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Publication - Mr Zohar Neu

    Fokker-Planck representations of non-Markov Langevin equations

    application to delayed systems

    Citation

    Giuggioli, L & Neu, Z, 2019, ‘Fokker-Planck representations of non-Markov Langevin equations: application to delayed systems’. Philosophical Transactions of the Royal Society A: Mathematical, Physical and Engineering Sciences, vol 377.

    Abstract

    Noise and time delays, or history-dependent processes, play an integral part of many natural and man-made systems. The resulting interplay between random fluctuations and time non-locality are essential features of the emerging complex dynamics in non-Markov systems. While stochastic differential equations in the form of Langevin equations with additive noise for such systems exist, the corresponding probabilistic formalism is yet to be developed. Here we introduce such a framework via an infinite hierarchy of coupled Fokker-Planck equations for the n-time probability distribution. When the non-Markov Langevin equation is linear, we show how the hierarchy can be truncated at n= 2 by converting the time non-local Langevin equation to a timelocal one with additive coloured noise. We compare the resulting Fokker-Planck equations to an earlier version, solve them analytically and analyse the temporal features of the probability distributions that would allow to distinguish between Markov and non-Markov features.

    Full details in the University publications repository