On the boundary local time measure of super-Brownian motion

Abstract

If Lx is the total occupation local time of d-dimensional super-Brownian motion, X, for d=2 and d=3, we construct a random measure L, called the boundary local time measure, as a rescaling of Lx e-λ Lx dx as λ ∞, thus confirming a conjecture of MP17 and further show that the support of L equals the topological boundary of the range of X, ∂R. This latter result uses a second construction of a boundary local time L given in terms of exit measures and we prove that L=cL a.s. for some constant c>0. We derive reasonably explicit first and second moment measures for L in terms of negative dimensional Bessel processes and use it with the energy method to give a more direct proof of the lower bound of the Hausdorff dimension of ∂R in HMP18. The construction requires a refinement of the L2 upper bounds in MP17 and HMP18 to exact L2 asymptotics. The methods also refine the left tail bounds for Lx in MP17 to exact asymptotics. We conjecture that the Minkowski content of ∂R is equal to the total mass of the boundary local time L up to some constant.