The square summability of the CLE complementary component diameters

Abstract

We show that the sum of the squares of the diameters of the complementary connected components of the CLE carpet/gasket is almost surely finite for ∈ (8/3, 4) (4, 8). This is a prerequisite for the application of a result of Ntalampekos which allows the CLE carpet/gasket to be uniformized to a round Sierpi\'nski packing, in analogy with the classical Koebe uniformization theorem for finitely connected domains. Our result is new in the case that ∈ (4,8) and we provide a new proof for ∈ (8/3, 4). In both cases we use the link between CLE and space-filling SLE. The square-summability of diameters has been proved for ∈ (8/3, 4] in unpublished work by Rohde and Werness using a different method. Our work completes the proof that this property holds for all for which CLE is defined.