An abstract principle is introduced, aimed at proving that classes of optimization problems are typically well posed in the sense that the collection of ill-posed problems within each class is a-porous. As a consequence, we establish typical well-posedness in the above sense for unconstrained minimization of certain classes of functions (e.g., convex and quasi-convex continuous), as well as of convex programming with inequality constraints. We conclude the paper by showing that the collection of consistent ill-posed problems of quadratic programming of any fixed size has Lebesgue measure zero in the corresponding Euclidean spac
Well-posedness for vector optimization problems has been extensively studied. More recently, some at...
This book presents in a unified way the mathematical theory of well-posedness in optimization. The b...
We provide a new well-posedness concept for saddle-point problems. We characterize it by means of th...
An abstract principle is introduced, aimed at proving that classes of optimization problems are typi...
In this paper we consider the collection of convex programming problems with inequality and equalit...
AbstractWe characterize those linear optimization problems that are ill-posed in the sense that arbi...
In this paper we investigate a notion of extended well-posedness in vector optimization. Appropriate...
We characterize those linear optimization problems that are ill-posed in the sense that arbitrarily ...
The book reviews the fundamentals of convexity, then describes the topologies on spaces of closed su...
We study a notion of well-posedness in vector optimization through the behaviour of minimizing sequ...
An overview of the application of the previous theoretical results to game theory is presented.Final...
ABSTRACT. In this note we present a new concept of well-posedness for Optimization Prob-lems with co...
This paper studies the issue of well-posedness for vector optimization. It is shown that coercivity ...
In this paper, we study several existing notions of wellposedness for vector optimization problems....
AbstractIn this paper we generalize the concepts of well-posedness to equilibrium problems and to op...
Well-posedness for vector optimization problems has been extensively studied. More recently, some at...
This book presents in a unified way the mathematical theory of well-posedness in optimization. The b...
We provide a new well-posedness concept for saddle-point problems. We characterize it by means of th...
An abstract principle is introduced, aimed at proving that classes of optimization problems are typi...
In this paper we consider the collection of convex programming problems with inequality and equalit...
AbstractWe characterize those linear optimization problems that are ill-posed in the sense that arbi...
In this paper we investigate a notion of extended well-posedness in vector optimization. Appropriate...
We characterize those linear optimization problems that are ill-posed in the sense that arbitrarily ...
The book reviews the fundamentals of convexity, then describes the topologies on spaces of closed su...
We study a notion of well-posedness in vector optimization through the behaviour of minimizing sequ...
An overview of the application of the previous theoretical results to game theory is presented.Final...
ABSTRACT. In this note we present a new concept of well-posedness for Optimization Prob-lems with co...
This paper studies the issue of well-posedness for vector optimization. It is shown that coercivity ...
In this paper, we study several existing notions of wellposedness for vector optimization problems....
AbstractIn this paper we generalize the concepts of well-posedness to equilibrium problems and to op...
Well-posedness for vector optimization problems has been extensively studied. More recently, some at...
This book presents in a unified way the mathematical theory of well-posedness in optimization. The b...
We provide a new well-posedness concept for saddle-point problems. We characterize it by means of th...