An extension of the Basic Constraint Qualification to nonconvex vector optimization problems

被引:0
作者
Bienvenido Jiménez
Vicente Novo
Miguel Sama
机构
[1] E.T.S.I.I. Universidad Nacional de Educación a Distancia,Departamento de Matemática Aplicada
来源
Journal of Global Optimization | 2013年 / 56卷
关键词
Vector optimization; Constraint qualifications; Multiplier rules; Contingent cone; 90C30; 49K27;
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摘要
In this paper a Basic Constraint Qualification is introduced for a nonconvex infinite-dimensional vector optimization problem extending the usual one from convex programming assuming the Hadamard differentiability of the maps. Corresponding KKT conditions are established by considering a decoupling of the constraint cone into half-spaces. This extension leads to generalized KKT conditions which are finer than the usual abstract multiplier rule. A second constraint qualification expressed directly in terms of the data is also introduced, which allows us to compute the contingent cone to the feasible set and, as a consequence, it is proven that this condition is a particular case of the first one. Relationship with other constraint qualifications in infinite-dimensional vector optimization, specially with the Kurcyuscz-Robinson-Zowe constraint qualification, are also given.
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页码:1755 / 1771
页数:16
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