Level Lines of Gaussian Free Field I: Zero-Boundary GFF

Abstract

Let h be an instance of Gaussian Free Field in a planar domain. We study level lines of h starting from boundary points. We show that the level lines are random continuous curves which are variants of SLE4 path. We show that the level lines with different heights satisfy the same monotonicity behavior as the level lines of smooth functions. We prove that the time-reversal of the level line coincides with the level line of -h. This implies that the time-reversal of SLE4() process is still an SLE4() process. We prove that the level lines satisfy "target-independent" property. We also discuss the relation between Gaussian Free Field and CLE4.