Optimal base-stock policy of the assemble-to-order systems

In this work, an ordinal optimization-based evolution algorithm (OOEA) is proposed to solve a problem for a good enough target inventory level of the assemble-to-order (ATO) system. First, the ATO system is formulated as a combinatorial optimization problem with integer variables that possesses a huge solution space. Next, the genetic algorithm is used to select N excellent solutions from the solution space, where the fitness is evaluated with the radial basis function network. Finally, we proceed with the optimal computing budget allocation technique to search for a good enough solution. The proposed OOEA is applied to an ATO system comprising 10 items on 6 products. The solution quality is demonstrated by comparing with those obtained by two competing methods. The good enough target inventory level obtained by the OOEA is promising in the aspects of solution quality and computational efficiency.

[1]  Barry L. Nelson,et al.  Discrete Optimization via Simulation Using COMPASS , 2006, Oper. Res..

[2]  Y. Ho,et al.  Ordinal Optimization: Soft Optimization for Hard Problems , 2007 .

[3]  Yu-Chi Ho,et al.  Ordinal Optimization: Soft Computing for Hard Problems (International Series on Discrete Event Dynamic Systems) , 2007 .

[4]  Shih-Cheng Horng,et al.  Ordinal optimization based approach to the optimal resource allocation of grid computing system , 2011, Math. Comput. Model..

[5]  Chung Yee Lee,et al.  Optimal decisions for assemble-to-order systems with uncertain assembly capacity , 2010 .

[6]  Mohsen Elhafsi Optimal Integrated Production and Inventory Control of an Assemble-to-Order System with Multiple Non-Unitary Demand Classes , 2009, Eur. J. Oper. Res..

[7]  Ke Fu,et al.  Approximation methods for the analysis of a multicomponent, multiproduct assemble‐to‐order system , 2011 .

[8]  Loo Hay Lee,et al.  Stochastic Simulation Optimization - An Optimal Computing Budget Allocation , 2010, System Engineering and Operations Research.

[9]  Yao Zhao Analysis and evaluation of an Assemble-to-Order system with batch ordering policy and compound Poisson demand , 2009, Eur. J. Oper. Res..

[10]  Jooyoung Park,et al.  Universal Approximation Using Radial-Basis-Function Networks , 1991, Neural Computation.

[11]  Shih-Cheng Horng,et al.  Optimal cyclic service of the centralized broadband wireless networks with k-limited discipline , 2011, Simul. Model. Pract. Theory.

[12]  洪士程,et al.  An Ordinal Optimization Theory Based Algorithm for a Class of Simulation Optimization Problems and Application , 2009 .