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Abstract
The present paper is concerned with the necessary and sufficient conditions of optimality for third-order polyhedral optimization described by polyhedral discrete and differential inclusions (PDIs). In the first part of the paper, the discrete polyhedral problem is reduced to convex minimization problem and the necessary and sufficient condition for optimality is derived. Then the necessary and sufficient conditions of optimality for discrete-approximation problem
are formulated using the transversality condition and approximation method for the continuous polyhedral problem
governed by PDI. On the basis on the obtained results in Section 3, we prove the sufficient conditions of optimality for the problem
. It turns out that the concerned method requires some special equivalence theorem, which allow us to make a bridge between
and
problems.
Notes
No potential conflict of interest was reported by the authors.