Coarsening and percolation in the kinetic 2<i>d</i> Ising model with spin exchange updates and the voter model

Tartaglia, Alessandro; Cugliandolo, Leticia F.; Picco, Marco

doi:10.1088/1742-5468/aad366

Cited by 15 publications

(15 citation statements)

References 84 publications

(201 reference statements)

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“…As shown in Ref. [30], the timescales are all larger in the VM, nonetheless, the overall behavior of H(t) is similar, Fig. 6.…”

Section: Psfrag Replacements N(a T)supporting

confidence: 71%

“…Such mechanism, that breaks the degenerescency of areas depending on the number of sides is absent in the Ising model. Another interesting cases are the Ising model with conserved order parameter [30,35,36] or disorder [37][38][39]. Although we focused here on geometric domains, the heterogeneity associated with the Coniglio-Klein clusters [1] would also be of interest [15], along with the heterogeneity of perimeters.…”

Section: Discussionmentioning

confidence: 99%

“…6. Moreover, defining t p1 and t p as above (even if the critical properties of the percolating cluster do not correspond to critical percolation [30], we can see in Fig. 6 that they are related, respectivelly, to the end of the precursor peak and the end of the plateau.…”

Section: Psfrag Replacements N(a T)mentioning

confidence: 97%

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Dynamical cluster size heterogeneity

et al. 2020

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Only recently the essential role of the percolation critical point has been considered on the dynamical properties of connected regions of aligned spins (domains) after a sudden temperature quench. In equilibrium, it is possible to resolve the contribution to criticality by the thermal and percolative effects (on finite lattices, while in the thermodynamic limit they merge at a single critical temperature) by studying the cluster size heterogeneity, Heq(T ), a measure of how different the domains are in size. We here extend this equilibrium measure and study its temporal evolution, H(t), after driving the system out of equilibrium by a sudden quench in temperature. We show that this single parameter is able to detect and well separate the different time regimes, related to the two time scales in the problem, the short, percolative and the long, coarsening one.

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“…As shown in Ref. [30], the timescales are all larger in the VM, nonetheless, the overall behavior of H(t) is similar, Fig. 6.…”

Section: Psfrag Replacements N(a T)supporting

confidence: 71%

Section: Discussionmentioning

confidence: 99%

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Dynamical cluster size heterogeneity

et al. 2020

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“…Once a percolating domain structure has formed, the fate of the zerotemperature Ising model is sealed [7][8][9]. Percolation and the domain growth in bi-imensional coarsening have been readily studied [7][8][9][10][11][12][13][14][15][16][17][18].…”

Section: Introductionmentioning

confidence: 99%

High-degeneracy Potts coarsening

Denholm

2021

Phys. Rev. E

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I examine the fate of a kinetic Potts ferromagnet with a high ground-state degeneracy that undergoes a deep quench to zero temperature. I consider single spin-flip dynamics on triangular lattices of linear dimension 8 L 128 and set the number of spin states q equal to the number of lattice sites L × L. The ground state is the most abundant final state, and is reached with probability ≈0.71. Three-hexagon states occur with probability ≈0.26, and hexagonal tessellations with more than three clusters form with probabilities of O(10 −3 ) or less. Spanning stripe states-where the domain walls run along one of the three lattice directions-appear with probability ≈0.03. "Blinker" configurations, which contain perpetually flippable spins, also emerge, but with a probability that is vanishingly small with the system size.

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“…The probability of observing each of these topologically distinct behaviours is seemingly identical to the equivalent spanning probability in continuum percolation, and correspondingly explains how the "fate" of the system is sealed [6][7][8][9][10][11]. The role of percolation in the coarsening of 2D Ising ferromagnets has since been studied extensively [12][13][14][15][16][17][18][19][20][21]. In three-dimensions, the system is essentially always trapped in non-static topologically complex configurations at iso-energy ad infinitum [22][23][24][25].…”

Section: Introductionmentioning

confidence: 90%

Anomalous Ising freezing times

Denholm,

Hourahine

2020

Preprint

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We measure the relaxation time of a square lattice Ising ferromagnet that is quenched to zerotemperature from both supercritical and biased initial conditions. We first reveal an anomalous and seemingly overlooked timescale associated with the relaxation to "frozen" two-stripe states. While close to a power law of form ∼ L ν , we argue this timescale actually grows as ∼ L 2 log (L), with L the linear dimension of the system. We uncover the mechanism behind this scaling form by simulating the dynamics from a biased initial condition that replicates the late time ordering of two-stripe states, and subsequently explain this timescale heuristically. Furthermore, we examine the relaxation of long-lived diagonal stripe configurations. Despite growing as roughly ∼ L 3.6 , the relaxation time of diagonal stripe states-which are initially off-axis by π/2 and L/2 in width-exhibits a prominent downward curvature that perhaps signals the approach to the predicted scaling form of ∼ L 3 . We find qualitatively similar behaviour for higher order off-axis windings.

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Coarsening and percolation in the kinetic 2d Ising model with spin exchange updates and the voter model

Cited by 15 publications

References 84 publications

Dynamical cluster size heterogeneity

Dynamical cluster size heterogeneity

High-degeneracy Potts coarsening

Anomalous Ising freezing times

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