Transfer operator analysis of the parallel dynamics of disordered Ising chains

A transfer operator formalism solves the macroscopic dynamics of disordered Ising chain systems which are relevant for ageing phenomena.

Philosophical Magazine 92, 64 (2011)

A. Coolen, K. Takeda

Image for the paper "Transfer operator analysis of the parallel dynamics of disordered Ising chains"
Image for the paper "Transfer operator analysis of the parallel dynamics of disordered Ising chains"
Image for the paper "Transfer operator analysis of the parallel dynamics of disordered Ising chains"
Image for the paper "Transfer operator analysis of the parallel dynamics of disordered Ising chains"
LCP
Image for the paper "Transfer operator analysis of the parallel dynamics of disordered Ising chains"
Image for the paper "Transfer operator analysis of the parallel dynamics of disordered Ising chains"
Image for the paper "Transfer operator analysis of the parallel dynamics of disordered Ising chains"
Image for the paper "Transfer operator analysis of the parallel dynamics of disordered Ising chains"
Image for the paper "Transfer operator analysis of the parallel dynamics of disordered Ising chains"
Image for the paper "Transfer operator analysis of the parallel dynamics of disordered Ising chains"
Image for the paper "Transfer operator analysis of the parallel dynamics of disordered Ising chains"
Image for the paper "Transfer operator analysis of the parallel dynamics of disordered Ising chains"
Image for the paper "Transfer operator analysis of the parallel dynamics of disordered Ising chains"
Image for the paper "Transfer operator analysis of the parallel dynamics of disordered Ising chains"
Image for the paper "Transfer operator analysis of the parallel dynamics of disordered Ising chains"
Image for the paper "Transfer operator analysis of the parallel dynamics of disordered Ising chains"

We study the synchronous stochastic dynamics of the random field and random bond Ising chain. For this model the generating functional analysis method of De Dominicis leads to a formalism with transfer operators, similar to transfer matrices in equilibrium studies, but with dynamical paths of spins and (conjugate) fields as arguments, as opposed to replicated spins. In the thermodynamic limit the macroscopic dynamics is captured by the dominant eigenspace of the transfer operator, leading to a relatively simple and transparent set of equations that are easy to solve numerically. Our results are supported excellently by numerical simulations.