From elongated spanning trees to vicious random walks

Abstract

Given a spanning forest on a large square lattice, we consider by combinatorial methods a correlation function of k paths (k is odd) along branches of trees or, equivalently, k loop--erased random walks. Starting and ending points of the paths are grouped in a fashion a k--leg watermelon. For large distance r between groups of starting and ending points, the ratio of the number of watermelon configurations to the total number of spanning trees behaves as r- r with = (k2-1)/2. Considering the spanning forest stretched along the meridian of this watermelon, we see that the two--dimensional k--leg loop--erased watermelon exponent is converting into the scaling exponent for the reunion probability (at a given point) of k (1+1)--dimensional vicious walkers, = k2/2. Also, we express the conjectures about the possible relation to integrable systems.