On Underdispersed Count Kernels for Smoothing Probability Mass Functions

IF 0.9 Q4 MATHEMATICS, INTERDISCIPLINARY APPLICATIONS

Stats Pub Date : 2023-11-04 DOI:10.3390/stats6040076

Célestin C. Kokonendji, Sobom M. Somé, Youssef Esstafa, Marcelo Bourguignon

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Abstract

Only a few count smoothers are available for the widespread use of discrete associated kernel estimators, and their constructions lack systematic approaches. This paper proposes the mean dispersion technique for building count kernels. It is only applicable to count distributions that exhibit the underdispersion property, which ensures the convergence of the corresponding estimators. In addition to the well-known binomial and recent CoM-Poisson kernels, we introduce two new ones such the double Poisson and gamma-count kernels. Despite the challenging problem of obtaining explicit expressions, these kernels effectively smooth densities. Their good performances are pointed out from both numerical and comparative analyses, particularly for small and moderate sample sizes. The optimal tuning parameter is here investigated by integrated squared errors. Also, the added advantage of faster computation times is really very interesting. Thus, the overall accuracy of two newly suggested kernels appears to be between the two old ones. Finally, an application including a tail probability estimation on a real count data and some concluding remarks are given.

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光滑概率质量函数的欠分散计数核

对于离散相关核估计的广泛使用，只有少数计数平滑器可用，而且它们的构造缺乏系统的方法。提出了一种基于平均色散的计数核构建技术。它只适用于表现出欠色散性质的计数分布，这保证了相应估计量的收敛性。除了众所周知的二项和最近的com -泊松核外，我们还引入了两种新的核，即双泊松核和伽马计数核。尽管获得显式表达式具有挑战性，但这些核有效地平滑了密度。数值分析和对比分析都指出了它们的良好性能，特别是在中小型样本量下。本文用积分平方误差研究了最优调谐参数。此外，更快的计算时间的附加优势也非常有趣。因此，两个新提出的核的总体精度似乎介于两个旧的核之间。最后给出了一个包含尾概率估计的实际计数数据的应用，并给出了一些结论。

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

Stats

CiteScore

0.60

自引率

0.00%

发文量

审稿时长

7 weeks