Exact Free Energy Functional for a Driven Diffusive Open Stationary Nonequilibrium System
arXiv:cond-mat/0203161 · doi:10.1103/PhysRevLett.89.030601
Abstract
We obtain the exact probability $\exp[-L {\cal F}(\{Ï(x)\})]$ of finding a macroscopic density profile $Ï(x)$ in the stationary nonequilibrium state of an open driven diffusive system, when the size of the system $L \to \infty$. $\cal F$, which plays the role of a nonequilibrium free energy, has a very different structure from that found in the purely diffusive case. As there, $\cal F$ is nonlocal, but the shocks and dynamic phase transitions of the driven system are reflected in non-convexity of $\cal F$, in discontinuities in its second derivatives, and in non-Gaussian fluctuations in the steady state.
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