High-dimensional asymptotics for percolation of Gaussian free field level sets
Abstract
We consider the Gaussian free field on Zd, d greater or equal to 3, and prove that the critical density for percolation of its level sets behaves like 1/d1 + o(1) as d tends to infinity. Our proof gives the principal asymptotic behavior of the corresponding critical level h*(d). Moreover, it shows that a related parameter h**(d) ≥ h*(d) introduced by Rodriguez and Sznitman in arXiv:1202.5172 is in fact asymptotically equivalent to h*(d).
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