高临界维度以上分形时间过程的临界指数和普遍性

IF 3.6 2区 数学 Q1 MATHEMATICS, INTERDISCIPLINARY APPLICATIONS Fractal and Fractional Pub Date : 2024-05-16 DOI:10.3390/fractalfract8050294
Shaolong Zeng, Yangfan Hu, Shijing Tan, Biao Wang
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引用次数: 0

摘要

我们研究了上临界维度以上分形时间过程系统的临界行为。无论分形时间导数的阶数如何,也无论哈密顿中相互作用的具体形式如何,我们都得出了一组新的临界指数。对于分形时间过程,我们不仅发现了具有维常数的新普遍性类别,而且分解了危险的无关变量,从而获得了临界动态行为和静态临界特性的修正。这与临界现象的传统理论形成了鲜明对比,后者认为静态临界指数与动态过程无关。对分形时间过程的兰道-金兹堡模型和具有时间长程相互作用的伊辛模型的模拟都显示出与我们的临界指数集很好的一致性,验证了它的普遍性。这一新的普遍性类别的发现为研究临界点附近的系统是否正在经历分形时间过程提供了一种方法。
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Critical Exponents and Universality for Fractal Time Processes above the Upper Critical Dimensionality
We study the critical behaviors of systems undergoing fractal time processes above the upper critical dimension. We derive a set of novel critical exponents, irrespective of the order of the fractional time derivative or the particular form of interaction in the Hamiltonian. For fractal time processes, we not only discover new universality classes with a dimensional constant but also decompose the dangerous irrelevant variables to obtain corrections for critical dynamic behavior and static critical properties. This contrasts with the traditional theory of critical phenomena, which posits that static critical exponents are unrelated to the dynamical processes. Simulations of the Landau–Ginzburg model for fractal time processes and the Ising model with temporal long-range interactions both show good agreement with our set of critical exponents, verifying its universality. The discovery of this new universality class provides a method for examining whether a system is undergoing a fractal time process near the critical point.
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来源期刊
Fractal and Fractional
Fractal and Fractional MATHEMATICS, INTERDISCIPLINARY APPLICATIONS-
CiteScore
4.60
自引率
18.50%
发文量
632
审稿时长
11 weeks
期刊介绍: Fractal and Fractional is an international, scientific, peer-reviewed, open access journal that focuses on the study of fractals and fractional calculus, as well as their applications across various fields of science and engineering. It is published monthly online by MDPI and offers a cutting-edge platform for research papers, reviews, and short notes in this specialized area. The journal, identified by ISSN 2504-3110, encourages scientists to submit their experimental and theoretical findings in great detail, with no limits on the length of manuscripts to ensure reproducibility. A key objective is to facilitate the publication of detailed research, including experimental procedures and calculations. "Fractal and Fractional" also stands out for its unique offerings: it warmly welcomes manuscripts related to research proposals and innovative ideas, and allows for the deposition of electronic files containing detailed calculations and experimental protocols as supplementary material.
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