Extreme nesting in the conformal loop ensemble
Abstract
The conformal loop ensemble CLE with parameter 8/3<<8 is the canonical conformally invariant measure on countably infinite collections of noncrossing loops in a simply connected domain. Given and , we compute the almost-sure Hausdorff dimension of the set of points z for which the number of CLE loops surrounding the disk of radius centered at z has asymptotic growth (1/ ) as 0. By extending these results to a setting in which the loops are given i.i.d. weights, we give a CLE-based treatment of the extremes of the Gaussian free field.
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