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http://dx.doi.org/10.4134/JKMS.2005.42.1.017

NECESSARY CONDITIONS FOR OPTIMAL CONTROL PROBLEM UNDER STATE CONSTRAINTS  

KIM KYUNG-EUNG (Department of Mathematics School of the Liberal Arts Seoul National University of Technology)
Publication Information
Journal of the Korean Mathematical Society / v.42, no.1, 2005 , pp. 17-35 More about this Journal
Abstract
Necessary conditions for a deterministic optimal control problem which involves states constraints are derived in the form of a maximum principle. The conditions are similar to those of F.H. Clarke, R.B. Vinter and G. Pappas who assume that the problem's data are Lipschitz. On the other hand, our data are not continuously differentiable but only differentiable. Fermat's rule and Rockafellar's duality theory of convex analysis are the basic techniques in this paper.
Keywords
necessary conditions; state constraints; Fermat's rule; contingent cone; closed convex process;
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