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Conformal invariance of planar loop-erased random walks and uniform spanning trees

2 Pith papers cite this work. Polarity classification is still indexing.

2 Pith papers citing it
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 $C^1$ 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.

years

2026 1 2025 1

verdicts

UNVERDICTED 2

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representative citing papers

Field theories for Laplacian Growth

cond-mat.stat-mech · 2026-06-25 · unverdicted · novelty 7.0

Constructs exact lattice action for LRWs with perturbative equivalence to LERWs and generalizes to b-LRWs and DLA.

Three-point functions in critical loop models

math-ph · 2025-10-06 · unverdicted · novelty 7.0

Conjecture of an exact formula for 3-point functions of ℓ-leg and diagonal fields in critical loop models, supported by transfer-matrix numerics on cylinders that agree in most cases.

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Showing 2 of 2 citing papers after filters.

  • Field theories for Laplacian Growth cond-mat.stat-mech · 2026-06-25 · unverdicted · none · ref 3 · internal anchor

    Constructs exact lattice action for LRWs with perturbative equivalence to LERWs and generalizes to b-LRWs and DLA.

  • Three-point functions in critical loop models math-ph · 2025-10-06 · unverdicted · none · ref 19 · internal anchor

    Conjecture of an exact formula for 3-point functions of ℓ-leg and diagonal fields in critical loop models, supported by transfer-matrix numerics on cylinders that agree in most cases.