Relaxation Time of the One-Dimensional Symmetric Zero Range Process with Constant Rate

A. Galves, H. Guiol

1997, v.3, №3, 323-332


We prove that the one-dimensional symmetric zero range dynamics, starting either with a periodic configuration or with a stationary, exponential mixing probability distribution, converges to equilibrium faster than $\log t/t^{-1/2}$.

Keywords: symmetric zero range process,convergence rate


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