Dynamic fluid-based scheduling in a multi-class abandonment queue

We investigate how to share a common resource among multiple classes of customers in the presence of abandonments. We consider two different models: (1) customers can abandon both while waiting in the queue and while being served, (2) only customers that are in the queue can abandon. Given the compl...

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Bibliographic Details
Published in:Performance evaluation 2013-10, Vol.70 (10), p.841-858
Main Authors: Larrañaga, M., Ayesta, U., Verloop, I.M.
Format: Article
Language:English
Subjects:
Abandonment
Abandonments
Computer Science
Customers
Embedded Systems
Fluid scaling
Hardware Architecture
Mathematical models
Multi-class queue
Networking and Internet Architecture
Operating Systems
Optimization
Performance evaluation
Policies
Queues
Scheduling
Stochasticity
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Summary:We investigate how to share a common resource among multiple classes of customers in the presence of abandonments. We consider two different models: (1) customers can abandon both while waiting in the queue and while being served, (2) only customers that are in the queue can abandon. Given the complexity of the stochastic optimization problem we propose a fluid model as a deterministic approximation. For the overload case we directly obtain that the c̃μ/θ rule is optimal. For the underload case we use Pontryagin’s Maximum Principle to obtain the optimal solution for two classes of customers; there exists a switching curve that splits the two-dimensional state-space into two regions such that when the number of customers in both classes is sufficiently small the optimal policy follows the c̃μ-rule and when the number of customers is sufficiently large the optimal policy follows the c̃μ/θ-rule. The same structure is observed in the optimal policy of the stochastic model for an arbitrary number of classes. Based on this we develop a heuristic and by numerical experiments we evaluate its performance and compare it to several index policies. We observe that the suboptimality gap of our solution is small.
ISSN:0166-5316
1872-745X
DOI:10.1016/j.peva.2013.08.009