We study convex programs that involve the minimization of a convex function over a convex subset of a topological vector space, subject to a finite number of linear inequalities. We develop the notion of the quasi relative interior of a convex set, an extension of the relative interior in finite dimensions. We use this idea in a constraint qualification for a fundamental Fenchel duality result, and then deduce duality results for these problems despite the almost invariable failure of the standard Slater condition. Part II of this work studies applications to more concrete models, whose dual problems are often finite-dimensional and computationally tractable
AbstractA completely symmetric duality theory is derived for convex integral functionals. As an exam...
AbstractA duality theory is derived for minimizing the maximum of a finite set of convex functions s...
Convex algebraic geometry concerns the interplay between optimization theory and real algebraic geo...
We study convex programs that involve the minimization of a convex function over a convex subset of ...
In Part I of this work we derived a duality theorem for partially finite convex programs, problems f...
This chapter surveys key concepts in convex duality theory and their application to the analysis and...
textabstractThis paper presents a unified study of duality properties for the problem of minimizing ...
AbstractIn this article we provide weak sufficient strong duality conditions for a convex optimizati...
textabstractIn the first chapter of this book the basic results within convex and quasiconvex analys...
In this article we discuss weak and strong duality properties of convex semi-infinite programming pr...
Problems of minimizing a convex function or maximizing a concave function over a convex set are call...
In this paper we provide further studies of the Fenchel duality theory in the general framework of l...
Duality is studied for a minimization problem with finitely many inequality and equality constraints...
This paper aims at providing further studies of the notion of quasi-relative interior for convex set...
Abstract Duality is studied for a minimization problem with finitely many in-equality and equality c...
AbstractA completely symmetric duality theory is derived for convex integral functionals. As an exam...
AbstractA duality theory is derived for minimizing the maximum of a finite set of convex functions s...
Convex algebraic geometry concerns the interplay between optimization theory and real algebraic geo...
We study convex programs that involve the minimization of a convex function over a convex subset of ...
In Part I of this work we derived a duality theorem for partially finite convex programs, problems f...
This chapter surveys key concepts in convex duality theory and their application to the analysis and...
textabstractThis paper presents a unified study of duality properties for the problem of minimizing ...
AbstractIn this article we provide weak sufficient strong duality conditions for a convex optimizati...
textabstractIn the first chapter of this book the basic results within convex and quasiconvex analys...
In this article we discuss weak and strong duality properties of convex semi-infinite programming pr...
Problems of minimizing a convex function or maximizing a concave function over a convex set are call...
In this paper we provide further studies of the Fenchel duality theory in the general framework of l...
Duality is studied for a minimization problem with finitely many inequality and equality constraints...
This paper aims at providing further studies of the notion of quasi-relative interior for convex set...
Abstract Duality is studied for a minimization problem with finitely many in-equality and equality c...
AbstractA completely symmetric duality theory is derived for convex integral functionals. As an exam...
AbstractA duality theory is derived for minimizing the maximum of a finite set of convex functions s...
Convex algebraic geometry concerns the interplay between optimization theory and real algebraic geo...