Exceptional times for percolation under exclusion dynamics

Abstract

We analyse in this paper a conservative analogue of the celebrated model of dynamical percolation introduced by H\"aggstr\"om, Peres and Steif in [HPS97]. It is simply defined as follows: start with an initial percolation configuration ω(t=0). Let this configuration evolve in time according to a simple exclusion process with symmetric kernel K(x,y). We start with a general investigation (following [HPS97]) of this dynamical process t ωK(t) which we call K-exclusion dynamical percolation. We then proceed with a detailed analysis of the planar case at the critical point (both for the triangular grid and the square lattice Z2) where we consider the power-law kernels Kα \[ Kα(x,y) 1 \|x-y\|22+α \, . \] We prove that if α > 0 is chosen small enough, there exist exceptional times t for which an infinite cluster appears in ωKα(t). (On the triangular grid, we prove that it holds for all α < α0 = 217816.) The existence of such exceptional times for standard i.i.d. dynamical percolation (where sites evolve according to independent Poisson point processes) goes back to the work by Schramm-Steif in [SS10]. In order to handle such a K-exclusion dynamics, we push further the spectral analysis of exclusion noise sensitivity which had been initiated in [BGS13]. (The latter paper can be viewed as a conservative analogue of the seminal paper by Benjamini-Kalai-Schramm [BKS99] on i.i.d. noise sensitivity.) The case of a nearest-neighbour simple exclusion process, corresponding to the limiting case α = +∞, is left widely open.