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Staffing Optimization with Chance Constraints in Call Centers

出版	Université de Montréal (Faculté des arts et des sciences), 2013
URL	http://books.google.com.hk/books?id=-6cNuAEACAAJ&hl=&source=gbs_api

註釋Call centers are key components of almost any large organization. The problem of labor management has received a great deal of attention in the literature. A typical formulation of the staffing problem is in terms of infinite-horizon performance measures. The method of combining simulation and optimization is used to solve this staffing problem. In this thesis, we consider a problem of staffing call centers with respect to chance constraints. We introduce chance-constrained formulations of the scheduling problem which requires that the quality of service (QoS) constraints are met with high probability. We define a sample average approximation of this problem in a multiskill setting. We prove the convergence of the optimal solution of the sample-average problem to that of the original problem when the sample size increases. For the special case where we consider the staffing problem and all agents have all skills (a single group of agents), we design three simulation-based optimization methods for the sample problem. Given a starting solution, we increase the staffings in periods where the constraints are violated, and decrease the number of agents in several periods where decrease is acceptable, as much as possible, provided that the constraints are still satisfied. For the call center models in our numerical experiment, these algorithms give good solutions, i.e., most constraints are satisfied, and we cannot decrease any agent in any period to obtain better results. One advantage of these algorithms, compared with other methods, that they are very easy to implement.