On cable-graph percolation between dimensions 2 and 3
Abstract
We consider the Gaussian free field on two-dimensional slabs with a thickness described by a height h at spatial scale N. We investigate the radius of critical clusters for the associated cable-graph percolation problem, which depends sensitively on the parameter h. Our results unveil a whole family of new "fixed points", which interpolate between recent results from arXiv:2303.03782 in two dimensions and from arXiv:2405.17417 and arXiv:2406.02397 in three dimensions, and describe critical behaviour beyond those regimes. In the delocalised phase, the one-arm decay exhibits a "plateau", i.e. it doesn't depend on the speed at which the variance of the field diverges in the large-N limit. Our methods rely on a careful analysis of the interplay between two- and three-dimensional effects for the underlying random walk, which manifest themselves in a corresponding decomposition of the field.
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