Loewner driving functions for off-critical percolation clusters

Abstract

We numerically study the Loewner driving function Ut of a site percolation cluster boundary on the triangular lattice for p<pc. It is found that Ut shows a drifted random walk with a finite crossover time. Within this crossover time, the averaged driving function < Ut> shows a scaling behavior -(pc-p) t( +1)/2 with a superdiffusive fluctuation whereas, beyond the crossover time, the driving function Ut undergoes a normal diffusion with Hurst exponent 1/2 but with the drift velocity proportional to (pc-p), where = 4/3 is the critical exponent for two-dimensional percolation correlation length. The crossover time diverges as (pc-p)-2 as p pc.