English

Mixed Poisson process with Min-U-Exp mixing variable

Probability 2024-08-27 v3

Abstract

This work continues the research done in Jordanova and Veleva (2023) where the history of the problem could be found. In order to obtain the structure distribution of the newly-defined Mixed Poisson process, here the operation "max" is replaced with "min". We start with the definition of Min-U-Exp distribution. Then, we compute its numerical characteristics and investigate some of its properties. The joint distribution of the inter-arrival times (which are dependent) is the Multivariate Exp-Min-U-Exp distribution of IIndII^{-nd} kind. Its univariate and multivariate versions are described, and the formulae for their numerical characteristics are obtained. The distribution of the moments of arrival of different events is called Erlang-Min-U-Exp. Different properties of these distributions are obtained, and their numerical characteristics are computed. Multivariate ordered Mixed Poisson-Min-U-Exp distribution describes the joint distribution of the time-intersection of a Mixed Poisson process with Min-U-Exp mixing variable. The corresponding distribution of the additive increments (which are also dependent) is the Mixed Poisson-Min-U-Exp one. The considered relations between these distributions simplify their understanding.

Keywords

Cite

@article{arxiv.2312.16595,
  title  = {Mixed Poisson process with Min-U-Exp mixing variable},
  author = {Pavlina K. Jordanova and Evelina Veleva and Milan Stehlik},
  journal= {arXiv preprint arXiv:2312.16595},
  year   = {2024}
}

Comments

Work in progress. arXiv admin note: text overlap with arXiv:2307.09798

R2 v1 2026-06-28T14:03:02.459Z