On the boundary of the zero set of super-Brownian motion and its local time

Abstract

If X(t,x) is the density of one-dimensional super-Brownian motion, we prove that dim(∂\x:X(t,x)>0\)=2-2λ0∈(0,1) a.s. on \Xt≠ 0\, where -λ0∈(-1,-1/2) is the lead eigenvalue of a killed Ornstein-Uhlenbeck process. This confirms a conjecture of Mueller, Mytnik and Perkins who proved the above with positive probability. To establish this result we derive some new basic properties of a recently introduced boundary local time and analyze the behaviour of X(t,·) near the upper edge of its support. Numerical estimates of λ0 suggest that the above Hausdorff dimension is approximately .224.