Scaling limits for the critical level-set percolation of the Gaussian free field on regular trees

Abstract

We continue the study of the level-set percolation of the discrete Gaussian free field (GFF) on regular trees in the critical regime, initiated in arXiv:2302.02753. First, we derive a sharp asymptotic estimate for the probability that the connected component of the critical level set containing the root of the tree reaches generation n. In particular, we show that the one-arm exponent satisfies =1. Next, we establish a Yaglom-type limit theorem for the values of the GFF at generation n within this component. Finally, we show that, after a correct rescaling, this component conditioned on reaching generation n converges, as n∞, to Aldous' continuum random tree.

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