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A publicação pode ser exportada nos seguintes formatos: referência da APA (American Psychological Association), referência do IEEE (Institute of Electrical and Electronics Engineers), BibTeX e RIS.

Exportar Referência (APA)
Ferreira, M. A. M. (2020). A collection of service time probability distributions parameters study and impact in M|G|∞system busy period and busy cycle time length probability distributions. In Albert R. Baswell (Ed.), Advances in mathematics research. (pp. 97-109). New York: Nova Science Publishers.
Exportar Referência (IEEE)
M. A. Ferreira,  "A collection of service time probability distributions parameters study and impact in M|G|∞system busy period and busy cycle time length probability distributions", in Advances in mathematics research, Albert R. Baswell, Ed., New York, Nova Science Publishers, 2020, vol. 27, pp. 97-109
Exportar BibTeX
@incollection{ferreira2020_1721557469310,
	author = "Ferreira, M. A. M.",
	title = "A collection of service time probability distributions parameters study and impact in M|G|∞system busy period and busy cycle time length probability distributions",
	chapter = "",
	booktitle = "Advances in mathematics research",
	year = "2020",
	volume = "27",
	series = "Advances in Mathematics Research",
	edition = "",
	pages = "97-97",
	publisher = "Nova Science Publishers",
	address = "New York",
	url = "https://novapublishers.com/shop/advances-in-mathematics-research-volume-27/"
}
Exportar RIS
TY  - CHAP
TI  - A collection of service time probability distributions parameters study and impact in M|G|∞system busy period and busy cycle time length probability distributions
T2  - Advances in mathematics research
VL  - 27
AU  - Ferreira, M. A. M.
PY  - 2020
SP  - 97-109
CY  - New York
UR  - https://novapublishers.com/shop/advances-in-mathematics-research-volume-27/
AB  - We present the problems that arise when calculating the moments of service time probability distributions for which the M|G|∞ queue system busy period and busy cycle-an idle period followed by a busy period-time length probability distributions become very easy to study, and show how to overcome them. We also, calculate the renewal function, the “peakedness,” and the “modified peakedness” for the M|G|∞ busy period and busy cycle time length in the case of those service time distributions.
ER  -