J. Chan scite author profile

J. Chan

4Publications

33Citation Statements Received

11Citation Statements Given

How they've been cited

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Affiliations

Eastman Dental Hospital, University of London

Publications

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Generalised birth and death queueing processes: recent results

Conolly

Chan

1977

Advances in Applied Probability

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The systems considered are single-server, though the theory has wider application to models of adaptive queueing systems. Arrival and service mechanisms are governed by state (n)-dependent mean arrival and service rates λn and µn. It is assumed that the choice of λn and µn leads to a stable regime. Formulae are sought that provide easy means of computing statistics of effectiveness of systems. A measure of traffic intensity is first defined in terms of ‘effective’ service time and inter-arrival intervals. It is shown that the latter have a renewal type connection with appropriately defined mean effective arrival and service rates λ∗ and µ∗ and that in consequence the ratio λ∗/µ∗ is the traffic intensity, equal moreover to where is the stable probability of an empty system, consistent with other systems. It is also shown that for first come, first served discipline the equivalent of Little's formula holds, where and are the mean waiting time of an arrival and mean system size at an arbitrary epoch. In addition it appears that stable regime output intervals are statistically identical with effective inter-arrival intervals. Symmetrical moment formulae of arbitrary order are derived algebraically for effective inter-arrival and service intervals, for waiting time, for busy period and for output.

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Generalised birth and death queueing processes: recent results

Conolly

Chan

1977

Adv. Appl. Probab.

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The systems considered are single-server, though the theory has wider application to models of adaptive queueing systems. Arrival and service mechanisms are governed by state (n)-dependent mean arrival and service rates λ n and µ n . It is assumed that the choice of λ n and µ n leads to a stable regime. Formulae are sought that provide easy means of computing statistics of effectiveness of systems. A measure of traffic intensity is first defined in terms of ‘effective’ service time and inter-arrival intervals. It is shown that the latter have a renewal type connection with appropriately defined mean effective arrival and service rates λ∗ and µ ∗ and that in consequence the ratio λ∗/µ ∗ is the traffic intensity, equal moreover to where is the stable probability of an empty system, consistent with other systems. It is also shown that for first come, first served discipline the equivalent of Little's formula holds, where and are the mean waiting time of an arrival and mean system size at an arbitrary epoch. In addition it appears that stable regime output intervals are statistically identical with effective inter-arrival intervals. Symmetrical moment formulae of arbitrary order are derived algebraically for effective inter-arrival and service intervals, for waiting time, for busy period and for output.

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Comparative effectiveness of certain queueing systems with adaptive demand and service mechanisms

Chan¹,

Conolly²

1978

Computers & Operations Research

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Uptake of fluoride by sound and artificially carious enamel in vitro following application of topical sodium and amine fluorides

Chan

Hill²,

Newman

1991

Journal of Dentistry

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J. Chan

Generalised birth and death queueing processes: recent results

Generalised birth and death queueing processes: recent results

Comparative effectiveness of certain queueing systems with adaptive demand and service mechanisms

Uptake of fluoride by sound and artificially carious enamel in vitro following application of topical sodium and amine fluorides

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