The covariance of the backward and forward recurrence times in a renewal process: the stationary case and asymptotics for the ordinary case
In a Poisson process, it is well-known that the forward and backward recurrence times at a given time point t are independent random variables. In a renewal process, although the joint distribution of these quantities is known (asymptotically), it seems that very few results regarding their covarian...
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Veröffentlicht in: | Stochastic models 2019-01, Vol.35 (1), p.51-62 |
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Format: | Artikel |
Sprache: | eng |
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Zusammenfassung: | In a Poisson process, it is well-known that the forward and backward recurrence times at a given time point t are independent random variables. In a renewal process, although the joint distribution of these quantities is known (asymptotically), it seems that very few results regarding their covariance function exist. In the present paper, we study this covariance and, in particular, we state both necessary and sufficient conditions for it to be positive, zero or negative in terms of reliability classifications and the coefficient of variation of the underlying inter-renewal and the associated equilibrium distribution. Our results apply either for an ordinary renewal process in the steady state or for a stationary process. |
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ISSN: | 1532-6349 1532-4214 |
DOI: | 10.1080/15326349.2019.1575752 |