Stochastic Port-Hamiltonian Systems

Cordoni, Francesco; Persio, Luca Di; Muradore, Riccardo

doi:10.1007/s00332-022-09853-2

Cited by 3 publications

(1 citation statement)

References 49 publications

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“…Here, we assume that the internal system interconnection constraints structure is holonomic, and hence, the matrix function J satisfies the Jacobi identity and, thus, J is the structure matrix of a Poisson structure on scriptD [26]. The dynamical system (4.1) and (4.2) is called a stochastic port-Hamiltonian system [27,28].…”

Section: Stochastic Port-hamiltonian Systemsmentioning

confidence: 99%

Stochastic thermodynamics: dissipativity, accumulativity, energy storage and entropy production

Lanchares

Haddad

2023

Phil. Trans. R. Soc. A.

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In this paper, we develop an energy-based dynamical system model driven by a Markov input process to present a unified framework for stochastic thermodynamics predicated on a stochastic dynamical systems formalism. Specifically, using a stochastic dissipativity, losslessness and accumulativity theory, we develop a nonlinear stochastic port-Hamiltonian system model characterized by energy conservation and entropy non-conservation laws that are consistent with statistical thermodynamic principles. In particular, we show that the difference between the average stored system energy and the average supplied system energy for our stochastic thermodynamic model is a martingale with respect to the system filtration, whereas the difference between average system entropy production and the average system entropy consumption is a submartingale with respect to the system filtration. This article is part of the theme issue ‘Thermodynamics 2.0: Bridging the natural and social sciences (Part 2)’.

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Section: Stochastic Port-hamiltonian Systemsmentioning

confidence: 99%

Stochastic thermodynamics: dissipativity, accumulativity, energy storage and entropy production

Lanchares

Haddad

2023

Phil. Trans. R. Soc. A.

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The collective dynamics of a stochastic Port-Hamiltonian self-driven agent model in one dimension

Ehrhardt,

Kruse,

Tordeux

2024

ESAIM: M2AN

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This paper studies the collective motion of self-driven agents in a one-dimensional space with periodic boundaries, using a stochastic Port-Hamiltonian system (PHS) with symmetric nearest-neighbor interactions and additive Brownian noise as an external input. In the case of a quadratic potential the PHS is an Ornstein-Uhlenbeck process for which we explicitly determine the distribution for any time $t\ge 0$ and in the limit $t\to\infty$. In particular, we characterize the collective motion by showing that the agents' positions tend to build exactly one cluster. This is confirmed in simulations that show rapid and coordinated motion among agents, driven by noise, despite the absence of a preferred direction of motion in the model. Remarkably, the theoretical properties observed in the Ornstein-Uhlenbeck process also emerge in simulations of the nonlinear model incorporating a general interaction potential.

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