Planar random-cluster model: scaling relations

Duminil-Copin, Hugo; Manolescu, Ioan

doi:10.1017/fmp.2022.16

Forum of Mathematics, Pi

2022

DOI: 10.1017/fmp.2022.16

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Planar random-cluster model: scaling relations

Hugo Duminil-Copin

Ioan Manolescu

Abstract: This paper studies the critical and near-critical regimes of the planar random-cluster model on $\mathbb Z^2$ with cluster-weight $q\in [1,4]$ using novel coupling techniques. More precisely, we derive the scaling relations between the critical exponents $\beta $ , $\gamma $ , $\delta $ , $\eta $ , $\nu $ , … Show more

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Cited by 4 publications

References 64 publications

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The fuzzy Potts model in the plane: scaling limits and arm exponents

Köhler-Schindler,

Lehmkuehler

2024

Probab. Theory Relat. Fields

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We consider a critical Fortuin–Kasteleyn (FK) percolation with cluster weight $$q \in [1,4)$$ q ∈ [ 1 , 4 ) in the plane, and color its clusters in red (respectively blue) with probability $$r \in (0,1)$$ r ∈ ( 0 , 1 ) (respectively $$1-r$$ 1 - r ), independently of each other. We study the resulting fuzzy Potts model, which corresponds to the critical Ising model in the special case $$q=2$$ q = 2 and $$r=1/2$$ r = 1 / 2 . We show that under the assumption that the critical FK percolation converges to a conformally invariant scaling limit (which is known to hold for the FK-Ising model,i.e. $$q=2$$ q = 2 ), the obtained coloring converges to variants of Conformal Loop Ensembles constructed, described and studied by Miller, Sheffield and Werner. Based on discrete considerations, we also show that the arm exponents for this coloring in the discrete model are identical to the ones of the continuum model. Using the values of these arm exponents in the continuum, we determine the arm exponents for the fuzzy Potts model.

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The fuzzy Potts model in the plane: scaling limits and arm exponents

Köhler-Schindler,

Lehmkuehler

2024

Probab. Theory Relat. Fields

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Widths of crossings in Poisson Boolean percolation

Manolescu,

Santoro

2024

J. Appl. Probab.

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Strict monotonicity, continuity, and bounds on the Kertész line for the random-cluster model on Zd

Hansen

Klausen

2023

Journal of Mathematical Physics

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Ising and Potts models can be studied using the Fortuin–Kasteleyn representation through the Edwards–Sokal coupling. This adapts to the setting where the models are exposed to an external field of strength h > 0. In this representation, which is also known as the random-cluster model, the Kertész line is the curve that separates two regions of the parameter space defined according to the existence of an infinite cluster in [Formula: see text]. This signifies a geometric phase transition between the ordered and disordered phases even in cases where a thermodynamic phase transition does not occur. In this article, we prove strict monotonicity and continuity of the Kertész line. Furthermore, we give new rigorous bounds that are asymptotically correct in the limit h → 0 complementing the bounds from the work of Ruiz and Wouts [J. Math. Phys. 49, 053303 (2008)], which were asymptotically correct for h → ∞. Finally, using a cluster expansion, we investigate the continuity of the Kertész line phase transition.

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Planar random-cluster model: scaling relations

Cited by 4 publications

References 64 publications

The fuzzy Potts model in the plane: scaling limits and arm exponents

The fuzzy Potts model in the plane: scaling limits and arm exponents

Widths of crossings in Poisson Boolean percolation

Strict monotonicity, continuity, and bounds on the Kertész line for the random-cluster model on Zd

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