Abstract
We revisit the computation of the discrete version of Schramm’s formula for the loop-erased random walk derived by Kenyon. The explicit formula in terms of the Green function relies on the use of a complex connection on a graph, for which a line bundle Laplacian is defined. We give explicit results in the scaling limit for the upper half-plane, the cylinder and the Möbius strip. Schramm’s formula is then extended to multiple loop-erased random walks.
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