Liouville theory is a fundamental example of a conformal field theory (CFT) first introduced by A. Polyakov in the context of string theory. In recent years it has been rigorously studied using probabilistic techniques. In this talk we will study the integrable structure of Liouville CFT on a domain with boundary by proving exact formulas for its correlation functions. We will also explain connections with SLE curves. Based on joint work with Morris Ang, Xin Sun and Tunan Zhu.
Retransmission sur BBB (avec toujours les mêmes identifiant et mot de passe).