On the radius of Gaussian free field excursion clusters
Abstract
We consider the Gaussian free field on Zd, for d≥3, and give sharp bounds on the probability that the radius of a finite cluster in the excursion set \ ≥ h\ exceeds a large value N, for any height h ≠ h*, where h* refers to the corresponding percolation critical parameter. In dimension d=3, we prove that this probability is sub-exponential in N and decays as \-π6(h-h*)2 N N \ as N ∞ to principal exponential order. When d≥ 4, we prove that these tails decay exponentially in N. Our results extend to other quantities of interest, such as truncated two-point functions and the two-arms probability for annuli crossings at scale N.
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