Optimal pricing for tandem queues with finite buffers

Wang, Xinchang; Andradóttir, Sigrún; Ayhan, Hayriye

Optimal pricing for tandem queues with finite buffers

Xinchang Wang (), Sigrún Andradóttir () and Hayriye Ayhan ()
Additional contact information
Xinchang Wang: Mississippi State University
Sigrún Andradóttir: Georgia Institute of Technology
Hayriye Ayhan: Georgia Institute of Technology

Queueing Systems: Theory and Applications, 2019, vol. 92, issue 3, No 5, 323-396

Abstract: Abstract We consider optimal pricing for a two-station tandem queueing system with finite buffers, communication blocking, and price-sensitive customers whose arrivals form a homogeneous Poisson process. The service provider quotes prices to incoming customers using either a static or dynamic pricing scheme. There may also be a holding cost for each customer in the system. The objective is to maximize either the discounted profit over an infinite planning horizon or the long-run average profit of the provider. We show that there exists an optimal dynamic policy that exhibits a monotone structure, in which the quoted price is non-decreasing in the queue length at either station and is non-increasing if a customer moves from station 1 to 2, for both the discounted and long-run average problems under certain conditions on the holding costs. We then focus on the long-run average problem and show that the optimal static policy performs as well as the optimal dynamic policy when the buffer size at station 1 becomes large, there are no holding costs, and the arrival rate is either small or large. We learn from numerical results that for systems with small arrival rates and no holding cost, the optimal static policy produces a gain quite close to the optimal gain even when the buffer at station 1 is small. On the other hand, for systems with arrival rates that are not small, there are cases where the optimal dynamic policy performs much better than the optimal static policy.

Keywords: Tandem queueing systems; Markov decision processes; Static pricing; Dynamic pricing; Monotone structure; Asymptotic optimality; 60J28; 90B22; 90C40 (search for similar items in EconPapers)
Date: 2019
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Citations: View citations in EconPapers (1)

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DOI: 10.1007/s11134-019-09618-x

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