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On the theory of semi‐infinite programming and a generalization of the kuhn‐tucker saddle point theorem for arbitrary convex functions

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  • A. Charnes
  • W. W. Cooper
  • K. O. Kortanek

Abstract

We first present a survey on the theory of semi‐infinite programming as a generalization of linear programming and convex duality theory. By the pairing of a finite dimensional vector space over an arbitrarily ordered field with a generalized finite sequence space, the major theorems of linear programming are generalized. When applied to Euclidean spaces, semi‐infinite programming theory yields a dual theorem associating as dual problems minimization of an arbitrary convex function over an arbitrary convex set in n‐space with maximization of a linear function in non‐negative variables of a generalized finite sequence space subject to a finite system of linear equations. We then present a new generalization of the Kuhn‐Tucker saddle‐point equivalence theorem for arbitrary convex functions in n‐space where differentiability is no longer assumed.

Suggested Citation

  • A. Charnes & W. W. Cooper & K. O. Kortanek, 1969. "On the theory of semi‐infinite programming and a generalization of the kuhn‐tucker saddle point theorem for arbitrary convex functions," Naval Research Logistics Quarterly, John Wiley & Sons, vol. 16(1), pages 41-52, March.
    • Handle: RePEc:wly:navlog:v:16:y:1969:i:1:p:41-52
    DOI: 10.1002/nav.3800160104
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    Cited by:

    1. Sinuany-Stern, Zilla, 2023. "Foundations of operations research: From linear programming to data envelopment analysis," European Journal of Operational Research, Elsevier, vol. 306(3), pages 1069-1080.
    2. M. A. Goberna & M. A. López, 2018. "Recent contributions to linear semi-infinite optimization: an update," Annals of Operations Research, Springer, vol. 271(1), pages 237-278, December.

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