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The article considers differential inclusion with a given set-valued mapping and initial point. It is required to find a solution of this differential inclusion that minimizes an integral functional. Some classical results about the maximum principle for differential inclusions are obtained using the support and exact penalty functions. This is done for differentiable and for non-differentiable set-valued mappings in phase variables.

Original languageEnglish
Article number309
Number of pages13
JournalElectronic Journal of Differential Equations
Volume2015
Issue number309
StatePublished - 21 Dec 2015

    Research areas

  • Nonsmooth functional, differential inclusion, support function, exact penalty function, maximum principle, OPTIMIZATION

ID: 3983118