Geometrical vs. Fortuin–Kasteleyn clusters in the two-dimensional q-state Potts model

Janke, Wolfhard; Schakel, Adriaan M. J.

doi:10.1016/j.nuclphysb.2004.08.030

Cited by 60 publications

(90 citation statements)

References 44 publications

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“…This behavior is different from what we found in another numerical study of the hulls of geometrical clusters in the 2D Ising model [22]. In that Monte Carlo study, we used a plaquette update to directly simulate the hulls.…”

Section: Geometrical Clusterscontrasting

confidence: 91%

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Two-dimensional critical Potts and its tricritical shadow

Janke

Schakel

2006

Braz. J. Phys.

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These notes give examples of how suitably defined geometrical objects encode in their fractal structure thermal critical behavior. The emphasis is on the two-dimensional Potts model for which two types of spin clusters can be defined. Whereas the Fortuin-Kasteleyn clusters describe the standard critical behavior, the geometrical clusters describe the tricritical behavior that arises when including vacant sites in the pure Potts model. Other phase transitions that allow for a geometrical description discussed in these notes include the superfluid phase transition and Bose-Einstein condensation.

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Section: Geometrical Clusterscontrasting

confidence: 91%

“…The theoretical predictions (22) can be directly verified through Monte Carlo simulations, using the Swendsen-Wang ∝ n −31/15…”

Section: E Swendsen-wang Cluster Updatementioning

confidence: 80%

Two-dimensional critical Potts and its tricritical shadow

Janke

Schakel

2006

Braz. J. Phys.

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“…In this paper, which extends previous work by two of us on the subject [10,11], we describe estimators of physical observables that naturally arise in a loop gas and that allow determining the standard critical exponents. Our approach, put forward in Section 2, amalgamates concepts from percolation theory-the paradigm of a geometrical phase transition-and the theory of self-avoiding random walks.…”

Section: Introductionmentioning

confidence: 72%

Critical loop gases and the worm algorithm

2010

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The loop gas approach to lattice field theory provides an alternative, geometrical description in terms of fluctuating loops. Statistical ensembles of random loops can be efficiently generated by Monte Carlo simulations using the worm update algorithm. In this paper, concepts from percolation theory and the theory of self-avoiding random walks are used to describe estimators of physical observables that utilize the nature of the worm algorithm. The fractal structure of the random loops as well as their scaling properties are studied. To support this approach, the O(1) loop model, or high-temperature series expansion of the Ising model, is simulated on a honeycomb lattice, with its known exact results providing valuable benchmarks.

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“…For instance, it is known that the exponent characterizing the decay of cluster size distribution of critical Fortuin-Kasteleyn clusters [27] in the q-state Potts model [28,29] has a non-trivial dependence on q. We denote all sites occupied by x-mers by 1 and the rest by zero.…”

Section: Nature Of the High-density Disordered Phasementioning

confidence: 99%

Nematic-disordered phase transition in systems of long rigid rods on two-dimensional lattices

et al. 2013

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We study the phase transition from a nematic phase to a high-density disordered phase in systems of long rigid rods of length k on the square and triangular lattices. We use an efficient Monte Carlo scheme that partly overcomes the problem of very large relaxation times of nearly jammed configurations. The existence of a continuous transition is observed on both lattices for k = 7. We study correlations in the high-density disordered phase, and we find evidence of a crossover length scale ξ * 1400, on the square lattice. For distances smaller than ξ * , correlations appear to decay algebraically. Our best estimates of the critical exponents differ from those of the Ising model, but we cannot rule out a crossover to Ising universality class at length scales ≫ ξ * . On the triangular lattice, the critical exponents are consistent with those of the two dimensional three-state Potts universality class.

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Geometrical vs. Fortuin–Kasteleyn clusters in the two-dimensional q-state Potts model

Cited by 60 publications

References 44 publications

Two-dimensional critical Potts and its tricritical shadow

Two-dimensional critical Potts and its tricritical shadow

Critical loop gases and the worm algorithm

Nematic-disordered phase transition in systems of long rigid rods on two-dimensional lattices

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