## The truncated correlations of the Ising model in any dimension decay exponentially fast at all but the critical temperature

### Jeudi 18 octobre 2018 15:45-16:45 - Subhajit Goswami - IHES

Résumé : Our main result is that the truncated two-point function of the nearest-neighbor ferromagnetic Ising model on the hypercubic lattice in dimensions 3 and higher decay exponentially fast below the critical temperature. We will see that this is a consequence of a similar bound on the rate at which the finite volume FK-Ising meaures converge to the infinite volume FK-Ising measure. In order to prove the last statement we use yet another percolation model known as the random currents intiated by Griffiths, Hurst, Sherman (1970) and Aizenman (1982) for analyzing Ising correlations. Our approach is thus based on an eclectic combination of different representations for the correlation function of Ising. Based on a joint work with Hugo Duminil-Copin and Aran Raoufi.

Lieu : 3L15

The truncated correlations of the Ising model in any dimension decay exponentially fast at all but the critical temperature  Version PDF
mai 2020 :
 Département de Mathématiques Bâtiment 307 Faculté des Sciences d'Orsay Université Paris-Saclay F-91405 Orsay Cedex Tél. : +33 (0) 1-69-15-79-56 Département Fermeture du département Laboratoire Formation