Joint product durability and lot sizing models

This paper concerns the simultaneous selection of product durability and order quantity for items that deteriorate over time. Choices of product durability are modelled as the values of a single design parameter that affects the distribution of the time-to-onset of deterioration (TOD). Once deterioration has begun, individual items are assumed to have exponential remaining lifetimes. We analyze two scenarios. In the first case items are guaranteed to be good if used prior to an expiry date. Therefore, TOD is a constant and the store manager may choose an appropriate value (at cost). In the second case, TOD is a random variable. Then, the design parameter can affect TOD distribution in either mean-preserving or variance-preserving or mixed manner. We report insightful numerical examples for each case and derive highly plausible conditions, which when true, imply that the corresponding expected cost per unit time is strictly quasi-convex.

[1]  Sheldon M. Ross,et al.  Stochastic Processes , 2018, Gauge Integral Structures for Stochastic Calculus and Quantum Electrodynamics.

[2]  Evan L. Porteus,et al.  Setup reduction and increased effective capacity , 1987 .

[3]  Evan L. Porteus Investing in Reduced Setups in the EOQ Model , 1985 .

[4]  Yigal Gerchak,et al.  Yield randomness, cost tradeoffs, and diversification in the EOQ model , 1990 .

[5]  D. Gupta,et al.  A heuristic procedure for determining ordering and price-discount policies for commodities with two-period perishability , 1991 .

[6]  Fred Raafat,et al.  Survey of Literature on Continuously Deteriorating Inventory Models , 1991 .

[7]  Yigal Gerchak,et al.  On the Effect of Demand Randomness on Inventories and Costs , 1992, Oper. Res..

[8]  David G. Luenberger,et al.  Linear and nonlinear programming , 1984 .

[9]  Morris A. Cohen Joint pricing and ordering policy for exponentially decaying inventory with known demand , 1977 .

[10]  P. M. Ghare A model for an exponentially decaying inventory , 1963 .

[11]  Hamilton Emmons,et al.  A Replenishment Model for Radioactive Nuclide Generators , 1968 .

[12]  Xavier de Groote,et al.  An approach to single parameter process design , 1993, Oper. Res. Lett..

[13]  Evan L. Porteus Optimal Lot Sizing, Process Quality Improvement and Setup Cost Reduction , 1986, Oper. Res..

[14]  Steven Nahmias,et al.  Perishable Inventory Theory: A Review , 1982, Oper. Res..

[15]  R. H. Hollier,et al.  Inventory replenishment policies for deteriorating items in a declining market , 1983 .

[16]  Mokhtar S. Bazaraa,et al.  Nonlinear Programming: Theory and Algorithms , 1993 .

[17]  Yigal Gerchak,et al.  Investing in reducing lead-time randomness in continuous-review inventory models , 1991 .

[18]  Steven Nahmias,et al.  Production and operations analysis , 1992 .

[19]  A. Sandmo On the theory of the competitive firm under price uncertainty , 1971 .

[20]  D. W. Kim,et al.  The Price and Production Level of the Deteriorating Inventory System. , 1983 .