Exploration processes and SLE6

Abstract

We define radial exploration processes from a to b and from b to a in a domain D of hexagons where a is a boundary point and b is an interior point. We prove the reversibility: the time-reversal of the process from b to a has the same distribution as the process from a to b. We show the scaling limit of such an exploration process is a radial SLE6 in D. As a consequence, the distribution of the last hitting point with the boundary of any radial SLE6 is harmonic measure. We also prove the scaling limit of a similar exploration process defined in the full complex plane C is a full-plane SLE6. A by-product of these results is that the time-reversal of a radial SLE6 trace after the last visit to the boundary is a full-plane SLE6 trace up to the first visit of the boundary.