We study the relationship between maps and convexity, particularly from the following viewpoint: when does a desired property result from another weaker one? See Propositions 11, 15, 19, 20, 22 and 28
A subset of a (cristallographical) lattice ℒn is called convex whenever it is the intersection of th...
The idea of convexity is very important especially for probability theory, optimization and stochast...
Abstract. This draft will develop in notes for the Minerva lectures given at Columbia University by ...
AbstractWe establish some notions of convexity of set-valued maps. This notions are generalization o...
AbstractThe notion of convex cones in general position has turned out to be useful in convex program...
The notion of convex set for subsets of lattices in one particular case was introduced in [1], where...
A classical result by Crouzeix (1977) states that a real-valued function is convex if and only if an...
This paper starts with definitions of convex, cone, pointed and some related properties in a linear ...
In this paper we first extend from normed spaces to locally convex spaces some characterizations of ...
The aim of this paper is to study the minimax theorems for set-valued mappings with or without linea...
Abstract. This paper establishes a relation between F-based cones and solid cones in a separated loc...
Convexity is an important concept in optimization of functionals, and therefore in economics, in ope...
Convexity is important in theoretical aspects of mathematics and also for economists and physicists....
The notions of convex analysis are indispensable in theoretical and applied Mathematics especially i...
We show how some properties of Banach spaces can be equivalently defined by using stability properti...
A subset of a (cristallographical) lattice ℒn is called convex whenever it is the intersection of th...
The idea of convexity is very important especially for probability theory, optimization and stochast...
Abstract. This draft will develop in notes for the Minerva lectures given at Columbia University by ...
AbstractWe establish some notions of convexity of set-valued maps. This notions are generalization o...
AbstractThe notion of convex cones in general position has turned out to be useful in convex program...
The notion of convex set for subsets of lattices in one particular case was introduced in [1], where...
A classical result by Crouzeix (1977) states that a real-valued function is convex if and only if an...
This paper starts with definitions of convex, cone, pointed and some related properties in a linear ...
In this paper we first extend from normed spaces to locally convex spaces some characterizations of ...
The aim of this paper is to study the minimax theorems for set-valued mappings with or without linea...
Abstract. This paper establishes a relation between F-based cones and solid cones in a separated loc...
Convexity is an important concept in optimization of functionals, and therefore in economics, in ope...
Convexity is important in theoretical aspects of mathematics and also for economists and physicists....
The notions of convex analysis are indispensable in theoretical and applied Mathematics especially i...
We show how some properties of Banach spaces can be equivalently defined by using stability properti...
A subset of a (cristallographical) lattice ℒn is called convex whenever it is the intersection of th...
The idea of convexity is very important especially for probability theory, optimization and stochast...
Abstract. This draft will develop in notes for the Minerva lectures given at Columbia University by ...