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Using infinite server queues with partial information for occupancy prediction

Author

Listed:
  • Nikki Sonenberg
  • Victoria Volodina
  • Peter G. Challenor
  • Jim Q. Smith

Abstract

Motivated by demand prediction for the custodial prison population in England and Wales, this paper describes an approach to the study of service systems using infinite server queues, where the system has non-empty initial state and the elapsed time of individuals initially present is not known. By separating the population into initial content and new arrivals, we can apply several techniques either separately or jointly to those sub-populations, to enable both short-term queue length predictions and longer-term considerations such as managing congestion and analysing the impact of potential interventions. The focus in the paper is the transient behaviour of the Mt/G/∞ queue with a non-homogeneous Poisson arrival process and our analysis considers various possible simplifications, including approximation. We illustrate the approach in that domain using publicly available data in a Bayesian framework to perform model inference.

Suggested Citation

  • Nikki Sonenberg & Victoria Volodina & Peter G. Challenor & Jim Q. Smith, 2024. "Using infinite server queues with partial information for occupancy prediction," Journal of the Operational Research Society, Taylor & Francis Journals, vol. 75(2), pages 262-277, February.
  • Handle: RePEc:taf:tjorxx:v:75:y:2024:i:2:p:262-277
    DOI: 10.1080/01605682.2023.2189002
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    Cited by:

    1. Wenwen Li & Alexander Goldenshluger, 2024. "Adaptive minimax estimation of service time distribution in the $$M_t/G/\infty $$ M t / G / ∞ queue from departure data," Queueing Systems: Theory and Applications, Springer, vol. 108(1), pages 81-123, October.

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