The City College of New YorkCCNY
Department of Mathematics
Division of Science

Ising model, total positivity, and criticality

Mathematics Colloquium

Time and place

12:30–1:30 PM on Thursday, September 23rd, 2021; Zoom link https://ccny.zoom.us/j/92057419965

Pavel Galashin (UCLA)

Abstract

The Ising model, introduced in 1920, is one of the most well-studied models in statistical mechanics. It is known to undergo a phase transition at critical temperature, and has attracted considerable interest over the last two decades due to special properties of its scaling limit at criticality. The totally nonnegative Grassmannian is a subset of the real Grassmannian introduced by Postnikov in 2006. It arises naturally in Lusztig's theory of total positivity and canonical bases, and is closely related to cluster algebras and scattering amplitudes. I will give some background on the above objects and then explain a precise relationship between the planar Ising model and the totally nonnegative Grassmannian, obtained in our recent work with P. Pylyavskyy. Building on this connection, I will give a new boundary correlation formula for the critical Ising model.

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