Dynamic message-passing equations for models with unidirectional dynamics – Archive ouverte HAL

Andrey Y. Lokhov 1 Marc Mézard 1, 2 Lenka Zdeborová 3

Andrey Y. Lokhov, Marc Mézard, Lenka Zdeborová. Dynamic message-passing equations for models with unidirectional dynamics. Physical Review D, American Physical Society, 2015, 91, pp.012811. ⟨cea-01140788⟩

Understanding and quantifying the dynamics of disordered out-of-equilibrium models is an important problem in many branches of science. Using the dynamic cavity method on time trajectories, we construct a general procedure for deriving the dynamic message-passing equations for a large class of models with unidirectional dynamics, which includes the zero-temperature random field Ising model, the susceptible-infected-recovered model, and rumor spreading models. We show that unidirectionality of the dynamics is the key ingredient that makes the problem solvable. These equations are applicable to single instances of the corresponding problems with arbitrary initial conditions, and are asymptotically exact for problems defined on locally tree-like graphs. When applied to real-world networks, they generically provide a good analytic approximation of the real dynamics.

  • 1. LPTMS – Laboratoire de Physique Théorique et Modèles Statistiques
  • 2. Département de Physique de l’ENS-PSL
  • 3. IPHT – Institut de Physique Théorique – UMR CNRS 3681

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