A saddle point characterization of efficient solutions for interval optimization problems

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DOI10.1007/s12190-017-1140-1zbMath1401.90218OpenAlexW2766367445MaRDI QIDQ1786949

Debdulal Ghosh, Sushil Kumar Bhuiya, Debdas Ghosh, Lakshmi Kanta Patra

Publication date: 25 September 2018

Published in: Journal of Applied Mathematics and Computing (Search for Journal in Brave)

Full work available at URL: https://doi.org/10.1007/s12190-017-1140-1

zbMATH Keywords

saddle point Lagrangian function efficient solution interval optimization

Mathematics Subject Classification ID

Numerical mathematical programming methods (65K05) Nonlinear programming (90C30)

Related Items (9)

Generalized Hukuhara Gâteaux and Fréchet derivatives of interval-valued functions and their application in optimization with interval-valued functions ⋮ A variable and a fixed ordering of intervals and their application in optimization with interval-valued functions ⋮ Interval variational inequalities and their relationship with interval optimization problems ⋮ Ekeland's variational principle for interval-valued functions ⋮ Solving interval quadratic programming problems by using the numerical method and swarm algorithms ⋮ Generalized-Hukuhara penalty method for optimization problem with interval-valued functions and its application in interval-valued portfolio optimization problems ⋮ Optimality, duality and saddle point analysis for interval-valued nondifferentiable multiobjective fractional programming problems ⋮ An efficient solution of nonlinear enhanced interval optimization problems and its application to portfolio optimization ⋮ Generalized Hukuhara-Clarke derivative of interval-valued functions and its properties

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