Application of Tauberian Theorem to the Exponential Decay of the Tail Probability of a Random Variable

Author

Nakagawa, Kenji

Author_Institution

Nagaoka Univ. of Technol., Niigata

Volume

53

Issue

9

fYear

2007

Firstpage

3239

Lastpage

3249

Abstract

In this correspondence, we give a sufficient condition for the exponential decay of the tail probability of a nonnegative random variable. We consider the Laplace-Stieltjes transform of the probability distribution function of the random variable. We present a theorem, according to which if the abscissa of convergence of the LS transform is negative finite and the real point on the axis of convergence is a pole of the LS transform, then the tail probability decays exponentially. For the proof of the theorem, we extend and apply so-called a finite form of Ikehara´s complex Tauberian theorem by Graham-Vaaler.

Keywords

Laplace transforms; statistical distributions; Laplace-Stieltjes transform; Tail Probability; Tauberian theorem; exponential decay; nonnegative random variable; probability distribution function; Capacity planning; Convergence; Laplace equations; Performance analysis; Probability distribution; Queueing analysis; Random variables; Sufficient conditions; Tail; Time measurement; Complex Tauberian theorem; Graham–Vaaler´s finite form; Laplace transform; exponential decay; tail probability of random variable;

fLanguage

English

Journal_Title

Information Theory, IEEE Transactions on

Publisher

ieee

ISSN

0018-9448

Type

jour

DOI

10.1109/TIT.2007.903114

Filename

4294165