AbstractThis paper proposes and compares several ways of measuring the degree of normality of a convex cone contained in a normed space. The dual concept of modulability is also considered. Other notions like solidity and sharpness are also analyzed from a quantitative point of view
The aim of the thesis was to study various properties of cones in ordered vector, normed and Banach ...
AbstractA notion of uniform convexity is defined for quasi-normed (complex) spaces by replacing norm...
In optimization theory the tangent cone and the contingent cone are used to classify the regularity ...
AbstractThis paper proposes and compares several ways of measuring the degree of normality of a conv...
AbstractLet K be a closed convex cone in a Hilbert space X. Let BX be the closed unit ball of X and ...
Let E be a real normed linear space with unit ball B and unit sphere S. The classical modulus of con...
AbstractLet X be a Banach space, X2 ⊆ X be a two-dimensional subspace of X, and S(X) = {x ϵ X, ‖x‖ =...
AbstractEssential properties of multiobjective programming in real normed linear spaces are studied....
summary:The notion of normal cones is used to characterize $C^*$-$m$-convex algebras among unital, s...
Let C(H) denote the class of closed convex cones in a Hilbert space H. One possible way of measuring...
We discuss some extremality issues concerning the circumradius, the inradius, and the condition num...
In this paper we first extend from normed spaces to locally convex spaces some characterizations of ...
AbstractLet X be a Banach space, S(X) - {x ε X : ‖#x02016; = 1} be the unit sphere of X.The paramete...
The purpose of this paper is to discuss some of the highlights of the theory of metric regularity re...
We discuss some extremality issues concerning the circumradius, the inradius, and the condition num...
The aim of the thesis was to study various properties of cones in ordered vector, normed and Banach ...
AbstractA notion of uniform convexity is defined for quasi-normed (complex) spaces by replacing norm...
In optimization theory the tangent cone and the contingent cone are used to classify the regularity ...
AbstractThis paper proposes and compares several ways of measuring the degree of normality of a conv...
AbstractLet K be a closed convex cone in a Hilbert space X. Let BX be the closed unit ball of X and ...
Let E be a real normed linear space with unit ball B and unit sphere S. The classical modulus of con...
AbstractLet X be a Banach space, X2 ⊆ X be a two-dimensional subspace of X, and S(X) = {x ϵ X, ‖x‖ =...
AbstractEssential properties of multiobjective programming in real normed linear spaces are studied....
summary:The notion of normal cones is used to characterize $C^*$-$m$-convex algebras among unital, s...
Let C(H) denote the class of closed convex cones in a Hilbert space H. One possible way of measuring...
We discuss some extremality issues concerning the circumradius, the inradius, and the condition num...
In this paper we first extend from normed spaces to locally convex spaces some characterizations of ...
AbstractLet X be a Banach space, S(X) - {x ε X : ‖#x02016; = 1} be the unit sphere of X.The paramete...
The purpose of this paper is to discuss some of the highlights of the theory of metric regularity re...
We discuss some extremality issues concerning the circumradius, the inradius, and the condition num...
The aim of the thesis was to study various properties of cones in ordered vector, normed and Banach ...
AbstractA notion of uniform convexity is defined for quasi-normed (complex) spaces by replacing norm...
In optimization theory the tangent cone and the contingent cone are used to classify the regularity ...