Martin boundary of a killed random walk on a quadrant
Abstract
A complete representation of the Martin boundary of killed random walks on the quadrant N*×N* is obtained. It is proved that the corresponding full Martin compactification of the quadrant N*×N* is homeomorphic to the closure of the set \w=z/(1+|z|):z∈N*×N*\ in R2. The method is based on a ratio limit theorem for local processes and large deviation techniques.
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