HAL : hal-00272925, version 1

arXiv : 0804.2208

DOI : 10.1007/s00220-009-0782-8

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Communications in Mathematical Physics 289, 1 (2009) 157-204

Surface tension in the dilute Ising model. The Wulff construction.

Marc Wouts 1

(01/07/2009)

We study the surface tension and the phenomenon of phase coexistence for the Ising model on $\mathbbm{Z}^d$ ($d \geqslant 2$) with ferromagnetic but random couplings. We prove the convergence in probability (with respect to random couplings) of surface tension and analyze its large deviations : upper deviations occur at volume order while lower deviations occur at surface order. We study the asymptotics of surface tension at low temperatures and relate the quenched value $\tau^q$ of surface tension to maximal flows (first passage times if $d = 2$). For a broad class of distributions of the couplings we show that the inequality $\tau^a \leqslant \tau^q$ -- where $\tau^a$ is the surface tension under the averaged Gibbs measure -- is strict at low temperatures. We also describe the phenomenon of phase coexistence in the dilute Ising model and discuss some of the consequences of the media randomness. All of our results hold as well for the dilute Potts and random cluster models.

1 :	Modélisation aléatoire de Paris X (MODAL'X)
	Université Paris X - Paris Ouest Nanterre La Défense

Domaine

:

Mathématiques/Probabilités Mathématiques/Physique mathématique Physique/Matière Condensée/Mécanique statistique

Mots Clés : Ising model – random media – surface tension – phase coexistence – large deviations – maximal flows

hal-00272925, version 1

http://hal.archives-ouvertes.fr/hal-00272925

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Contributeur : Marc Wouts <>

Soumis le : Lundi 14 Avril 2008, 17:38:57

Dernière modification le : Jeudi 17 Septembre 2009, 16:17:42