Last Passage Percolation in a Strip - Integrable Probability and Growth Models

Watch a 56-minute lecture exploring Last Passage Percolation in a strip, presented by Guillaume Barraquand at the International Centre for Theoretical Sciences. Part of a comprehensive program on discrete integrable systems, this talk delves into integrable probability and stochastic growth models related to the KPZ equation. Learn about the mathematical frameworks underlying interacting particle systems, random tilings, and their connections to quantum integrable systems and symmetric functions theory. The presentation is part of a broader two-week program that combines mini-courses, problem sessions, and workshops exploring various aspects of discrete integrable systems, including difference equations, cluster algebras, and probabilistic models. Suitable for researchers and academics interested in theoretical physics, mathematics, and integrable systems.