Please use this identifier to cite or link to this item: http://rportal.lib.ntnu.edu.tw:80/handle/20.500.12235/111390
DC FieldValueLanguage
dc.contributor江府峻zh_TW
dc.contributorJiang, Fu-Jiunen_US
dc.contributor.author彭兆宏zh_TW
dc.contributor.authorPeng, Jhao-Hongen_US
dc.date.accessioned2020-12-14T09:01:58Z-
dc.date.available2020-01-21
dc.date.available2020-12-14T09:01:58Z-
dc.date.issued2020
dc.identifierG060741031S
dc.identifier.urihttp://etds.lib.ntnu.edu.tw/cgi-bin/gs32/gsweb.cgi?o=dstdcdr&s=id=%22G060741031S%22.&
dc.identifier.urihttp://rportal.lib.ntnu.edu.tw:80/handle/20.500.12235/111390-
dc.description.abstractnonezh_TW
dc.description.abstractInspired by many evidence showing that the Harris criterion could be violated in quantum phase transitions, we study the second-order quantum phase transition of a spin-1/2 antiferromagnetic Heisenberg model with a specific quenched disorder. In particular, various strengths of randomness are considered in our investigation. The studied models will undergo quantum phase transitions by tuning the dimerized-couplings which are close related to the strength of randomness. In addition, the strength of the employed randomness is controlled by a parameter $p$ which is in the range from 0 to 1, where the clean model corresponds to $p=0$. In this study, we use the stochastic series expansion with efficient loop-update to perform the large-scale quantum Monte Carlo simulation and compute certain physical observables of the model. The critical exponent of the correlation length is evaluated from the finite-size scaling analysis with the Binder ratios as the observables. In order to estimate the statistical uncertainties in a self-consistent way, we analyze the data in the Bayesian inference framework. In the case of $p=0$, we find that the critical exponent of the correlation length $\nu$ is 0.702(9) which is in reasonably good agreement with the result of $\mathcal{O}(3)$ universality class, and doesn't fulfill the Harris inequality $\nu>2/d$, where $d$ is the spatial dimension and is 2 in this case. Remarkably, while we find that those $\nu$ of $p \le 0.8$ do not fulfill the Harris inequality $\nu > 2/d$, the $\nu$ associated with $p = 0.9$ satisfies such. This interesting phenomenon is not pointed out explicitly before in the literature.en_US
dc.language英文
dc.subjectnonezh_TW
dc.subjectquantum phase transitionen_US
dc.subjectquenched disorderen_US
dc.subjectHarris criterionen_US
dc.subjectquantum Monte Carloen_US
dc.title哈里斯準則對淬火無序二維量子自旋系統的有效性zh_TW
dc.titleValidity of Harris criterion for two-dimensional quantum spin systems with quenched disorderen_US
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