Estimation of stability index for symmetric $$\alpha $$-stable distribution using quantile conditional variance ratios

test Pub Date : 2023-10-30 DOI:10.1007/s11749-023-00894-7
Kewin Pączek, Damian Jelito, Marcin Pitera, Agnieszka Wyłomańska
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引用次数: 1

Abstract

Abstract The class of $$\alpha $$ α -stable distributions is widely used in various applications, especially for modeling heavy-tailed data. Although the $$\alpha $$ α -stable distributions have been used in practice for many years, new methods for identification, testing, and estimation are still being refined and new approaches are being proposed. The constant development of new statistical methods is related to the low efficiency of existing algorithms, especially when the underlying sample is small or the distribution is close to Gaussian. In this paper, we propose a new estimation algorithm for the stability index, for samples from the symmetric $$\alpha $$ α -stable distribution. The proposed approach is based on a quantile conditional variance ratio. We study the statistical properties of the proposed estimation procedure and show empirically that our methodology often outperforms other commonly used estimation algorithms. Moreover, we show that our statistic extracts unique sample characteristics that can be combined with other methods to refine existing methodologies via ensemble methods. Although our focus is set on the symmetric $$\alpha $$ α -stable case, we demonstrate that the considered statistic is insensitive to the skewness parameter change, so our method could be also used in a more generic framework. For completeness, we also show how to apply our method to real data linked to financial market and plasma physics.

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使用分位数条件方差比估计对称$$\alpha $$ -稳定分布的稳定性指数
$$\alpha $$ α稳定分布类广泛应用于各种应用,特别是对重尾数据的建模。虽然$$\alpha $$ α稳定分布已经在实践中使用了许多年,但用于识别、测试和估计的新方法仍在不断改进,并提出了新的方法。新的统计方法的不断发展与现有算法的低效率有关,特别是当底层样本很小或分布接近高斯分布时。本文针对对称$$\alpha $$ α -稳定分布的样本,提出了一种新的稳定性指标估计算法。该方法基于分位数条件方差比。我们研究了所提出的估计过程的统计性质,并通过经验表明,我们的方法通常优于其他常用的估计算法。此外,我们表明,我们的统计提取独特的样本特征,可以与其他方法相结合,通过集成方法来改进现有的方法。虽然我们的重点放在对称$$\alpha $$ α稳定的情况下,但我们证明了所考虑的统计量对偏度参数的变化不敏感,因此我们的方法也可以用于更通用的框架。为了完整起见,我们还展示了如何将我们的方法应用于与金融市场和等离子体物理相关的实际数据。
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Bayesian joint quantile autoregression Comments on: Statistical inference and large-scale multiple testing for high-dimensional regression models Model checking for generalized partially linear models Comments on: Statistical inference and large-scale multiple testing for high-dimensional regression models Bayesian analysis of testing general hypotheses in linear models with spherically symmetric errors
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