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Exponential Convergence To Non-Equilibrium Stationary States In Classical Statistical Mechanics, L Rey-Bellet, L Thomas
Exponential Convergence To Non-Equilibrium Stationary States In Classical Statistical Mechanics, L Rey-Bellet, L Thomas
Luc Rey-Bellet
We continue the study of a model for heat conduction [6] consisting of a chain of non-linear oscillators coupled to two Hamiltonian heat reservoirs at different temperatures. We establish existence of a Liapunov function for the chain dynamics and use it to show exponentially fast convergence of the dynamics to a unique stationary state. Ingredients of the proof are the reduction of the infinite dimensional dynamics to a finite-dimensional stochastic process as well as a bound on the propagation of energy in chains of anharmonic oscillators.