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Tom Alberts: Conformal field theory of Gaussian free fields in a multiply connected domain

Time: Thu 2024-12-05 14.00 - 15.00

Location: Zoom

Video link: Meeting ID: 921 756 1880

Participating: Tom Alberts, University of Utah

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Abstract:

 We implement a version of conformal field theory (CFT) that gives a connection to SLE in a multiply connected domain. Our approach is based on the Gaussian free field and applies to CFTs with central charge c=1. In this framework we introduce the generalized Eguchi-Ooguri equations and use them to derive the explicit form of Ward’s equations, which describe the insertion of a stress tensor in terms of Lie derivatives and differential operators depending on the Teichmuller modular parameters. Furthermore, by implementing the BPZ equations, we provide a conformal field theoretic realization of an SLE in a multiply connected domain, which in particular suggests its drift function, and construct a class of martingale observables for this SLE process. Joint work with Sung-Soo Byun and Nam-Gyu Kang.