Three-leg correlations in the two component spanning tree on the upper half-plane

Abstract

We present a detailed asymptotic analysis of correlation functions for the two component spanning tree on the two-dimensional lattice when one component contains three paths connecting vicinities of two fixed lattice sites at large distance s apart. We extend the known result for correlations on the plane to the case of the upper half-plane with closed and open boundary conditions. We found asymptotics of correlations for distance r from the boundary to one of the fixed lattice sites for the cases r s 1 and s r 1.