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Suboptimality of equal lot sizes for finite‐horizon problems
Author(s) -
Rachamadugu Ram,
Ramasesh Ranga
Publication year - 1994
Publication title -
naval research logistics (nrl)
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.665
H-Index - 68
eISSN - 1520-6750
pISSN - 0894-069X
DOI - 10.1002/1520-6750(199412)41:7<1019::aid-nav3220410712>3.0.co;2-s
Subject(s) - mathematics , monotonic function , interval (graph theory) , mathematical optimization , horizon , cash flow , zero (linguistics) , time horizon , economics , combinatorics , finance , mathematical analysis , linguistics , philosophy , geometry
We consider the problem of determining optimal lot sizes in continuous time for finite‐horizon problems with stationary parameters. Using the average cost criterion, earlier researchers concluded that the optimal lot sizes should be equal. Using the conceptually rigorous discounted cash flow analysis, we show that equal lot sizes are optimal only when the finite horizon is an integral multiple of the optimal reorder interval for the infinite‐horizon problem or, trivially, when the discount rate is zero. In all other cases, optimal lot sizes are either monotonically increasing or decreasing. Our characterization of the optimal policy is also useful in determining optimal lot sizes. © 1994 John Wiley & Sons, Inc.