Title: Meromorphic connections on the sphere, loop equations and topological recursion
2014.12.11 |
| Date | Thu 18 Dec |
| Time | 14:15 — 15:15 |
| Location | 1531-113 (Aud. D1) |
Abstract: Starting with a basis of covariantly constant sections of a meromorphic connection on the Riemann sphere, I will describe the construction of correlators that solve loop equations. It can be seen as a tool to study the all-order WKB expansion. When this expansion is "of topological type", it can fully described in terms of the topological recursion of Eynard and Orantin. I will give illustration with integrable equations related to the (p,q) minimal models of CFT.
This is based on a joint work with Bergere and Eynard.
