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An estimate of the probability that the queue length exceeds the maximum for a queue that is a generalized Ornstein-Uhlenbeck stochastic process

Author(s): R. E. Yamnenko
Translated by: S. Kvasko
Original publication: Teoriya Imovirnostei ta Matematichna Statistika, vipusk 73 (2005).
Journal: Theor. Probability and Math. Statist. No. 73 (2006), 181-194.
MSC (2000): Primary 60G07; Secondary 60K25
Posted: January 19, 2007
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Abstract: We consider the process

$\displaystyle A(t)=mt+\sigma \int_0^t X(u)\, d u,\qquad t\geq 0, $

describing the queue length, where $ m$ and $ \sigma$ are positive constants, $ X(u)$ is a $ \varphi$-sub-Gaussian generalized Ornstein-Uhlenbeck stochastic process, and

\begin{displaymath} \varphi(u)= \begin{cases} u^r, & \vert u\vert >1, u^2, & \vert u\vert\le1, \end{cases}\end{displaymath}

$ r\geq2$. The classes of $ \varphi$-sub-Gaussian and strictly $ \varphi$-sub-Gaussian stochastic processes are wider than the class of Gaussian processes and are of interest for modeling stochastic processes appearing in queueing theory and in the mathematics of finance. We obtain an estimate of the probability that the queue length exceeds the maximum allowed for it, namely,

$\displaystyle \mathsf{P}\left\{\sup_{t\geq 0}\left(A(t) -c t \right)>x \right\}\le L(\gamma) x^{r/(r-1)}\exp\left \{-\kappa(\gamma)x^{r/(2(r-1))}\right \}, $

where $ c>m$ is the service intensity, $ x>0$ is the maximum queue length, and $ L(\gamma)$ and $ \kappa(\gamma)$ are some finite constants.

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Additional Information:

R. E. Yamnenko
Affiliation: Department of Probability Theory and Mathematical Statistics, Faculty for Mechanics and Mathematics, National Taras Shevchenko University, Academician Glushkov Avenue 6, Kiev 03127, Ukraine
Email: rostyslav_yamnenko@yahoo.com

DOI: 10.1090/S0094-9000-07-00691-6
PII: S 0094-9000(07)00691-6
Keywords: $\varphi$-sub-Gaussian stochastic process, generalized Ornstein--Uhlenbeck process, the distribution of the supremum
Received by editor(s): 26/DEC/2004
Posted: January 19, 2007
Copyright of article: Copyright 2007, American Mathematical Society

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