Analysis of the stability and performance of exponential backoff
| Autor: | Byung-Jae Kwak, Nah-Oak Song, Leonard E. Miller |
|---|---|
| Rok vydání: | 2004 |
| Předmět: |
Exponential backoff
Computer science Network packet Distributed computing Throughput Distributed coordination function Stability (probability) Computer Science::Performance Offered load Distributed algorithm Computer Science::Networking and Internet Architecture Applied mathematics Constant (mathematics) Throughput (business) |
| Zdroj: | WCNC |
| DOI: | 10.1109/wcnc.2003.1200652 |
| Popis: | New analytic results are given for the stability and performance of the exponential backoff (EB) algorithm. Previous studies on the stability of the (binary) EB have produced contradictory results instead of a consensus: some proved instability, others showed stability under certain conditions. In these studies, simplified and/or modified models of the backoff algorithm were often used to make analysis more tractable. In this paper, care is taken to use a model for backoff that reflects the actual behavior of backoff algorithms. We show that EB is stable under a throughput definition of stability; the throughput of the network converges to a non-zero constant as the offered load N goes to infinity. We also obtain the analytical expressions for the saturation throughput and the medium access delay of a packet for a given number of nodes, N. The analysis considers the general case of EB with backoff factor r, where BEB is the special case with r = 2. The accuracy of the analysis is checked against simulation results. |
| Databáze: | OpenAIRE |
| Externí odkaz: |
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