Branching random walk in random environment with random absorption wall

Abstract

We consider the branching random walk in random environment with a random absorption wall. When we add this barrier, we discuss some topics related to the survival probability. We assume that the random environment is i.i.d., Si is a particular i.i.d. random walk depend on the random environment L. Let the random barrier function (the random absorption wall) is gi(L):=aiα-Si, where i present the generation. We show that there exists a critical value ac>0 such that if a>ac,α=13, the survival probability is positive almost surly and if a<ac,α=13 ,the survival probability is zero almost surely. Moreover, if we denote Zn is the total populations in n-th generation in the new system (with barrier),under some conditions, we show L(Zn>0)/n1/3 will converges to a negative constant almost surely if α∈[0,13).