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引用次数: 0
摘要
本文考虑函数fp(t) = ?2 p 2 (?2 pt + p, p)在哪里? 2 (x; n)定义的? 2 (x, p) = 2 ? p / 2 / ? ? (p / 2) e x / 2 xp / 2 ?1,是n个自由度的?2分布的密度函数。p(t)的渐近展开式其中p不一定是整数,它是通过应用ln ?(x)的标准渐近得到的。给出了两种不同的求渐近展开系数的方法,这两种方法都涉及到贝尔多项式的使用。
Complete asymptotic expansions related to the probability density function of the χ2-distribution
In this paper, we consider the function fp(t) = ? 2p?2(?2pt + p;p), where ?2(x;n) defined by ?2(x;p) = 2?p/2/?(p/2) e?x/2xp/2?1, is the density function of a ?2-distribution with n degrees of freedom. The asymptotic expansion of fp(t) for p ? ?, where p is not necessarily an integer, is obtained by an application of the standard asymptotics of ln ?(x). Two different methods of obtaining the coefficients in the asymptotic expansion are presented, which involve the use of the Bell polynomials.
期刊介绍:
Applicable Analysis and Discrete Mathematics is indexed, abstracted and cover-to cover reviewed in: Web of Science, Current Contents/Physical, Chemical & Earth Sciences (CC/PC&ES), Mathematical Reviews/MathSciNet, Zentralblatt für Mathematik, Referativny Zhurnal-VINITI. It is included Citation Index-Expanded (SCIE), ISI Alerting Service and in Digital Mathematical Registry of American Mathematical Society (http://www.ams.org/dmr/).
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