Noé Cuneo, Jean-Pierre Eckmann, Martin Hairer, Luc Rey-Bellet
Published 2017-12-26Version 1
Non-equilibrium steady states for chains of oscillators (masses) connected by harmonic and anharmonic springs and interacting with heat baths at different temperatures have been the subject of several studies. In this paper, we show how some of the results extend to more complicated networks. We establish the existence and uniqueness of the non-equilibrium steady state, and show that the system converges to it at an exponential rate. The arguments are based on controllability and conditions on the potentials at infinity.
Non-equilibrium steady state and subgeometric ergodicity for a chain of three coupled rotors
Non-Equilibrium Steady States in Kac's Model Coupled to a Thermostat
The Stability of the Non-Equilibrium Steady States
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