Regularity of the speed of biased random walk in a one-dimensional percolation model

Abstract

We consider biased random walks on the infinite cluster of a conditional bond percolation model on the infinite ladder graph. Axelsson-Fisk and H\"aggstr\"om established for this model a phase transition for the asymptotic linear speed v of the walk. Namely, there exists some critical value λc>0 such that v>0 if λ∈ (0,λc) and v=0 if λ>λc. We show that the speed v is continuous in λ on the interval (0,λc) and differentiable on (0,λc/2). Moreover, we characterize the derivative as a covariance. For the proof of the differentiability of v on (0,λc/2), we require and prove a central limit theorem for the biased random walk. Additionally, we prove that the central limit theorem fails to hold for λ ≥ λc/2.