Martin boundary of a reflected random walk on a half-space
Abstract
The complete representation of the Martin compactification for reflected random walks on a half-space d× is obtained. It is shown that the full Martin compactification is in general not homeomorphic to the ``radial'' compactification obtained by Ney and Spitzer for the homogeneous random walks in d : convergence of a sequence of points zn∈d-1× to a point of on the Martin boundary does not imply convergence of the sequence zn/|zn| on the unit sphere Sd. Our approach relies on the large deviation properties of the scaled processes and uses Pascal's method combined with the ratio limit theorem. The existence of non-radial limits is related to non-linear optimal large deviation trajectories.
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