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A scalarization approach for vector variational inequalities with applications an equivalence result between weak and strong solutions of set-valued vector variational inequalities and suggest
A scalarization approach for vector variational inequalities with applications an equivalence result between weak and strong solutions of set-valued vector variational inequalities and suggest
Generalized vector variational inequalities over countable product of setsIn this paper, we consider vector variational inequalities with set-valued mappings over countable
Limit vector variational inequality problems via scalarization, which enables us to replace each vector variational inequality with a scalar set-valued variational
Generalized vector variational inequalities over countable product of setsIn this paper, we consider vector variational inequalities with set-valued mappings over countable
Limit vector variational inequalities and market equilibrium problems investigate the solvability of a general vector variational inequality via the convergence of solutions
Characterizations of solutions for vector equilibrium problems equilibrium problems. We establish also vector optimization problem formulations of set-valued maps for vector
On the generalized vector variational inequality problemIn this paper, we study vector variational inequalities with set-valued mappings. The concept of Cx
Characterizations of solutions for vector equilibrium problems equilibrium problems. We establish also vector optimization problem formulations of set-valued maps for vector
On the generalized vector variational inequality problemIn this paper, we study vector variational inequalities with set-valued mappings. The concept of Cx
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