Convergence in Lp and its exponential rate for a branching process in a random environment

Abstract

We consider a supercritical branching process (Zn) in a random environment . Let W be the limit of the normalized population size Wn=Zn/E[Zn|]. We first show a necessary and sufficient condition for the quenched Lp (p>1) convergence of (Wn), which completes the known result for the annealed Lp convergence. We then show that the convergence rate is exponential, and we find the maximal value of >1 such that n(W-Wn)→ 0 in Lp, in both quenched and annealed sense. Similar results are also shown for a branching process in a varying environment.