Phase transition for level-set percolation of the membrane model in dimensions d ≥ 5

Abstract

We consider level-set percolation for the Gaussian membrane model on Zd, with d ≥ 5, and establish that as h ∈ R varies, a non-trivial percolation phase transition for the level-set above level h occurs at some finite critical level h, which we show to be positive in high dimensions. Along h, two further natural critical levels h and h are introduced, and we establish that -∞ <h ≤ h ≤ h < ∞, in all dimensions. For h > h, we find that the connectivity function of the level-set above h admits stretched exponential decay, whereas for h < h, chemical distances in the (unique) infinite cluster of the level-set are shown to be comparable to the Euclidean distance, by verifying conditions identified by Drewitz, R\'ath and Sapozhnikov, see arXiv:1212.2885, for general correlated percolation models. As a pivotal tool to study its level-set, we prove novel decoupling inequalities for the membrane model.

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