Upper-bound estimates for weighted sums satisfying Cramer’s condition

Vydas Čekanavičius; Aistė Elijio

doi:10.15388/LMR.2006.30784

Articles

Vydas Čekanavičius

Vilnius University

Aistė Elijio

Vilnius University

Published 2023-09-21

https://doi.org/10.15388/LMR.2006.30784

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Keywords

compound Poisson distribution
signed compound Poissonmeasure
Kolmogorov distance

How to Cite

Čekanavičius, V. and Elijio, A. (2023) “Upper-bound estimates for weighted sums satisfying Cramer’s condition”, Lietuvos matematikos rinkinys, 46(spec.), pp. 427–432. doi:10.15388/LMR.2006.30784.

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Abstract

Let S = ω₁S₁ + ω₂S₂ + ⋯ + ω_NS_N. Here S_jis the sum of identically distributed random variables and ω_j > 0 denotes weight. We consider the case, when S_jis the sum of independent random variables satisfying Cramer’s condition. Upper-bounds for the accuracy of compound Poisson first and second order approximations in uniformmetric are established.

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