Explore a 45-minute lecture on the 5-vertex model, presented by Richard Kenyon from Yale University at the Asymptotic Algebraic Combinatorics 2020 conference. Delve into this generalization of the lozenge tiling model, where each lattice path is assigned a weight per corner. Learn about the collaborative research conducted with Istvan Prause, Jan de Gier, and Sam Watson, focusing on the calculation of free energy, surface tension, and various probabilities. The lecture covers key topics such as the Lawson Model, Box Plane Partition, Eigenvector Formula, and local probabilities. Gain insights into the linearity of determinants and the sure function as part of this in-depth exploration of algebraic combinatorics.
Overview
Syllabus
Introduction
The 5Vertex Model
Lawson Model
Surface Tension
Box Plane Partition
Free Energy Calculation
Eigenvector Formula
Proof
Local probabilities
Sure function
Linearity of determinant
Taught by
Institute for Pure & Applied Mathematics (IPAM)