一些自分解变量的背景驱动分布函数

Q4 Decision Sciences Mathematica Applicanda Pub Date : 2021-09-05 DOI:10.14708/ma.v49i2.7103

Z. Jurek

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引用次数: 3

摘要

摘要许多经典变量（统计学）是可自分解的。他们通过莱维过程承认了随机积分表示。本文给出了它们的背景驱动分布函数（BDDF）的公式。这可以用于模拟这些变量。讨论的例子包括：伽玛变量、双曲特征函数、Student t分布、平面布朗运动下的随机面积、反高斯变量、逻辑分布、非中心卡方、贝塞尔密度和Fisher z分布。找到的表示可能在统计应用程序中有用。

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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On background driving distribution functions (BDDF) for some selfdecomposable variables

Abstract. Many classical variables (statistics) are selfdecomposable. They admit the random integral representations via Lévy processes. In this note are given formulas for their background driving distribution functions (BDDF). This may be used for a simulation of those variables. Among the examples discussed are: gamma variables, hyperbolic characteristic functions, Student t-distributions, stochastic area under planar Brownian motions, inverse Gaussian variable, logistic distributions, non-central chi-square, Bessel densities and Fisher z-distributions. Found representations might be of use in statistical applications.

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