#### Filter Results:

- Full text PDF available (5)

#### Publication Year

2008

2018

- This year (12)
- Last 5 years (18)
- Last 10 years (27)

#### Publication Type

#### Co-author

#### Journals and Conferences

Learn More

- Onno J. Boxma, Offer Kella, K. M. Kosinski
- Oper. Res. Lett.
- 2011

We consider a polling system: a queueing system of N ≥ 1 queues with Poisson arrivals Q1, . . . , QN visited in a cyclic order (with or without switchover times) by a single server. For this system… (More)

- Widayanti Erni, Irakli Keshelashvili, +470 authors Johann Zmeskal
- 2013

- K. M. Kosinski
- 2009

- K. M. Kosinski, Michel Mandjes
- J. Applied Probability
- 2015

Let W = {Wn : n ∈ N} be a sequence of random vectors in R , d ≥ 1. In this paper we consider the logarithmic asymptotics of the extremes of W , that is, for any vector q > 0 in R , we find that log… (More)

- Krzysztof Debicki, K. M. Kosinski, Michel Mandjes
- Queueing Syst.
- 2011

This paper considers a Lévy-driven queue (i.e., a Lévy process reflected at 0), and focuses on the distribution of M(t), that is, the minimal value attained in an interval of length t (where it is… (More)

- Krzysztof Debicki, K. M. Kosinski, Michel Mandjes
- Queueing Syst.
- 2011

In this paper we investigate Gaussian queues in the light-traffic and in the heavy-traffic regime. Let Q X ≡ {Q X (t) : t ≥ 0} denote a stationary buffer content process for a fluid queue fed by the… (More)

Let $\boldsymbol W=\{\boldsymbol W_n:n\in\mathbb N\}$ be a sequence of random vectors in $\mathbb R^d$, $d\ge 1$. This paper considers the logarithmic asymptotics of the extremes of $\boldsymbol W$,… (More)