V. S. Poghosyan, V. B. Priezzhev
The two-dimensional dense O(n) loop model for $n=1$ is equivalent to the bond percolation and for $n=0$ to the dense polymers or spanning trees. We consider the boundary correlations on the half space and calculate the probability $P_b$ that a cluster of bonds has a single common point with the boundary. In the limit $n\rightarrow 0$, we find an analytical expression for $P_b$ using the generalized Kirchhoff theorem. The obtained exact value is surprisingly close to the value of $P_b$ conjectured for the dense O(1) loop model.
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http://arxiv.org/abs/1212.1032
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