Continuity of the Phase Transition for Planar Random-Cluster and Potts Models with $${1 \le q \le 4}$$ 1 ≤ q ≤ 4

Duminil-Copin, Hugo; Sidoravičius, Vladas; Tassion, Vincent

doi:10.1007/s00220-016-2759-8

Cited by 121 publications

(223 citation statements)

References 83 publications

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“…Our results for q c , in particular that of the honeycomb lattice, stand in contrast to the well known result q c = 4 of the usual model [4,5,7,8].…”

Section: Discussioncontrasting

confidence: 99%

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Unusual changeover in the transition nature of local-interaction Potts models

et al. 2019

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We present a novel combinatorial approach which allows the determination of the critical temperature and the phase-transition order of Potts models with a round-the-face interaction. Using this approach, it is demonstrated that for some two-dimensional ferromagnetic Potts models with completely local interaction there is a changeover in the transition order at a critical integer qc ≤ 3, where a first order transition is observed for q > qc and a second order transition is assumed at least for q = qc. This stands in contrast to the standard two-spin interaction Potts model where the critical integer value for which the transition is continuous is qc = 4.

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“…Our results for q c , in particular that of the honeycomb lattice, stand in contrast to the well known result q c = 4 of the usual model [4,5,7,8].…”

Section: Discussioncontrasting

confidence: 99%

“…His findings were believed to be lattice independent [6]. Recently, Duminil-Copin et al [7,8] have rigorously confirmed Baxter's predictions using the random cluster representation [9] of the nearest-neighbor interaction model.…”

Section: Introductionmentioning

confidence: 86%

Unusual changeover in the transition nature of local-interaction Potts models

et al. 2019

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“…The proof relies on a result of Russo, Seymour, and Welsh [23,24] that relates crossing probabilities for rectangles with different aspect ratios. Recently the boxcrossing property has been extended to planar percolation processes with spatial dependencies, e.g., continuum percolation [1,26] or the random-cluster model [10].…”

Section: Russo-seymour-welsh Theory and Power Law Decay On Slabsmentioning

confidence: 99%

Critical Percolation and the Minimal Spanning Tree in Slabs

Newman

Tassion

2017

Comm Pure Appl Math

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The minimal spanning forest on ℤd is known to consist of a single tree for d ≤ 2 and is conjectured to consist of infinitely many trees for large d. In this paper, we prove that there is a single tree for quasi‐planar graphs such as ℤ2 × {0,…,k}d−2. Our method relies on generalizations of the “gluing lemma” of Duminil‐Copin, Sidoravicius, and Tassion. A related result is that critical Bernoulli percolation on a slab satisfies the box‐crossing property. Its proof is based on a new Russo‐Seymour‐Welsh‐type theorem for quasi‐planar graphs. Thus, at criticality, the probability of an open path from 0 of diameter n decays polynomially in n. This strengthens the result of Duminil‐Copin et al., where the absence of an infinite cluster at criticality was first established. © 2017 Wiley Periodicals, Inc.

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“…On Z 2 , the continuity of the phase transition was recently proven [DCST14] for dependent percolation models known as random-cluster models with cluster-weight q ∈ [1, 4] (the special case q = 1 corresponds to Bernoulli percolation). The continuity of the phase transition for q = 1 and 2 was previously established by Harris [Har60] and Onsager [Ons44] respectively.…”

Section: Two Generalizationsmentioning

confidence: 99%