Utilize este identificador para referenciar este registo:
http://hdl.handle.net/10071/28076
Autoria: | Ferreira, M. A. M. |
Editor: | Xingting Wang |
Data: | 2022 |
Título próprio: | Study about Riccati equation in an infinite servers queue system with poisson arrivals occupation study |
Volume: | 1 |
Título e volume do livro: | Novel research aspects in mathematical and computer science |
Paginação: | 22 - 26 |
Referência bibliográfica: | Ferreira, M. A. M. (2022). Study about Riccati equation in an infinite servers queue system with poisson arrivals occupation study. EM Xingting Wang (Eds.). Novel research aspects in mathematical and computer science (Vol.1, pp. 22-26). Book Publisher International. 10.9734/bpi/nramcs/v1/2039B |
ISBN: | 978-93-5547-172-7 |
DOI (Digital Object Identifier): | 10.9734/bpi/nramcs/v1/2039B |
Palavras-chave: | M/G/oo Riccati equation Busy period Busy cycle |
Resumo: | In M/G/oo queue real life practical applications, the busy period and the busy cycle probabilistic study is of main importance. But it is a very difficult task. In this chapter, we show that by solving a Riccati equation induced by this queue transient probabilities monotony study as time functions, we obtain a collection of service length distribution functions, for which both the busy period and the busy cycle have lengths with quite simple distributions, generally given in terms of exponential distributions and the degenerate at the origin distribution. |
Arbitragem científica: | yes |
Acesso: | Acesso Aberto |
Aparece nas coleções: | ISTAR-CLI - Capítulos de livros internacionais |
Ficheiros deste registo:
Ficheiro | Tamanho | Formato | |
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bookPart_88668.pdf | 481,65 kB | Adobe PDF | Ver/Abrir |
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