OPTIMALITY AND PARAMETRIC DUALITY FOR NONSMOOTH MINIMAX FRACTIONAL PROGRAMMING PROBLEMS INVOLVING L-INVEX-INFINE FUNCTIONS
AUTOR(ES)
Jayswal, Anurag, Kummari, Krishna, Singh, Vivek
FONTE
Pesqui. Oper.
DATA DE PUBLICAÇÃO
2016-08
RESUMO
ABSTRACT The Karush-Kuhn-Tucker type necessary optimality conditions are given for the nonsmooth minimax fractional programming problem with inequality and equality constraints. Subsequently, based on the idea of L-invex-infine functions defined in terms of the limiting/Mordukhovich subdifferential of locally Lipschitz functions, we obtain sufficient optimality conditions for the considered nonsmooth minimax fractional programming problem and also we provide an example to justify the existence of sufficient optimality conditions. Furthermore, we propose a parametric type dual problem and explore duality results.
Documentos Relacionados
- A global linearization approach to solve nonlinear nonsmooth constrained programming problems
- Discrete approximations for strict convex continuous time problems and duality
- Duality results for stationary problems of open pit mine planning in a continuous function framework
- An Improved Dynamic Contact Model for Mass–Spring and Finite Element Systems Based on Parametric Quadratic Programming Method
- Dynamic Systems with Fractional Derivatives Applied to Interagent Populations Problems
