Regularity of quasi-stationary measures for simple exclusion in dimension d >= 5
Abstract
We consider the symmetric simple exclusion process on Zd, for d>= 5, and study the regularity of the quasi-stationary measures of the dynamics conditionned on not occupying the origin. For each ∈ ]0,1[, we establish uniqueness of the density of quasi-stationary measures in L2(d), where is the stationary measure of density . This, in turn, permits us to obtain sharp estimates for P(τ>t), where τ is the first time the origin is occupied.
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