On the C1-property of the percolation function of random interlacements and a related variational problem

Abstract

We consider random interlacements on Zd, d 3. We show that the percolation function that to each u 0 attaches the probability that the origin does not belong to an infinite cluster of the vacant set at level u, is C1 on an interval [0,\u), where \u is positive and plausibly coincides with the critical level u* for the percolation of the vacant set. We apply this finding to a constrained minimization problem that conjecturally expresses the exponential rate of decay of the probability that a large box contains an excessive proportion of sites that do not belong to an infinite cluster of the vacant set. When u is smaller than \u, we describe a regime of "small excess" for where all minimizers of the constrained minimization problem remain strictly below the natural threshold value u* - u for the variational problem.