Absolute continuity of the Super-Brownian motion with infinite mean

Abstract

In this work we prove that for any dimension d≥ 1 and any γ ∈ (0,1) super-Brownian motion corresponding to the log-Laplace equation equation* split ∂ v(t,x)∂ t & = 12 v(t,x) + vγ (t,x) ,\: (t,x) ∈ R+× Rd,\\ v(0,x)&= f(x) split equation* is absolutely continuous with respect to the Lebesgue measure at any fixed time t>0. Our proof is based on properties of solutions of the \ equation. We also prove that when initial datum v(0,·) is a finite, non-zero measure, then the \ equation has a unique, continuous solution. Moreover this solution continuously depends on initial data.