Dynamic message-passing approach for kinetic spin models with reversible dynamics
Abstract
A method to approximately close the dynamic cavity equations for synchronous reversible dynamics on a locally tree-like topology is presented. The method builds on a graph expansion to eliminate loops from the normalizations of each step in the dynamics, and an assumption that a set of auxilary probability distributions on histories of pairs of spins mainly have dependencies that are local in time. The closure is then effectuated by projecting these probability distributions on -step Markov processes. The method is shown in detail on the level of ordinary Markov processes (), and outlined for higher-order approximations (). Numerical validations of the technique are provided for the reconstruction of the transient and equilibrium dynamics of the kinetic Ising model on a random graph with arbitrary connectivity symmetry.
Cite
@article{arxiv.1409.4684,
title = {Dynamic message-passing approach for kinetic spin models with reversible dynamics},
author = {Gino Del Ferraro and Erik Aurell},
journal= {arXiv preprint arXiv:1409.4684},
year = {2015}
}
Comments
6 pages, 4 figures