Set-valued minimax fractional programming problems under -cone arcwise connectedness

Das, Koushik

doi:10.2478/candc-2022-0004

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Tytuł artykułu

Set-valued minimax fractional programming problems under -cone arcwise connectedness

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Das Koushik

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DOI

10.2478/candc-2022-0004

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Abstrakty

In this paper, we consider a set-valued minimax fractional programming problem (MFP), where the objective as well as constraint maps are set-valued. We introduce the notion of ρ- cone arcwise connectedness of set-valued maps as a generalization of cone arcwise connected set-valued maps. We establish the sufficient Karush-Kuhn-Tucker (KKT) conditions for the existence of minimizers of the problem (MFP) under ρ-cone arcwise connectedness assumption. Further, we study the Mond-Weir (MWD), Wolfe (WD), and mixed (MD) types of duality models and prove the corresponding weak, strong, and converse duality theorems between the primal (MFP) and the corresponding dual problems under ρ-cone arcwise connectedness assumption.

Słowa kluczowe

convex cone set-valued map contingent epiderivative arcwise connectedness duality

Wydawca

Systems Research Institute, Polish Academy of Sciences

Czasopismo

Control and Cybernetics

Rocznik

2022

Tom

Vol. 51, No. 1

Strony

43--69

Opis fizyczny

Bibliogr. 37 poz.

Twórcy

autor

Das Koushik

koushikdas.maths@gmail.com

Department of Mathematics, Taki Government College, 743429 Taki, India

Bibliografia

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