On Duality for a Class of Quasiconcave Multiplicative Programs |
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| Authors: | Scott C.H. Jefferson T.R. |
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| Affiliation: | (1) Operations and Decision Technologies, Graduate School of Management, University of California, Irvine, California;(2) College of Commerce and Economics, Sultan Qaboos University, Oman |
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| Abstract: | Multiplicative programs are a difficult class of nonconvex programs that have received increasing attention because of their many applications. However, given their nonconvex nature, few theoretical results are available. In this paper, we study a particular case of these programs which involves the maximization of a quasiconcave function over a linear constraint set. Using results from conjugate function theory and generalized geometric programming, we derive a complete duality theory. The results are further specialized to linear multiplicative programming. |
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| Keywords: | Conjugate functions convex analysis duality quasiconcave functions multiplicative functions |
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