Phase transition and level-set percolation for the Gaussian free field

Abstract

We consider level-set percolation for the Gaussian free field on Zd, with d bigger or equal to 3, and prove that there is a non-trivial critical level h* such that for h > h*, the excursion set above level h does not percolate, and for h < h*, the excursion set does percolate. It is known from the work of Bricmont-Lebowitz-Maes that h* is non-negative for all d bigger or equal to 3, and finite, when d=3. We prove here that h* is finite for all d bigger or equal to 3. In fact, we introduce a second critical parameter h**, which is bigger or equal to h*. We show that h** is finite for all d bigger or equal to 3, and that the connectivity function of the excursion set above level h has stretched exponential decay for all h > h**. Finally we prove that h* > 0 in high dimension. It remains open whether h* and h** actually coincide, and whether h* > 0 for all d bigger or equal to 3.