Arm exponent for the Gaussian free field on metric graphs in intermediate dimensions

Abstract

We investigate the bond percolation model on transient weighted graphs G induced by the excursion sets of the Gaussian free field on the corresponding metric graph. We assume that balls in G have polynomial volume growth with growth exponent α and that the Green's function for the random on G exhibits a power law decay with exponent , in the regime 1≤ ≤ α2. In particular, this includes the cases of G=Z3 for which =1, and G= Z4 for which =α2=2. For all such graphs, we determine the leading-order asymptotic behavior for the critical one-arm probability, which we prove decays with distance R, like R-2+o(1). Our results are, in fact, more precise and yield logarithmic corrections when >1 as well as corrections of order R when =1. We further obtain very sharp upper bounds on truncated two-point functions close to criticality, which are new when >1 and essentially optimal when =1. This extends previous results from arXiv:2101.05801 and arXiv:1807.11117.

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