The Doob transform and the tree behind the forest, with application to near-critical dimers

Article; Early Access

Rey, Lucas

Centre National de la Recherche Scientifique (CNRS); Universite PSL; Universite Paris-Dauphine; Universite PSL; Ecole Normale Superieure (ENS); Centre National de la Recherche Scientifique (CNRS)

PROBABILITY THEORY AND RELATED FIELDS

0178-8051

10.1007/s00440-024-01344-7

2024

The Doob transform technique enables the study of a killed random walk via a random walk with transition probabilities tilted by a discrete massive harmonic function. The main contribution of this paper is to transfer this powerful technique to statistical mechanics by relating two models, namely random rooted spanning forests (RSF) and random spanning trees (RST), and provide applications. More precisely, our first main theorem explicitly relates models on the level of partition functions, and probability measures, in the case of finite and infinite graphs. Then, in the planar case, we also rely on the dimer model: we introduce a killed and a drifted dimer model, extending to this general framework the models introduced in Chhita (J Stat Phys 148(1):67-88, 2012) and de Tili & egrave;re (Electron J Probab 26:1-86, 2020). Using Temperley's bijection between RST and dimers, this allows us to relate RSF to dimers and thus extend partially this bijection to RSF. As immediate applications, we give a short and transparent proof of Kenyon's result stating that the spectral curve of RSF is a Harnack curve, and provide a general setting to relate discrete massive holomorphic and harmonic functions. The other important application consists in proving universality of the convergence of the near-critical loop-erased random walk, RST and dimer models by extending the results of Berestycki and Haunschmid-Sibitz (Near-critical dimers and massive SLE arxiv:2203.15717, 2022), Chhita (J Stat Phys 148(1):67-88, 2012) and Chelkak and Wan (Electron J Probab 26:1-35, 2021) from the square lattice to any isoradial graphs: we introduce a loop-erased random walk, RST and dimer model on isoradial discretizations of any simply connected domain and prove convergence in the massive scaling limit towards continuous objects described by a massive version of SLE2.

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