Evaluation of the Minimum Size of a Window for Harmonics Signals

Q3 Computer Science

Journal of Information Hiding and Multimedia Signal Processing Pub Date : 2016-10-11 DOI:10.4236/JSIP.2016.74017

J. A. Reyes, C. S. Forgach

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引用次数: 6

Abstract

Windowing applied to a given signal is a technique commonly used in signal processing in order to reduce spectral leakage in a signal with many data. Several windows are well known: hamming, hanning, beartlett, etc. The selection of a window is based on its spectral characteristics. Several papers that analyze the amplitude and width of the lobes that appear in the spectrum of various types of window have been published. This is very important because the lobes can hide information on the frequency components of the original signal, in particular when frequency components are very close to each other. In this paper it is shown that the size of the window can also have an impact in the spectral information. Until today, the size of a window has been chosen in a subjective way. As far as we know, there are no publications that show how to determine the minimum size of a window. In this work the frequency interval between two consecutive values of a Fourier Transform is considered. This interval determines if the sampling frequency and the number of samples are adequate to differentiate between two frequency components that are very close. From the analysis of this interval, a mathematical inequality is obtained, that determines in an objective way, the minimum size of a window. Two examples of the use of this criterion are presented. The results show that the hiding of information of a signal is due mainly to the wrong choice of the size of the window, but also to the relative amplitude of the frequency components and the type of window. Windowing is the main tool used in spectral analysis with nonparametric periodograms. Until now, optimization was based on the type of window. In this paper we show that the right choice of the size of a window assures on one hand that the number of data is enough to resolve the frequencies involved in the signal, and on the other, reduces the number of required data, and thus the processing time, when very long files are being analyzed.

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谐波信号窗口最小尺寸的评估

对给定信号加窗是信号处理中常用的一种技术，其目的是减少多数据信号中的频谱泄漏。有几个窗是众所周知的:汉明、汉宁、贝尔特莱特等。窗口的选择是基于其光谱特性。已经发表了几篇论文，分析了出现在各种类型窗口光谱中的叶的振幅和宽度。这是非常重要的，因为瓣可以隐藏原始信号的频率分量信息，特别是当频率分量彼此非常接近时。本文表明，窗口的大小也会对光谱信息产生影响。直到今天，窗口的大小都是以主观的方式选择的。据我们所知，没有出版物说明如何确定窗口的最小大小。在这项工作中，考虑了傅里叶变换的两个连续值之间的频率间隔。这个间隔决定了采样频率和采样数量是否足以区分两个非常接近的频率分量。通过对这个区间的分析，得到了一个数学不等式，它客观地确定了窗口的最小尺寸。给出了使用这一标准的两个例子。结果表明，信号信息的隐藏主要是由于窗口大小的选择错误，也与频率分量的相对幅值和窗口类型有关。窗是用于非参数周期图谱分析的主要工具。到目前为止，优化是基于窗口的类型。在本文中，我们展示了窗口大小的正确选择，一方面保证了数据的数量足以解决信号中涉及的频率，另一方面，减少了所需数据的数量，从而减少了处理时间，当非常长的文件被分析时。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Journal of Information Hiding and Multimedia Signal Processing Computer Science-Software

CiteScore

3.20

自引率

0.00%

发文量