无限可分分布根下的闭合与恩布里奇-戈尔迪猜想

Pub Date : 2024-02-17 DOI:10.1007/s10986-024-09620-8

Hui Xu, Changjun Yu, Yuebao Wang, Dongya Cheng

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引用次数: 0

摘要

我们证明了分布类ℒ(γ) \𝒪𝒮在γ >0的无限可分分布根下并不封闭，也就是说，我们提供了一些属于该类的无限可分分布，而相应的莱维分布却不属于该类。事实上，这些属于𝒪ℒ\ℒ(γ)类的Lévy分布的一部分具有不同的性质，另一部分甚至不属于𝒪ℒ类。因此，结合已有的相关结果，我们给出了完全否定该主题和恩布里奇-戈尔迪猜想的结论。然后，我们讨论与本文结果相关的一些有趣问题。

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Closure under infinitely divisible distribution roots and the Embrechts–Goldie conjecture

We show that the distribution class ℒ(γ) \ 𝒪𝒮 is not closed under infinitely divisible distribution roots for γ > 0, that is, we provide some infinitely divisible distributions belonging to the class, whereas the corresponding Lévy distributions do not. In fact, one part of these Lévy distributions belonging to the class 𝒪ℒ\ℒ(γ) have different properties, and the other parts even do not belong to the class 𝒪ℒ. Therefore, combining with the existing related results, we give a completely negative conclusion for the subject and Embrechts–Goldie conjecture. Then we discuss some interesting issues related to the results of this paper.

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