Accurate Sinusoidal Frequency Estimation Algorithm for Internet of Things Based on Phase Angle Interpolation Using Frequency Shift

被引:2
|
作者
Cheng, Minglong [1 ]
Jia, Guoqing [1 ]
Fang, Weidong [2 ,3 ,4 ]
Yi, Huiyue [2 ,4 ]
Zhang, Wuxiong [2 ,3 ,4 ]
机构
[1] Qinghai Minzu Univ, Coll Phys & Elect Informat Engn, Xining 810007, Peoples R China
[2] Chinese Acad Sci, Shanghai Inst Microsyst & Informat Technol, Sci & Technol Microsyst Lab, Shanghai 201800, Peoples R China
[3] Univ Chinese Acad Sci, Beijing 100049, Peoples R China
[4] Shanghai Res & Dev Ctr Micronano Elect, Shanghai 200120, Peoples R China
来源
APPLIED SCIENCES-BASEL | 2022年 / 12卷 / 12期
关键词
frequency estimation; phase angle interpolation; frequency shift; Cramer-Rao lower bound; EFFICIENT; SIGNAL;
D O I
10.3390/app12126232
中图分类号
O6 [化学];
学科分类号
0703 ;
摘要
Frequency estimation of a sinusoidal signal is a fundamental problem in signal processing for the Internet of Things. The frequency interpolation estimation algorithm based on the fast Fourier transform is susceptible to being disturbed by noise, which leads to estimation error. In order to improve the accuracy of frequency estimation, an improved Rife frequency estimation algorithm based on phase angle interpolation is proposed in this paper, namely the PAI-Rife algorithm. We changed the existing frequency deviation factor of the Rife algorithm using phase angle interpolation. Then, by setting the frequency shift threshold, the frequency that is not within the threshold range is shifted to the optimal estimation space. The simulation results show that the proposed algorithm has a wider valid estimation range, and the estimated standard deviation is closer to the Cramer-Rao lower bound. Compared with the Rife algorithm and some recently proposed advanced algorithms, the proposed algorithm has less computational complexity, lower misjudgment rate, and more stable performance.
引用
收藏
页数:17
相关论文
共 50 条
  • [21] Proposal of an Accurate and Low Complexity Method for Frequency Estimation Using DFT Interpolation
    Arva, Mihai Catalin
    Bizon, Nicu
    Micu, Augustin
    2017 40TH INTERNATIONAL CONFERENCE ON TELECOMMUNICATIONS AND SIGNAL PROCESSING (TSP), 2017, : 474 - 479
  • [22] Accurate frequency estimation of multiple complex and real sinusoids based on iterative interpolation
    Mou, Ze-Long
    Tu, Ya-Qing
    Chen, Peng
    Wang, Kui
    DIGITAL SIGNAL PROCESSING, 2021, 117
  • [23] The Demodulation Algorithm of Track Frequency Shift Signal Based on Windowed Interpolation FFT
    Chen, Shushu
    Wu, Mengze
    An, Yiyan
    Song, Jiancheng
    Tian, Muqin
    2017 IEEE INTERNATIONAL CONFERENCE ON INDUSTRIAL TECHNOLOGY (ICIT), 2017, : 1081 - 1084
  • [24] A new and accurate frequency estimation approach based on the phase difference
    Zhang, Hai-Ying
    Yuan, Chao-Wei
    Xi'an Dianzi Keji Daxue Xuebao/Journal of Xidian University, 2007, 34 (06): : 969 - 973
  • [25] Maximum Likelihood Based Joint Angle-frequency Estimation Using QPSO Algorithm
    Zhang Zhi-cheng
    Yu Xiao-hui
    Shi Yao-wu
    APPLIED SCIENCE, MATERIALS SCIENCE AND INFORMATION TECHNOLOGIES IN INDUSTRY, 2014, 513-517 : 1227 - 1232
  • [26] Computationally Efficient Architecture for Accurate Frequency Estimation with Fourier Interpolation
    Dongpei Liu
    Hengzhu Liu
    Li Zhou
    Jianfeng Zhang
    Botao Zhang
    Circuits, Systems, and Signal Processing, 2014, 33 : 781 - 797
  • [27] Computationally Efficient Architecture for Accurate Frequency Estimation with Fourier Interpolation
    Liu, Dongpei
    Liu, Hengzhu
    Zhou, Li
    Zhang, Jianfeng
    Zhang, Botao
    CIRCUITS SYSTEMS AND SIGNAL PROCESSING, 2014, 33 (03) : 781 - 797
  • [28] Sinusoidal frequency estimation using filter banks
    Tkacenko, A
    Vaidyanathan, PP
    2001 IEEE INTERNATIONAL CONFERENCE ON ACOUSTICS, SPEECH, AND SIGNAL PROCESSING, VOLS I-VI, PROCEEDINGS: VOL I: SPEECH PROCESSING 1; VOL II: SPEECH PROCESSING 2 IND TECHNOL TRACK DESIGN & IMPLEMENTATION OF SIGNAL PROCESSING SYSTEMS NEURALNETWORKS FOR SIGNAL PROCESSING; VOL III: IMAGE & MULTIDIMENSIONAL SIGNAL PROCESSING MULTIMEDIA SIGNAL PROCESSING - VOL IV: SIGNAL PROCESSING FOR COMMUNICATIONS; VOL V: SIGNAL PROCESSING EDUCATION SENSOR ARRAY & MULTICHANNEL SIGNAL PROCESSING AUDIO & ELECTROACOUSTICS; VOL VI: SIGNAL PROCESSING THEORY & METHODS STUDENT FORUM, 2001, : 4042 - 4043
  • [29] Sinusoidal frequency estimation using filter banks
    Tkacenko, A
    Vaidyanathan, PP
    2001 IEEE INTERNATIONAL CONFERENCE ON ACOUSTICS, SPEECH, AND SIGNAL PROCESSING, VOLS I-VI, PROCEEDINGS: VOL I: SPEECH PROCESSING 1; VOL II: SPEECH PROCESSING 2 IND TECHNOL TRACK DESIGN & IMPLEMENTATION OF SIGNAL PROCESSING SYSTEMS NEURALNETWORKS FOR SIGNAL PROCESSING; VOL III: IMAGE & MULTIDIMENSIONAL SIGNAL PROCESSING MULTIMEDIA SIGNAL PROCESSING - VOL IV: SIGNAL PROCESSING FOR COMMUNICATIONS; VOL V: SIGNAL PROCESSING EDUCATION SENSOR ARRAY & MULTICHANNEL SIGNAL PROCESSING AUDIO & ELECTROACOUSTICS; VOL VI: SIGNAL PROCESSING THEORY & METHODS STUDENT FORUM, 2001, : 3089 - 3092
  • [30] OPTIMAL EIGENVALUE DECOMPOSITION BASED FREQUENCY ESTIMATION ALGORITHM FOR COMPLEX SINUSOIDAL SIGNALS
    Zubair, Muhammad
    Ahmed, Sajid
    Jardak, Seifallah
    Alouini, Mohamed-Slim
    2018 IEEE GLOBAL CONFERENCE ON SIGNAL AND INFORMATION PROCESSING (GLOBALSIP 2018), 2018, : 1119 - 1123
12345