Abstract
We give a lower bound on the spectral gap for symmetric zero-range processes. Under some conditions on the rate function, we show that the gap shrinks as n-2, independent of the density, for the dynamics localized on a cube of size nd. We follow the method outlined by Lu and Yau, where a similar spectral gap is proved for Kawasaki dynamics.
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APA
Landim, C., Sethuraman, S., & Varadhan, S. (1996). Spectral gap for zero-range dynamics. Annals of Probability, 24(4), 1871–1902. https://doi.org/10.1214/aop/1041903209
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