Abstract This paper is concerned with upper Hölder continuity and Hölder calmness of a perturbed vector optimization problem. We establish some new sufficient conditions for upper Hölder continuity and Hölder calmness of the perturbed solution mappings and the perturbed optimal value mappings of a vector optimization problem under the case that the objective function and the feasible set are, respectively, perturbed by parameters. Our results generalize and extend the corresponding ones of Li and Li (Appl. Math. Comput. 232:908-918, 2014)
The concept of lower limit for a real-valued function is extended to vector optimization; the vector...
This work is concerned with differentiable constrained vector optimization problems. It focus on the...
This thesis is a study of stable perturbations in convex programming models. Stability of a general ...
In the paper we discuss the concepts of weak sharp solutions to vector optimization problems. As an ...
Recently, Cánovas et al. presented an interesting result: the argmin mapping of a linear semi-infini...
Recently, Cánovas et al. presented an interesting result: the argmin mapping of a linear semi-infini...
In this paper we provide some theoretical results on stability and sensitivity analysis in convex ve...
This paper is focused on the stability of the optimal value, and its immediate repercussion on the s...
AbstractThis paper provides some results concerning sensitivity analysis in parametrized convex vect...
The paper is devoted to the calmness from below/from above for the optimal value function of paramet...
This thesis is a study of convex parametric programs on regions of stability. The main tools are com...
In this article, we revisit parametric strong vector quasi-equilibrium problems. Afterwards, we esta...
We present conditions for Hölder calmness and upper Hölder continuity of optimal solution sets to pe...
We propose a unifying approach in deriving constraint qualifications and theorem of the alternative....
In this paper, we establish the Hölder continuity of solution mappings to parametric vector quasiequ...
The concept of lower limit for a real-valued function is extended to vector optimization; the vector...
This work is concerned with differentiable constrained vector optimization problems. It focus on the...
This thesis is a study of stable perturbations in convex programming models. Stability of a general ...
In the paper we discuss the concepts of weak sharp solutions to vector optimization problems. As an ...
Recently, Cánovas et al. presented an interesting result: the argmin mapping of a linear semi-infini...
Recently, Cánovas et al. presented an interesting result: the argmin mapping of a linear semi-infini...
In this paper we provide some theoretical results on stability and sensitivity analysis in convex ve...
This paper is focused on the stability of the optimal value, and its immediate repercussion on the s...
AbstractThis paper provides some results concerning sensitivity analysis in parametrized convex vect...
The paper is devoted to the calmness from below/from above for the optimal value function of paramet...
This thesis is a study of convex parametric programs on regions of stability. The main tools are com...
In this article, we revisit parametric strong vector quasi-equilibrium problems. Afterwards, we esta...
We present conditions for Hölder calmness and upper Hölder continuity of optimal solution sets to pe...
We propose a unifying approach in deriving constraint qualifications and theorem of the alternative....
In this paper, we establish the Hölder continuity of solution mappings to parametric vector quasiequ...
The concept of lower limit for a real-valued function is extended to vector optimization; the vector...
This work is concerned with differentiable constrained vector optimization problems. It focus on the...
This thesis is a study of stable perturbations in convex programming models. Stability of a general ...