Geometry of the random walk range conditioned on survival among Bernoulli obstacles

Abstract

We consider a discrete time simple symmetric random walk among Bernoulli obstacles on Zd, d≥ 2, where the walk is killed when it hits an obstacle. It is known that conditioned on survival up to time N, the random walk range is asymptotically contained in a ball of radius N=C N1/(d+2) for any d≥ 2. For d=2, it is also known that the range asymptotically contains a ball of radius (1-ε)N for any ε>0, while the case d≥ 3 remains open. We complete the picture by showing that for any d≥ 2, the random walk range asymptotically contains a ball of radius N-Nε for some ε ∈ (0,1). Furthermore, we show that its boundary is of size at most Nd-1( N)a for some a>0.