2011
DOI: 10.1103/physreve.83.061127
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Influence of aperiodic modulations on first-order transitions: Numerical study of the two-dimensional Potts model

Abstract: We study the Potts model on a rectangular lattice with aperiodic modulations in its interactions along one direction. Numerical results are obtained using the Wolff algorithm and for many lattice sizes, allowing for a finite-size scaling analyses to be carried out. Three different self-dual aperiodic sequences are employed, which leads to more precise results, since the exact critical temperature is known. We analyze two models, with 6 and 15 number of states: both present first-order transitions on their unif… Show more

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Cited by 3 publications
(3 citation statements)
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“…We then plot z versus 1/L min , as seen in Fig. 6 [17,18]. The power-law fitting for q = 3 is a good fit for all lattice sizes and we obtain z = 0.55 ± 0.02, which agrees with a previous estimate [19].…”
Section: Resultssupporting
confidence: 83%
See 1 more Smart Citation
“…We then plot z versus 1/L min , as seen in Fig. 6 [17,18]. The power-law fitting for q = 3 is a good fit for all lattice sizes and we obtain z = 0.55 ± 0.02, which agrees with a previous estimate [19].…”
Section: Resultssupporting
confidence: 83%
“…5 we present the autocorrelation time and < n > versus L for q = 3 and q = 4. To calculate z we used a different approach here [17,18]. We perform a power-law fitting using three consecutive lattice size (e.g L = 512, 1024, and 2048) and call L min the smallest size.…”
Section: Resultsmentioning
confidence: 99%
“…The interactions of the model we treat can assume one between two different values, and are ordered according to the Fibonacci aperiodic sequence. For models that have a continuous transition in its uniform version, the influence of aperiodic modulations on their critical behavior is determined by the Harris-Luck criterion [4] (which seems to hold true for models with first-order transition as well [5]). According to this criterion, the Fibonacci sequence is a marginal one; several results show that a marginal perturbation leads to a dependence of the critical exponents on the ratio between the two different interactions [6][7][8].…”
Section: Introductionmentioning
confidence: 99%