Giorgio Giorgi scite author profile

We consider a multiobjective optimization problem with a feasible set defined by inequality and equality constraints such that all functions are, at least, Dini differentiable (in some cases, Hadamard differentiable and sometimes, quasiconvex). Several constraint qualifications are given in such a way that generalize both the qualifications introduced by Maeda and the classical ones, when the functions are differentiable. The relationships between them are analyzed. Finally, we give several Kuhn-Tucker type necessary conditions for a point to be Pareto minimum under the weaker constraint qualifications here proposed.

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Giorgio Giorgi

The Notion of Invexity in Vector Optimization: Smooth and Nonsmooth Case

Invexity and Optimization

Approximate Karush–Kuhn–Tucker Condition in Multiobjective Optimization

Dini derivatives in optimization — Part I

On constraint qualifications in directionally differentiable multiobjective optimization problems

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