A quenched CLT for super-Brownian motion with random immigration
arXiv:math/0703573
Abstract
A quenched central limit theorem is derived for the super-Brownian motion with super-Brownian immigration, in dimension $d\geq 4$. At the critical dimension $d=4$, the quenched and annealed fluctuations are of the same order but are not equal.
A small mistake in the proof of Proposition 2.2 is corrected, and typos removed