A Little's Result Approach to the Service Constrained Spares Provisioning Problem for Repairable Items

A set of identical machines are deployed to meet a known and constant demand. If a machine fails, a replacement part must be available before repair of the machine may be initiated. If the part is currently out of stock, it must be ordered. Once repaired at one of a finite number of repair stations, the machine serves as an “operational ready” standby if demand is currently being met; otherwise, the machine is immediately deployed. Machine time-to-failure, ordering leadtimes, and repair times are all assumed to be exponentially distributed. The objective is to determine the number of machines and repair channels that minimize a cost function subject to the service constraint; i.e., on average, the number of machines operating should be at least some fraction of the demand. We present an algorithm that efficiently generates all the boundary points of the feasible region, from which the optimal solution is readily identified, for the special cases in which there is either zero or infinite stock. Use of the ...

[1]  Nadim E. Abboud The spares provisioning problem with parts inventory , 1990 .

[2]  William Feller,et al.  An Introduction to Probability Theory and Its Applications , 1967 .

[3]  A. P. Johnson,et al.  Simulation of the Number of Spare Engines Required for an Aircraft Fleet , 1978 .

[4]  Manjunath Kamath,et al.  Chapter 5 Performance evaluation of production networks , 1993, Logistics of Production and Inventory.

[5]  Jeffrey P. Buzen,et al.  Computational algorithms for closed queueing networks with exponential servers , 1973, Commun. ACM.

[6]  Richard M. Soland,et al.  A Closed Queueing Network Model for Multi-Echelon Repairable Item Provisioning. , 1983 .

[7]  Sheldon M. Ross Introduction to Probability Models. , 1995 .

[8]  Paul R. Kleindorfer,et al.  Near-Optimal Service Constrained Stocking Policies for Spare Parts , 1989, Oper. Res..

[9]  Stephen S. Lavenberg,et al.  Mean-Value Analysis of Closed Multichain Queuing Networks , 1980, JACM.

[10]  Richard M. Soland,et al.  Iterative solution methods for obtaining the steady-state probability distributions of Markovian multi-echelon repairable item inventory systems , 1993, Comput. Oper. Res..

[11]  David R. Cox,et al.  The Productivity of Machines Requiring Attention at Random Intervals , 1951 .

[12]  J. Muckstadt A Model for a Multi-Item, Multi-Echelon, Multi-Indenture Inventory System , 1973 .

[13]  Craig C. Sherbrooke,et al.  Optimal Inventory Modeling of Systems: Multi-Echelon Techniques (INTL SERIES IN OPERATIONS RESEARCH & MANAGEMENT SCIENCE) , 1992 .

[14]  Amit Gupta,et al.  Steady‐state approximation of a multiechelon multi‐indentured repairable‐item inventory system with a single repair facility , 1993 .

[15]  Stephen C. Graves,et al.  A Multi-Echelon Inventory Model for a Repairable Item with One-for-One Replenishment , 1985 .

[16]  Thomas P. Moore Optimal design, procurement and support of multiple repairable equipment and logistic systems , 1986 .

[17]  Christian N. Madu,et al.  SIMULATION METAMODELS OF SYSTEM AVAILABILITY AND OPTIMUM SPARE AND REPAIR UNITS , 1992 .

[18]  Margaret K. Schaefer A Multi-Item Maintenance Center Inventory Model for Low-Demand Reparable Items , 1983 .

[19]  Russell R. Barton,et al.  Simulation metamodels , 1998, 1998 Winter Simulation Conference. Proceedings (Cat. No.98CH36274).