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机械故障诊断中。WAWD 通过非线性拟合以及构 nonlinear and non-stationary time series analysis[J].
建时变波形函数,将复杂信号分解成多个时变波形 Proceedings: Mathematical, Physical and Engineering
分量,有效地提高了分解精度;通过小波阈值降噪, Sciences,1998,454(1971): 903-995.
[9] YUAN J, XU C, ZHAO Q, et al. High-fidelity noise-
减少了噪声对于分解结果的干扰,提高了 WAWD
reconstructed empirical mode decomposition for me⁃
方法的噪声鲁棒性。将该方法应用于仿真信号以及
chanical multiple and weak fault extractions[J]. ISA
滚动轴承故障信号试验,结果表明,WAWD 方法具
Transactions, 2022,129(Pt.B): 380-397.
有更强的噪声鲁棒性,能够有效地提取故障信息,具
[10] DRAGOMIRETSKIY K, ZOSSO D. Variational mode
有更优越的故障诊断能力。 decomposition[J]. IEEE Transactions on Signal Process⁃
ing: a Publication of the IEEE Signal Processing Society,
参考文献: 2014, 62(3): 531-544.
[11] 周小龙,徐鑫莉,王尧,等 . 基于变分模态分解和最大
重叠离散小波包变换的齿轮信号去噪方法[J]. 振动与
[1] YING W M, ZHENG J D, PAN H Y, et al. Permuta⁃
冲击,2021,40(12):265-274.
tion entropy-based improved uniform phase empirical
ZHOU Xiaolong, XU Xinli, WANG Yao, et al. A
mode decomposition for mechanical fault diagnosis[J].
gear signal de-noising method based on variational mode
Digital Signal Processing,2021,117: 103167.
[2] 陈是扦,彭志科,周鹏 . 信号分解及其在机械故障诊断 decomposition and maximal overlap discrete wavelet
中的应用研究综述[J]. 机械工程学报,2020,56(17): packet transform[J]. Journal of Vibration and Shock,
91-107. 2021,40(12): 265-274.
[12] NAZARI M, SAKHAEI S M. Successive variational
CHEN Shiqian, PENG Zhike, ZHOU Peng. Review
mode decomposition[J]. Signal Processing,2020,174:
of signal decomposition theory and its applications in
107610.
machine fault diagnosis[J]. Journal of Mechanical Engi⁃
[13] COLOMINAS M A, WU H T. Decomposing non-sta⁃
neering,2020,56 (17): 91-107.
[3] 郑近德,应万明,潘海洋,等 . 基于改进全息希尔伯特 tionary signals with time-varying wave-shape functions
谱分析的旋转机械故障诊断方法[J]. 机械工程学报, [J]. IEEE Transactions on Signal Processing,2021,
2023,59(1):162-174. 69: 5094-5104.
[14] WEI S, YANG Y, DU M G, et al. Varying wave-
ZHENG Jinde, YING Wanming, PAN Haiyang, et al.
shape component decomposition: algorithm and applica⁃
Improved Holo-Hilbert spectrum analysis-based fault di⁃
tions[J]. IEEE Transactions on Industrial Electronics,
agnosis method for rotating machines[J]. Journal of Me⁃
2022,70(10): 10648-10658.
chanical Engineering,2023,59(1): 162-174.
[15] RUIZ J, SCHLOTTHAUER G, VIGNOLO L, et al.
[4] DURAK L, ARIKAN O. Short-time Fourier trans⁃
Fully adaptive time-varying wave-shape model: applica⁃
form: two fundamental properties and an optimal imple⁃
mentation[J]. IEEE Transactions on Signal Processing, tions in biomedical signal processing[J]. Signal Process⁃
ing,2024,214: 109258.
2003,51(5):1231-1242.
[16] ZHAO C, ZIO E, SHEN W M. Domain generalization
[5] RIOUL O, VETTERLI M. Wavelets and signal pro⁃
for cross domain fault diagnosis: an application-oriented
cessing[J]. IEEE Signal Processing Magazine,1991,8
perspective and a benchmark study[J]. Reliability Engi⁃
(4): 14-38.
neering & System Safety, 2024, 245: 109964.
[6] MALLAT S G. A theory for multiresolution signal de⁃
[17] 程健,程军圣,李鑫,等 . 增强 Ramanujan 模态分解方法
composition: the wavelet representation[J]. IEEE Trans⁃
及其在滚动轴承故障诊断中的应用[J]. 机械工程学
actions on Pattern Analysis and Machine Intelligence,
报,2022,58(19):130-138.
1989, 11(7): 674-693
[7] 李恒,张氢,秦仙蓉,等 . 基于短时傅里叶变换和卷积 CHENG Jian, CHENG Junsheng, LI Xin, et al. En⁃
神经网络的轴承故障诊断方法[J]. 振动与冲击,2018, hanced Ramanujan mode decomposition method and its
37(19):124-131. application to rolling bearing fault diagnosis[J]. Journal
LI Heng, ZHANG Qing, QIN Xianrong, et al. Fault di⁃ of Mechanical Engineering,2022,58(19): 130-138.
agnosis method for rolling bearings based on short-time
第一作者: 齐鹏宇(1999—),男,硕士研究生。
Fourier transform and convolution neural network[J].
E-mail:15256051025@163.com
Journal of Vibration and Shock,2018,37(19): 124-131.
通信作者:郑近德(1986—),男,博士,教授。
[8] HUANG N E, SHEN Z, LONG S R, et al. The em⁃
pirical mode decomposition and the Hilbert spectrum for E-mail:lqdlzheng@126.com
