AbstractConvex mappings from a locally convex space X into F. = F ∪ {+∞} are considered, where F is an ordered topological vector space and + ∞ an arbitrary greatest element adjoined to F. In view of applications to the polarity theory of convex operators, the possibility is investigated of representing a convex mapping taking values in F. as a supremum of continuous affine mappings
This paper addresses the study and applications of polyhedral duality in locally convex topological ...
AbstractLet S be a finite set with m elements in a real linear space and let JS be a set of m interv...
Over the past years a theory of conjugate duality for set-valued functions that map into the set of ...
Convex mappings from a locally convex space X into F<sup>.</sup> = F ∪ {+∞} are considered, where F ...
We consider the classical duality operators for convex objects suchas the polar of a convex set cont...
AbstractWe use tools and methods from real algebraic geometry (spaces of ultrafilters, elimination o...
Summary (translated from the Russian): "We consider a linear continuous operator A acting from one B...
The aim of this paper is to develop a conjugate duality theory for convex set–valued maps. The basic...
AbstractThis note centers around a class of operators from a real vector space into a Dedekind compl...
In this paper, we establish a characterization of the polarity mapping for 1-dimensional convex bodi...
In this paper, we study convex analysis and its theoretical applications. We first apply important t...
In this paper, we study convex analysis and its theoretical applications. We first apply important t...
The notion of bounded element of C*-inductive locally convex spaces (or C*- inductive partial *-alge...
By studying partially monotone operators, we are able to show among other results that convex-concav...
We study the relationship between maps and convexity, particularly from the following viewpoint: whe...
This paper addresses the study and applications of polyhedral duality in locally convex topological ...
AbstractLet S be a finite set with m elements in a real linear space and let JS be a set of m interv...
Over the past years a theory of conjugate duality for set-valued functions that map into the set of ...
Convex mappings from a locally convex space X into F<sup>.</sup> = F ∪ {+∞} are considered, where F ...
We consider the classical duality operators for convex objects suchas the polar of a convex set cont...
AbstractWe use tools and methods from real algebraic geometry (spaces of ultrafilters, elimination o...
Summary (translated from the Russian): "We consider a linear continuous operator A acting from one B...
The aim of this paper is to develop a conjugate duality theory for convex set–valued maps. The basic...
AbstractThis note centers around a class of operators from a real vector space into a Dedekind compl...
In this paper, we establish a characterization of the polarity mapping for 1-dimensional convex bodi...
In this paper, we study convex analysis and its theoretical applications. We first apply important t...
In this paper, we study convex analysis and its theoretical applications. We first apply important t...
The notion of bounded element of C*-inductive locally convex spaces (or C*- inductive partial *-alge...
By studying partially monotone operators, we are able to show among other results that convex-concav...
We study the relationship between maps and convexity, particularly from the following viewpoint: whe...
This paper addresses the study and applications of polyhedral duality in locally convex topological ...
AbstractLet S be a finite set with m elements in a real linear space and let JS be a set of m interv...
Over the past years a theory of conjugate duality for set-valued functions that map into the set of ...