矩偏度、峰度和正态性的JB检验

IF 1 Q3 Mathematics
Md. Siraj-Ud-Doulah
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引用次数: 1

摘要

如果我们知道集中趋势和离散的统计量,我们仍然不能对分布进行完整的设计。对于这些度量,我们应该知道更多的偏度和峰度的信息,这使我们能够对分布进行设计。然而,有证据表明,当数据中出现异常值或异常值时,它们可能反应不佳。我们检查了流行和经常使用的偏度(β1),峰度(β2)和Jarque - Bera正态性检验的性能,它们可能不会执行,并且我们预计存在非正态性或异常值。本文首先建立了矩的鲁棒度量,并提出了一种新的偏度和峰度统计量,分别称为鲁棒偏度(φ1)和鲁棒峰度(φ2)。本文再次对Jarque-Bera正态性检验进行修正,将其标记为鲁棒Jarque-Bera (Robust Jarque-Bera, RJB)。这些措施应该相当稳健。通过仿真方法验证了所提措施的有效性。结果表明,新提出的偏度(φ1)、峰度(φ2)和RJB检验在数据中存在或不存在少量异常值时优于偏度、峰度和Jarque-Bera正态性检验。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
An Alternative Measures of Moments Skewness Kurtosis and JB Test of Normality
If we know the statistics of central tendency and dispersion, we still cannot nature a complete design about the distribution. About these measures we should know more information’s of skewness and kurtosis, which are enables us to have a design the distribution. However, there is evidence that they may response poorly in the presence of non-normality or when outliers arise in data. We examine the performances of popular and frequently used measures of skewness ( β1 ) , kurtosis ( β2 ) and Jarque– Bera test of normality that they may not perform and we anticipates in the existence of non-normality or outliers. In this paper, firstly, we develop robust measures of moments and we formulate a new statistics of skewness and kurtosis which we name robust skewness ( φ1 ) and robust kurtosis ( φ2 ) . Again, in this paper, we modify Jarque–Bera test of normality, which we label Robust Jarque–Bera (RJB). These measures should be fairly robust. The effectiveness of the proposedmeasures is investigated by simulation approach. The results demonstrate that the newly proposed skewness ( φ1 ) , kurtosis ( φ2 ) and RJB test outperform the skewness, kurtosis and Jarque–Bera test of normality when a small percentage of outliers are present or absent in the data.
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来源期刊
CiteScore
2.30
自引率
0.00%
发文量
13
审稿时长
13 weeks
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