The Seneta-Heyde scaling for supercritical super-Brownian motion

Abstract

We consider the additive martingale Wt(λ) and the derivative martingale ∂ Wt(λ) for one-dimensional supercritical super-Brownian motions with general branching mechanism. In the critical case λ=λ0, we prove that tWt(λ0) converges in probability to a positive limit, which is a constant multiple of the almost sure limit ∂ W∞(λ0) of the derivative martingale ∂ Wt(λ0). We also prove that, on the survival event, t∞tWt(λ0)=∞ almost surely.