Current fluctuations in non-equilibrium diffusive systems: an additivity principle
arXiv:cond-mat/0402305 · doi:10.1103/PhysRevLett.92.180601
Abstract
We formulate a simple additivity principle allowing to calculate the whole distribution of current fluctuations through a large one dimensional system in contact with two reservoirs at unequal densities from the knowledge of its first two cumulants. This distribution (which in general is non-Gaussian) satisfies the Gallavotti-Cohen symmetry and generalizes the one predicted recently for the symmetric simple exclusion process. The additivity principle can be used to study more complex diffusive networks including loops.
4 pages, 1 figure