Statistical physics predicts that, for a wide class of ferromagnetic spin systems, the asymptotic free energy density is given by the Bethe prediction, the maximum of the Bethe free energy over all ‘meaningful’ fixed points, commonly termed as pure states, of the belief propagation equations. If the Bethe free energy is maximized by a unique pure state then the ferromagnetic spin system, in the large n limit, is further conjectured to be governed by that pure state, while if there are multiple maximizers then the system is predicted to be governed in the limit by a mixture of such maximizers. These conjectures have been in the physics literature for quite some time. However, verifying them rigorously poses serious mathematical challenges. In this talk, we discuss progress towards these conjectures for the ferromagnetic Potts model and the associated random cluster measure, with an external magnetic field, on locally tree-like graphs when the limiting tree is a regular tree. Joint work with Amir Dembo and Allan Sly.
Zoom link: https://us02web.zoom.us/j/88670406480
Meeting ID: 886 7040 6480
This is part of the Bangalore Probability Seminar Series. For details of past and upcoming seminars kindly see Link