Variable-Step Multiscale Katz Fractal Dimension: A New Nonlinear Dynamic Metric for Ship-Radiated Noise Analysis

IF 3.6 2区 数学 Q1 MATHEMATICS, INTERDISCIPLINARY APPLICATIONS
Yuxing Li, Yuhan Zhou, Shangbin Jiao
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引用次数: 0

Abstract

The Katz fractal dimension (KFD) is an effective nonlinear dynamic metric that characterizes the complexity of time series by calculating the distance between two consecutive points and has seen widespread applications across numerous fields. However, KFD is limited to depicting the complexity of information from a single scale and ignores the information buried under different scales. To tackle this limitation, we proposed the variable-step multiscale KFD (VSMKFD) by introducing a variable-step multiscale process in KFD. The proposed VSMKFD overcomes the disadvantage that the traditional coarse-grained process will shorten the length of the time series by varying the step size to obtain more sub-series, thus fully reflecting the complexity of information. Three simulated experimental results show that the VSMKFD is the most sensitive to the frequency changes of a chirp signal and has the best classification effect on noise signals and chaotic signals. Moreover, the VSMKFD outperforms five other commonly used nonlinear dynamic metrics for ship-radiated noise classification from two different databases: the National Park Service and DeepShip.
变步多尺度卡茨分形维度:用于船舶辐射噪声分析的新非线性动态指标
卡茨分形维度(KFD)是一种有效的非线性动态度量,它通过计算两个连续点之间的距离来表征时间序列的复杂性,已在众多领域得到广泛应用。然而,KFD 只限于描述单一尺度信息的复杂性,而忽略了不同尺度下的信息。针对这一局限性,我们提出了变步多尺度 KFD(VSMKFD),在 KFD 中引入了变步多尺度过程。所提出的 VSMKFD 克服了传统粗粒度过程会缩短时间序列长度的缺点,通过改变步长获得更多的子序列,从而充分反映信息的复杂性。三个模拟实验结果表明,VSMKFD 对啁啾信号的频率变化最为敏感,对噪声信号和混沌信号的分类效果最好。此外,在对国家公园管理局和 DeepShip 两个不同数据库中的船舶辐射噪声进行分类时,VSMKFD 优于其他五个常用的非线性动态指标。
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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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