Talk page
Title:
Integrable models on lattices and dualities of supersymmetric indices
Speaker:
Abstract:
In this talk I will consider two different types of integrable models that live on lattices. The first are the integrable lattice models of statistical mechanics which satisfy a special form of Yang-Baxter equation known as the star-triangle relation, the most famous example of which is the Ising model. The second are the integrable systems of discrete soliton equations which satisfy integrability in terms of a property known as multidimensional consistency. These provide discrete counterparts of integrable differential soliton equations such as the famous Korteweg-de Vries (KdV) equation.
Link:
Workshop: