Characterization of Probability Distributions via Functional Equations of Power-Mixture Type

Chin-yuan Hu, G. D. Lin, J. Stoyanov
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Abstract

We study power-mixture type functional equations in terms of Laplace-Stieltjes transforms of probability distributions. These equations arise when studying distributional equations of the type Z = X + TZ, where T is a known random variable, while the variable Z is defined via X, and we want to `find' X. We provide necessary and sufficient conditions for such functional equations to have unique solutions. The uniqueness is equivalent to a characterization property of a probability distribution. We present results which are either new or extend and improve previous results about functional equations of compound-exponential and compound-Poisson types. In particular, we give another affirmative answer to a question posed by J. Pitman and M. Yor in 2003. We provide explicit illustrative examples and deal with related topics.
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用功率混合型泛函方程表征概率分布
利用概率分布的Laplace-Stieltjes变换研究了功率混合型泛函方程。这些方程是在研究Z = X + TZ类型的分布方程时产生的,其中T是已知的随机变量,而变量Z是通过X定义的,我们想要“找到”X。我们提供了这种泛函方程具有唯一解的充分必要条件。唯一性等价于一个概率分布的表征性质。本文给出了一些关于复合指数型和复合泊松型泛函方程的新结果或推广和改进了以往的结果。特别是,我们对J. Pitman和M. Yor在2003年提出的一个问题给出了另一个肯定的答案。我们提供了明确的说明性的例子,并处理相关的主题。
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