基于实值MUSIC算法的电力谐波分析方法

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摘要现代谱估计方法逐渐被应用于电力谐波及间谐波的超分辨率检测与分析, 其中的多重信号分类方法（MUSIC）算法最具代表性。然而, 常规谱MUSIC算法在分析电力谐波时必须将实值信号转换为复频率信号, 因而计算复杂度较高;此外, 其伪频谱的峰值搜索过程也存在着类似栅栏效应, 导致其频率分析精度有限。为了改善谱MUSIC算法对电力谐波的分析精度, 本文基于子空间分析理论提出了针对实值周期信号的谱MUSIC频率检测方法, 推导并给出了其伪谱函数的表达式。在此基础上, 还利用Newton-Raphson算法对伪谱峰值进行迭代求精, 进一步提高了谐波频率的估计精度。仿真结果表明：实值MUSIC伪谱更能有效区分真实谐波谱峰与噪声伪峰, 同时本文方法的计算复杂度远远低于原有复值谱MUSIC算法, 而频率估计精度与求根MUSIC算法接近, 非常有利于电力谐波参数的准确获取。

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	蔡涛
	段善旭
	刘方锐

关键词 ：电力谐波分析, 现代谱估计方法, MUSIC算法, 子空间分解, Newton-Raphson优化

Abstract：In recent years, modern spectral estimation methods, especially the MUSIC (Multiple Signal Classification) algorithms, are gradually used for high-resolution power harmonic analysis. However, most of them are proposed to detect frequencies of complex signals so that any real-valued signal should be transformed into complex form. The preprocessing may lead to higher computation burden. In addition to this, the picket-fence effect also exists in searching spectrum peaks, which causes low analyzing precision. To overcome these drawbacks, a real-valued MUSIC algorithm for power harmonic analysis is proposed in the paper based on subspace decomposition theory. And the computing method of pseduospectra is also derived. Furthermore, to improve the measuring accuracy of harmonics, Newton-Raphson algorithm is adopted to optimize the harmonic frequencies significantly. Simulation results show that: the spectral peaks of true harmonic components are more distinct from false peaks caused by noise in the real-valued MUSIC, and the computational complexity is notably lower than that of the classic MUSIC, as well as the detecting precision is close to that of root-MUSIC algorithm which is quite time-consuming.

Key words： Power harmonic analysis modern spectral estimation method MUSIC algorithm subspace decomposition Newton-Raphson optimization

收稿日期: 2008-12-18 出版日期: 2014-02-18

PACS:	TM711
	TM415

基金资助:国家自然科学基金资助项目（50837003, 50737004）

作者简介: 蔡涛男, 1974年生, 博士后, 讲师, 目前主要研究方向为电力电子装置状态监测与故障诊断、分布式发电能量管理及电能质量分析等。段善旭男, 1970年生, 博士, 教授, 目前主要研究方向为新能源发电及电能质量控制等。

引用本文:

蔡涛, 段善旭, 刘方锐. 基于实值MUSIC算法的电力谐波分析方法[J]. 电工技术学报, 2009, 24(12): 149-155. Cai Tao, Duan Shanxu, Liu Fangrui. Power Harmonic Analysis Based on Real-Valued Spectral MUSIC Algorithm. Transactions of China Electrotechnical Society, 2009, 24(12): 149-155.

链接本文:

http://dgjsxb.ces-transaction.com/CN/Y2009/V24/I12/149

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