Duality results for interval-valued semiinfinite optimization problems with equilibrium constraints using convexificators

Title:
Duality results for interval-valued semiinfinite optimization problems with equilibrium constraints using convexificators

dc.contributor.author	K.K. Lai
dc.contributor.author	S.K. Mishra
dc.contributor.author	Mohd Hassan
dc.contributor.author	Jaya Bisht
dc.contributor.author	J.K. Maurya
dc.date.accessioned	2026-02-07T11:09:16Z
dc.date.issued	2022
dc.description.abstract	This paper deals with the study of interval-valued semiinfinite optimization problems with equilibrium constraints (ISOPEC) using convexificators. First, we formulate Wolfe-type dual problem for (ISOPEC) and establish duality results between the (ISOPEC) and the corresponding Wolfe-type dual under the assumption of ∂∗-convexity. Second, we formulate Mond–Weir-type dual problem and propose duality results between the (ISOPEC) and the corresponding Mond–Weir-type dual under the assumption of ∂∗-convexity, ∂∗-pseudoconvexity, and ∂∗-quasiconvexity. © 2022, The Author(s).
dc.identifier.doi	10.1186/s13660-022-02866-1
dc.identifier.issn	10255834
dc.identifier.uri	https://doi.org/10.1186/s13660-022-02866-1
dc.identifier.uri	https://dl.bhu.ac.in/bhuir/handle/123456789/42362
dc.publisher	Institute for Ionics
dc.title	Duality results for interval-valued semiinfinite optimization problems with equilibrium constraints using convexificators
dc.type	Publication
dspace.entity.type	Article