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Christoforos Panagiotis (University of Bath)
Tuesday 05 March 2024, 14:00-15:00
Quantitative sub-ballisticity of self-avoiding walk on the hexagonal lattice
- đ¤ Speaker: Christoforos Panagiotis (University of Bath)
- đ Date & Time: Tuesday 05 March 2024, 14:00 - 15:00
- đ Venue: MR12
Abstract
In this talk, we will consider the self-avoiding walk on the hexagonal lattice, which is one of the few lattices whose connective constant can be computed explicitly. This was proved by Duminil-Copin and Smirnov in 2012 when they introduced the parafermionic observable. In this talk, we will use the observable to show that, with high probability, a self-avoiding walk of length n does not exit a ball of radius n/logn. This improves on an earlier result of Duminil-Copin and Hammond, who obtained a non-quantitative o(n) bound. Along the way, we show that at criticality, the partition function of bridges of height T decays polynomially fast to 0. Joint work with Dmitrii Krachun.
Series This talk is part of the Probability series.
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