Small Deviation Probabilities for Sums of Independent Positive Random Variables

L. V. Rozovsky

doi:10.1134/s1063454120030103

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Small Deviation Probabilities for Sums of Independent Positive Random Variables

L. V. Rozovsky

Year: 2020 Journal: Vestnik St Petersburg University Mathematics Vol: 53 (3)Pages: 295-307 Publisher: Pleiades Publishing

DOI: 10.1134/s1063454120030103

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Abstract

We study the asymptotic behavior at zero of distributions and densities of a sum of several independent positive random variables under certain assumptions on the decay rate of their distributions at zero. We consider cases where the distributions (densities) of summable random variables are regularly or slowly varying at zero or can decrease at zero at an arbitrary rate.

Keywords:

Zero (linguistics) Mathematics Random variable Variables Statistics Statistical physics Applied mathematics Physics

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Probability and Risk Models

Social Sciences → Decision Sciences → Management Science and Operations Research

Stochastic processes and financial applications

Social Sciences → Economics, Econometrics and Finance → Finance

Stochastic processes and statistical mechanics

Physical Sciences → Mathematics → Mathematical Physics

Small Deviation Probabilities for Sums of Independent Positive Random Variables

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