Add to ORKGMarkov chains are studied in a formulation involving forces and fluxes. First, the iso-dissipation force recently introduced in the physics literature is investigated; we show that its non-uniqueness is linked to different notions of duality giving rise to dual forces. We then study Hamiltonians associated to variational formulations of Markov processes, and develop different decompositions for them
Far-from-equilibrium phenomena, while abundant in nature, are not nearly as well understood as their...
AbstractConsider a symmetric bilinear form Eϕdefined on C∞c(Rd) by[formula]In this paper we study th...
An exactly solvable, Hamiltonian-based model of many massive particles that are coupled by harmonic ...
Analytical models describing the motion of colloidal particles in given force fields are presented. ...
Using the theory of large deviations, macroscopic fluctuation theory provides a framework to underst...
Abstract Following Stratonovich, we make a general analysis of the external force manifestations in ...
We extend Onsager’s minimum dissipation principle to stationary states that are only subject to loca...
Systems driven out of equilibrium display a rich variety of patterns and surprising response behavio...
peer reviewedStarting from the most general formulation of stochastic thermodynamics—i.e. a thermody...
Understanding the fluctuations by which phenomenological evolution equations with thermodynamic stru...
Nonequilibrium thermodynamics of a general second-order stochastic system is investigated. We prove ...
The research concerns the study of applied models in non-equilibrium statistical mechanics. The emer...
International audienceAbstract For boundary-driven non-equilibrium Markov models of non-interacting ...
Living systems, as well as most physical systems with promise in industry, technology and medicine, ...
We consider diffusion processes with a general second-order differential operator of the elliptic ty...
Far-from-equilibrium phenomena, while abundant in nature, are not nearly as well understood as their...
AbstractConsider a symmetric bilinear form Eϕdefined on C∞c(Rd) by[formula]In this paper we study th...
An exactly solvable, Hamiltonian-based model of many massive particles that are coupled by harmonic ...
Analytical models describing the motion of colloidal particles in given force fields are presented. ...
Using the theory of large deviations, macroscopic fluctuation theory provides a framework to underst...
Abstract Following Stratonovich, we make a general analysis of the external force manifestations in ...
We extend Onsager’s minimum dissipation principle to stationary states that are only subject to loca...
Systems driven out of equilibrium display a rich variety of patterns and surprising response behavio...
peer reviewedStarting from the most general formulation of stochastic thermodynamics—i.e. a thermody...
Understanding the fluctuations by which phenomenological evolution equations with thermodynamic stru...
Nonequilibrium thermodynamics of a general second-order stochastic system is investigated. We prove ...
The research concerns the study of applied models in non-equilibrium statistical mechanics. The emer...
International audienceAbstract For boundary-driven non-equilibrium Markov models of non-interacting ...
Living systems, as well as most physical systems with promise in industry, technology and medicine, ...
We consider diffusion processes with a general second-order differential operator of the elliptic ty...
Far-from-equilibrium phenomena, while abundant in nature, are not nearly as well understood as their...
AbstractConsider a symmetric bilinear form Eϕdefined on C∞c(Rd) by[formula]In this paper we study th...
An exactly solvable, Hamiltonian-based model of many massive particles that are coupled by harmonic ...