TIGHTNESS OF SUMS OF INDEPENDENT IDENTICALLY DISTRIBUTED PSEUDO-POISSON PROCESSES IN THE SKOROKHOD SPACE

O. V. Rusakov

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TIGHTNESS OF SUMS OF INDEPENDENT IDENTICALLY DISTRIBUTED PSEUDO-POISSON PROCESSES IN THE SKOROKHOD SPACE

机译：Skorokhod空间中独立分布的伪Poisson过程之和的紧度

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We consider a pseudo-Poisson process of the following simple type. This process is a Poissonian subordinator for a sequence of i.i.d. random variables with finite variance. Further we consider sums of i.i.d. copies of a pseudo-Poisson process. For a family of distributions of these random sums, we prove the tightness (relative compactness) in the Skorokhod space. Under the conditions of the Central Limit Theorem for vectors, we establish the weak convergence in the functional Skorokhod space of the examined sums to the Ornstein-Uhlenbeck process. Bibliography: 3 titles.

机译：我们考虑以下简单类型的伪泊松过程。此过程是i.i.d序列的泊松下属。具有有限方差的随机变量。此外，我们考虑i.i.d.伪泊松过程的副本。对于这些随机和的分布族，我们证明了Skorokhod空间中的紧度（相对紧度）。在向量的中心极限定理的条件下，我们在检验和的函数Skorokhod空间中建立了弱收敛到Ornstein-Uhlenbeck过程。参考书目：3个标题。

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《Journal of Mathematical Sciences》 |2017年第5期|805-811|共7页
作者
O. V. Rusakov;
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St.Petersburg State University, St.Petersburg, Russia;

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TIGHTNESS OF SUMS OF INDEPENDENT IDENTICALLY DISTRIBUTED PSEUDO-POISSON PROCESSES IN THE SKOROKHOD SPACE

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