On the topological boundary of the range of super-Brownian motion-extended version

Abstract

We show that if ∂R is the boundary of the range of super-Brownian motion and dim denotes Hausdorff dimension, then with probability one, for any open set U, ∂R U≠ implies dim(U∂R)=cases 4-22≈1.17& if d=2\\ 9-172≈ 2.44& if d=3. cases This improves recent results of the last two authors (arxiv:1711.03486) by working with the actual topological boundary, rather than the boundary of the zero set of the local time, and establishing a local result for the dimension.