We provide a compact derivation of the static and dynamic equations for infinite-dimensional particle systems in the liquid and glass phases. The static derivation is based on the introduction of an 'auxiliary' disorder and the use of the replica method. The dynamic derivation is based on the general analogy between replicas and the supersymmetric formulation of dynamics. We show that static and dynamic results are consistent, and follow the random first order transition scenario of mean field disordered glassy systems.
Statics and dynamics of infinite-dimensional liquids and glasses: a parallel and compact derivation / Kurchan, J; Maimbourg, T; Zamponi, F. - In: JOURNAL OF STATISTICAL MECHANICS: THEORY AND EXPERIMENT. - ISSN 1742-5468. - (2016). [10.1088/1742-5468/2016/03/033210]
Statics and dynamics of infinite-dimensional liquids and glasses: a parallel and compact derivation
Zamponi F
2016
Abstract
We provide a compact derivation of the static and dynamic equations for infinite-dimensional particle systems in the liquid and glass phases. The static derivation is based on the introduction of an 'auxiliary' disorder and the use of the replica method. The dynamic derivation is based on the general analogy between replicas and the supersymmetric formulation of dynamics. We show that static and dynamic results are consistent, and follow the random first order transition scenario of mean field disordered glassy systems.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
