Conformal invariance of planar loop-erased random walks and uniform spanning trees
Abstract
We prove that the scaling limit of loop-erased random walk in a simply connected domain D is equal to the radial SLE(2) path in D. In particular, the limit exists and is conformally invariant. It follows that the scaling limit of the uniform spanning tree in a Jordan domain exists and is conformally invariant. Assuming that the boundary of the domain is a C1 simple closed curve, the same method is applied to show that the scaling limit of the uniform spanning tree Peano curve, where the tree is wired along a proper arc A on the boundary, is the chordal SLE(8) path in the closure of D joining the endpoints of A. A by-product of this result is that SLE(8) is almost surely generated by a continuous path. The results and proofs are not restricted to a particular choice of lattice.
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