Non-intersecting, simple, symmetric random walks and the extended Hahn kernel

Abstract

Consider a particles performing simple, symmetric, non-intersecting random walks, starting at points 2(j-1), 1 j a at time 0 and ending at 2(j-1)+c-b at time b+c. This can also be interpreted as a random rhombus tiling of an abc-hexagon, or as a random boxed planar partition confined to a rectangular box with side lengths a, b and c. The positions of the particles at all times gives a determinantal point process with a correlation kernel given in terms of the associated Hahn polynomials. In a suitable scaling limit we obtain non-intersecting Brownian motions which can be related to Dysons's Hermitian Brownian motion via a suitable transformation.

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