Asymptotics of the first hitting times of Markov jump processes with applications to ATM.
This dissertation has three parts. The first part (Chapter 2) is about the asymptotics of the distribution of the first hitting time of a forbidden set by a Markov jump process. Explicit error bounds for the departure of the hitting time distribution from exponentiality are provided. The second part...
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University of Ottawa (Canada)
2009
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ndltd-uottawa.ca-oai-ruor.uottawa.ca-10393-69072018-01-05T19:04:37Z Asymptotics of the first hitting times of Markov jump processes with applications to ATM. Qian, Kun. McDonald, David, Mathematics. This dissertation has three parts. The first part (Chapter 2) is about the asymptotics of the distribution of the first hitting time of a forbidden set by a Markov jump process. Explicit error bounds for the departure of the hitting time distribution from exponentiality are provided. The second part (Chapter 3 and Chapter 4, joint with Ian Iscoe and David McDonald) discusses the capacity of an ATM multiplexor in terms of the probability distribution of the time until the first occurrence of an excessive demand for bandwidth. In the third part (Chapter 5), the problem of the buffer overflow of an ATM multiplexor is studied. The methods developed give an excellent approximation for the steady-state probabilities of the contents of a buffer driven by heterogeneous sources. 2009-03-23T14:16:03Z 2009-03-23T14:16:03Z 1993 1993 Thesis Source: Dissertation Abstracts International, Volume: 54-11, Section: B, page: 5708. 9780315838369 http://hdl.handle.net/10393/6907 http://dx.doi.org/10.20381/ruor-11517 131 p. University of Ottawa (Canada) |
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Others
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NDLTD |
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Mathematics. |
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Mathematics. Qian, Kun. Asymptotics of the first hitting times of Markov jump processes with applications to ATM. |
| description |
This dissertation has three parts. The first part (Chapter 2) is about the asymptotics of the distribution of the first hitting time of a forbidden set by a Markov jump process. Explicit error bounds for the departure of the hitting time distribution from exponentiality are provided. The second part (Chapter 3 and Chapter 4, joint with Ian Iscoe and David McDonald) discusses the capacity of an ATM multiplexor in terms of the probability distribution of the time until the first occurrence of an excessive demand for bandwidth. In the third part (Chapter 5), the problem of the buffer overflow of an ATM multiplexor is studied. The methods developed give an excellent approximation for the steady-state probabilities of the contents of a buffer driven by heterogeneous sources. |
| author2 |
McDonald, David, |
| author_facet |
McDonald, David, Qian, Kun. |
| author |
Qian, Kun. |
| author_sort |
Qian, Kun. |
| title |
Asymptotics of the first hitting times of Markov jump processes with applications to ATM. |
| title_short |
Asymptotics of the first hitting times of Markov jump processes with applications to ATM. |
| title_full |
Asymptotics of the first hitting times of Markov jump processes with applications to ATM. |
| title_fullStr |
Asymptotics of the first hitting times of Markov jump processes with applications to ATM. |
| title_full_unstemmed |
Asymptotics of the first hitting times of Markov jump processes with applications to ATM. |
| title_sort |
asymptotics of the first hitting times of markov jump processes with applications to atm. |
| publisher |
University of Ottawa (Canada) |
| publishDate |
2009 |
| url |
http://hdl.handle.net/10393/6907 http://dx.doi.org/10.20381/ruor-11517 |
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AT qiankun asymptoticsofthefirsthittingtimesofmarkovjumpprocesseswithapplicationstoatm |
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1718599961959989248 |