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April 10, 2013 - May 8, 2026

Available Issues

April 10, 2013 - May 8, 2026

Pricing and Capacity Rationing for Rentals with Uncertain Durations

Published Online:1 Mar 2007https://doi.org/10.1287/mnsc.1060.0651

References

  • Alstrup J., Boas S., Madsen O. B. G., Vidal R. V. V. Booking policy for flights with two types of passengers. Eur. J. Oper. Res. (1986) 27(3):274–288CrossrefGoogle Scholar
  • Altman E., Jimenez T., Koole G. On optimal call admission control. IEEE Trans. Comm. (2001) 49(9):1659–1668CrossrefGoogle Scholar
  • Belobaba P. P. Application of a probabilistic decision model to airline seat inventory control. Oper. Res. (1989) 37(2):183–197LinkGoogle Scholar
  • Bitran G. R., Gilbert S. M. Managing hotel reservations with uncertain arrivals. Oper. Res. (1996) 44(1):35–49LinkGoogle Scholar
  • Borst S., Mandelbaum A., Reiman M. I. Dimensioning large call centers. Oper. Res. (2004) 52(1):17–34LinkGoogle Scholar
  • Brumelle S. L., McGill J. I. Airline seat allocation with multiple nested fare classes. Oper. Res. (1993) 41(1):127–137LinkGoogle Scholar
  • Gans N., Koole G., Mandelbaum A. Telephone call centers: Tutorial, review, and research prospects. Manufacturing Service Oper. Management (2003) 5(2):79–141LinkGoogle Scholar
  • Gayon J.-P., Talay-Değirmenci I., Karaesmen F., Örmeci E. L. Dynamic pricing and replenishment in a production-inventory system with Markov-modulated demand. (2004) . Working paper, Laboratoire Génie Industriel, École Centrale Paris, Châtenay-Malabry, FranceGoogle Scholar
  • Jagerman D. L. Some properties of the Erlang loss function. Bell Systems Tech. J. (1974) 53(3):525–551CrossrefGoogle Scholar
  • Kelley F. P. Charging and rate control for elastic traffic. Eur. Trans. Telecomm. (1997) 8:33–37CrossrefGoogle Scholar
  • Kelley F. P., Maullo A. K., Tan D. K. H. Rate control for communication networks: Shadow prices, proportional fairness and stability. J. Oper. Res. Soc. (1998) 49(3):237–252CrossrefGoogle Scholar
  • Kleywegt A. J., Papastavrou J. D. The dynamic and stochastic knapsack problem. Oper. Res. (1998) 46(1):17–35LinkGoogle Scholar
  • Ladany S. Bayesian dynamic operating rules for optimal hotel reservation. Z. Oper. Res. (1977) 21(6):B165–B176CrossrefGoogle Scholar
  • Lewis M. E., Ayhan H., Foley R. D. Bias optimality in a queue with admission control. Probab. Engrg. Inform. Sci. (1999) 13(3):309–327CrossrefGoogle Scholar
  • Liberman V., Yechiali U. On the hotel overbooking problem: An inventory system with stochastic cancellations. Management Sci. (1978) 24(11):1117–1126LinkGoogle Scholar
  • Lippman S. Applying a new device in the optimization of exponential queueing systems. Oper. Res. (1975) 23(4):687–710LinkGoogle Scholar
  • Littlewood K. Forecasting and control of passenger bookings. AGIFORS Sympos. Proc. (1972) 12:95–117Google Scholar
  • Low D. W. Optimal dynamic pricing policies for an M/M/s queue. Oper. Res. (1974) 22(3):545–561LinkGoogle Scholar
  • Maglaras C., Zeevi A. Pricing and design of differentiated services: Approximate analysis and structural insights. Oper. Res. (2005) 53(2):242–262LinkGoogle Scholar
  • Miller B. A queueing reward system with several customer classes. Management Sci. (1969) 16(3):234–245LinkGoogle Scholar
  • Örmeci E. L., Burnetas A. N. Admission control with batch arrivals. Oper. Res. Lett. (2004) 32(5):448–454CrossrefGoogle Scholar
  • Örmeci E. L., Burnetas A. N. Dynamic admission control for loss systems with batch arrivals. Adv. Appl. Probab. (2005) 37(4):915–937CrossrefGoogle Scholar
  • Örmeci E. L., van der Wal J. Admission policies for a two class loss system with general interarrival times. Stochastic Models (2006) 22(1):37–53CrossrefGoogle Scholar
  • Örmeci E. L., Burnetas A. N., Emmons H. Admission policies for a two-class loss system based on customer offers. IIE Trans. (2002) 34(9):813–822CrossrefGoogle Scholar
  • Örmeci E. L., Burnetas A. N., van der Wal J. Admission policies for a two class loss system. Stochastic Models (2001) 17(4):513–540CrossrefGoogle Scholar
  • Paschalidis C. P., Tsitsiklis J. N. Congestion-dependent pricing of network services. IEEE/ACM Trans. Networking (2000) 8(2):171–184CrossrefGoogle Scholar
  • Porteus E. Conditions for characterizing the structure of optimal strategies in infinite-horizon dynamic programs. J. Optim. Theory Appl. (1982) 36(3):419–432CrossrefGoogle Scholar
  • Puterman M. L.Discrete Stochastic Dynamic Programming (1994) (John Wiley and Sons, New Jersey) Google Scholar
  • Ross K. W., Tsang D. H. K. The stochastic knapsack problem. IEEE Trans. Comm. (1989) 37(7):740–747CrossrefGoogle Scholar
  • Ross K. W., Yao D. D. Monotonicity properties for the stochastic knapsack. IEEE Trans. Info. Theory (1990) 36(5):1173–1179CrossrefGoogle Scholar
  • Ross S. M.Stochastic Processes (1996) (John Wiley and Sons, New Jersey) Google Scholar
  • Rothstein M. Hotel overbooking as a Markovian sequential decision process. Decision Sci. (1974) 5:389–404CrossrefGoogle Scholar
  • Savin S., Cohen M. A., Gans N., Katalan Z. Capacity management in rental businesses with two customer bases. Oper. Res. (2005) 53(4):617–631LinkGoogle Scholar
  • Williams F. E. Decision theory and the innkeeper: An approach for setting hotel reservation policy. Interfaces (1977) 7(4):18–30LinkGoogle Scholar
  • Yoon S., Lewis M. E. Optimal pricing and admission control in a queueing system with periodically varying parameters. QUESTA (2004) 47(3):177–199Google Scholar
  • Zhao W., Zheng Y. S. Optimal dynamic pricing for perishable assets with nonhomogeneous demand. Management Sci. (2000) 46(3):375–388LinkGoogle Scholar
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