Event
01_1
| 제출번호(No.) | 0137 |
|---|---|
| 분류(Section) | Contributed Talk |
| 분과(Session) | Probability and Statistics (PS) |
| 영문제목 (Title(Eng.)) |
Gated polling systems with large switchover times |
| 저자(Author(s)) |
Bara Kim1, Jeongsim Kim2 Korea University1, Chungbuk National University2 |
| 초록본문(Abstract) | We consider a sequence of cyclic polling systems, indexed by $k$. The switchover time distributions depend on $k$, but the interarrival time and service time distributions are independent of $k$. The service discipline at all queues is gated. We investigate the limits of the moments of the scaled queue length distribution, when the switchover times go to infinity. Using the distributional form of Little's law, we obtain the limits of the moments of the scaled sojourn time distribution, when the switchover times go to infinity. |
| 분류기호 (MSC number(s)) |
60K25 |
| 키워드(Keyword(s)) | polling system, asymptotic analysis, distributional Little's law |
| 강연 형태 (Language of Session (Talk)) |
Korean |