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IOR
2010
2010
Utility-Maximizing Resource Control: Diffusion Limit and Asymptotic Optimality for a Two-Bottleneck Model
We study a stochastic network that consists of two servers shared by two classes of jobs. Class 1 jobs require a concurrent occupancy of both servers while class 2 jobs use one server only. The traffic intensity is such that both servers are bottlenecks, meaning the service capacity is equal to the offered workload. The real-time allocation of the service capacity among the job classes takes the form of a solution to an optimization problem that maximizes a utility function. We derive the diffusion limit of the network and establish its asymptotic optimality. In particular, we identify a cost objective associated with the utility function, and show that it is minimized at the diffusion limit by the utility-maximizing allocation within a broad class of "fair" allocation schemes. The model also highlights the key issues involved in multiple bottlenecks.
Real-time Traffic| Added | 05 Mar 2011 |
| Updated | 05 Mar 2011 |
| Type | Journal |
| Year | 2010 |
| Where | IOR |
| Authors | Heng-Qing Ye, David D. Yao |
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