Multi-arm incipient infinite clusters in 2D: scaling limits and winding numbers

Abstract

We study the alternating k-arm incipient infinite cluster (IIC) of site percolation on the triangular lattice T. Using Camia and Newman's result that the scaling limit of critical site percolation on T is CLE6, we prove the existence of the scaling limit of the k-arm IIC for k=1,2,4. Conditioned on the event that there are open and closed arms connecting the origin to ∂ DR, we show that the winding number variance of the arms is (3/2+o(1)) R as R→ ∞, which confirms a prediction of Wieland and Wilson (2003). Our proof uses two-sided radial SLE6 and coupling argument. Using this result we get an explicit form for the CLT of the winding numbers, and get analogous result for the 2-arm IIC, thus improving our earlier result.