Abstract
We obtain upper bounds for the rates of convergence for the simple random walk Green’s function in the domains Dα=Dα(n)={rei𝜃∈C:0<𝜃<2π−α,0<r<2n}−z0, where z0∈Z2 is a point closest to nei(π−α∕2). The rate depends on the angle of the wedge and is what was suggested by the sharpest available results in the extreme cases α=0 and α=π. Our proof uses the KMT coupling between random walk and Brownian motion.
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