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Revenue maximization in the dynamic knapsack problem

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  • ,

    (Department of Economics, Bonn University)

  • ,

    (Department of Economics, Hebrew University of Jerusalem)

  • ,

    (Department of Economics, Bonn University)

Abstract

We analyze maximization of revenue in the dynamic and stochastic knapsack problem where a given capacity needs to be allocated by a given deadline to sequentially arriving agents. Each agent is described by a two-dimensional type that reflects his capacity requirement and his willingness to pay per unit of capacity. Types are private information. We first characterize implementable policies. Then we solve the revenue maximization problem for the special case where there is private information about per-unit values, but capacity needs are observable. After that we derive two sets of additional conditions on the joint distribution of values and weights under which the revenue maximizing policy for the case with observable weights is implementable, and thus optimal also for the case with two-dimensional private information. In particular, we investigate the role of concave continuation revenues for implementation. We also construct a simple policy for which per-unit prices vary with requested weight but not with time, and prove that it is asymptotically revenue maximizing when available capacity/ time to the deadline both go to infinity. This highlights the importance of nonlinear as opposed to dynamic pricing.

Suggested Citation

  • , & , & ,, 2011. "Revenue maximization in the dynamic knapsack problem," Theoretical Economics, Econometric Society, vol. 6(2), May.
    • Handle: RePEc:the:publsh:700
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    Cited by:

    1. Krähmer, Daniel & Strausz, Roland, 2025. "Unidirectional incentive compatibility," Journal of Economic Theory, Elsevier, vol. 228(C).
    2. Senay Solak & Armagan Bayram & Mehmet Gumus & Yueran Zhuo, 2019. "Technical Note—Optimizing Foreclosed Housing Acquisitions in Societal Response to Foreclosures," Operations Research, INFORMS, vol. 67(4), pages 950-964, July.
    3. Francis Bloch & David Cantala, 2014. "Dynamic Allocation of Objects to Queuing Agents: The Discrete Model," Documents de travail du Centre d'Economie de la Sorbonne 14066, Université Panthéon-Sorbonne (Paris 1), Centre d'Economie de la Sorbonne.
    4. Jihyeok Jung & Chan-Oi Song & Deok-Joo Lee & Kiho Yoon, 2024. "Optimal Mechanism in a Dynamic Stochastic Knapsack Environment," Papers 2402.14269, arXiv.org.
    5. Jarman, Felix & Meisner, Vincent, 2017. "Ex-post optimal knapsack procurement," Journal of Economic Theory, Elsevier, vol. 171(C), pages 35-63.
    6. Francis Bloch & David Cantala, 2017. "Dynamic Assignment of Objects to Queuing Agents," American Economic Journal: Microeconomics, American Economic Association, vol. 9(1), pages 88-122, February.
    7. Ryuji Sano, 2015. "A Dynamic Mechanism Design for Scheduling with Different Use Lengths," KIER Working Papers 924, Kyoto University, Institute of Economic Research.
    8. Dinard van der Laan & Zaifu Yang, 2019. "Efficient Sequential Assignments with Randomly Arriving Multi-Item Demand Agents," Discussion Papers 19/13, Department of Economics, University of York.
    9. Daniel F. Garrett & Alessandro Pavan, 2012. "Managerial Turnover in a Changing World," Journal of Political Economy, University of Chicago Press, vol. 120(5), pages 879-925.
    10. Ryuji Sano, 2017. "A Dynamic Mechanism Design with Overbooking, Different Deadlines, and Multi-unit Demands," KIER Working Papers 963, Kyoto University, Institute of Economic Research.
    11. Ensthaler, Ludwig & Giebe, Thomas, 2014. "Bayesian optimal knapsack procurement," European Journal of Operational Research, Elsevier, vol. 234(3), pages 774-779.
    12. Dirk Bergemann & Johannes Horner, 2010. "Should Auctions Be Transparent?," Levine's Working Paper Archive 661465000000000128, David K. Levine.
    13. Mierendorff, Konrad, 2016. "Optimal dynamic mechanism design with deadlines," Journal of Economic Theory, Elsevier, vol. 161(C), pages 190-222.
    14. Mallesh M. Pai & Rakesh Vohra, 2013. "Optimal Dynamic Auctions and Simple Index Rules," Mathematics of Operations Research, INFORMS, vol. 38(4), pages 682-697, November.
    15. Gershkov, Alex & Moldovanu, Benny, 2012. "Dynamic allocation and pricing: A mechanism design approach," International Journal of Industrial Organization, Elsevier, vol. 30(3), pages 283-286.

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    Keywords

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    JEL classification:

    • D42 - Microeconomics - - Market Structure, Pricing, and Design - - - Monopoly
    • D44 - Microeconomics - - Market Structure, Pricing, and Design - - - Auctions

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