Sharp one-point estimates and Minkowski content for the scaling limit of three-dimensional loop-erased random walk

Abstract

In this work, we consider the scaling limit of loop-erased random walk (LERW) in three dimensions and prove that the limiting occupation measure is equivalent to its β-dimensional Minkowski content, where β ∈ (1, 5/3] is its Hausdorff dimension. In doing this we also establish the existence of the two-point function and provide some sharp estimates on one-point function and ball-hitting probabilities for 3D LERW in any scale, which is a considerable improvement of previous results.