Heterochromatic two-arm probabilities for metric graph Gaussian free fields

Abstract

For the Gaussian free field on the metric graph of Zd (d 3), we consider the heterochromatic two-arm probability, i.e., the probability that two points v and v' are contained in distinct clusters of opposite signs with diameters at least N. For all d 3 except the critical dimension dc=6, we prove that this probability is asymptotically proportional to N-[(d2+1) 4]. Furthermore, we prove that conditioned on this two-arm event, the volume growth of each involved cluster is comparable to that of a typical (unconditioned) cluster; precisely, each cluster has a volume of order M(d2+1) 4 within a box of size M.

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