AbstractLet (A, %plane1D;49C;, μ) be a finite measure space, and let Ωµ, w+f denote the set of all nonnegative real-valued %plane1D;49C;-measurable functions on A weaklymajorized by a nonnegative function f, in the sense of Hardly, Littlewood and Pólya. For a nonatomic µ, the extreme points ofΩµ, w +f are shown to be the nonnegativefunctions obtained by taking a fraction (1−θ) of the largest values of and arranging them in any way on any subset of A of measure(1−θ), with values elsewhere set equal to zero. Topological properties of these extreme points are given
AbstractGiven a topological space T and a strictly convex real normed space X, let C(T,X) be the spa...
AbstractLet Ω={1,…,n} and P={X:S⊆Ω}. A mapping e : P→R+ is a convex set function if e(⊖)=0 and e(S) ...
Introduction Let (X, P) be a finite set and the algebra of all its subsets. The collection of pro...
AbstractLet (A, %plane1D;49C;, μ) be a finite measure space, and let Ωµ, w+f denote the set of all n...
AbstractWhere N is a finite set of the cardinality n and P the family of all its subsets, we study r...
summary:Every separable nonreflexive Banach space admits an equivalent norm such that the set of the...
AbstractIf μ and λ are probability measures on a metrisable compact convex set with μ < λ in the Cho...
. Where N is a finite set of the cardinality n and P the family of all its subsets, we study real fu...
AbstractLet Δ={z∈C||z|<1}. Let B0 denote the set of functions φ analytic in Δ and satisfying |φ(z)| ...
AbstractIn this paper we prove two sufficient conditions for an analytic function f to be an extreme...
AbstractBanach spaces contain convex sets having pathological sets of extreme points
AbstractThis note, through discussing convexification of functions on any sets, extends Stegall's ma...
AbstractLet (X, Σ, μ) be a finite, nonatomic, measure space. Let G=span{g1, g2, …, gn}⊆L1, and let t...
AbstractWe characterize, in the finite-dimensional case, the extreme points of the convex set of bil...
AbstractIt is shown that, on a closed convex subset X of a real Hausdorff locally convex space E, a ...
AbstractGiven a topological space T and a strictly convex real normed space X, let C(T,X) be the spa...
AbstractLet Ω={1,…,n} and P={X:S⊆Ω}. A mapping e : P→R+ is a convex set function if e(⊖)=0 and e(S) ...
Introduction Let (X, P) be a finite set and the algebra of all its subsets. The collection of pro...
AbstractLet (A, %plane1D;49C;, μ) be a finite measure space, and let Ωµ, w+f denote the set of all n...
AbstractWhere N is a finite set of the cardinality n and P the family of all its subsets, we study r...
summary:Every separable nonreflexive Banach space admits an equivalent norm such that the set of the...
AbstractIf μ and λ are probability measures on a metrisable compact convex set with μ < λ in the Cho...
. Where N is a finite set of the cardinality n and P the family of all its subsets, we study real fu...
AbstractLet Δ={z∈C||z|<1}. Let B0 denote the set of functions φ analytic in Δ and satisfying |φ(z)| ...
AbstractIn this paper we prove two sufficient conditions for an analytic function f to be an extreme...
AbstractBanach spaces contain convex sets having pathological sets of extreme points
AbstractThis note, through discussing convexification of functions on any sets, extends Stegall's ma...
AbstractLet (X, Σ, μ) be a finite, nonatomic, measure space. Let G=span{g1, g2, …, gn}⊆L1, and let t...
AbstractWe characterize, in the finite-dimensional case, the extreme points of the convex set of bil...
AbstractIt is shown that, on a closed convex subset X of a real Hausdorff locally convex space E, a ...
AbstractGiven a topological space T and a strictly convex real normed space X, let C(T,X) be the spa...
AbstractLet Ω={1,…,n} and P={X:S⊆Ω}. A mapping e : P→R+ is a convex set function if e(⊖)=0 and e(S) ...
Introduction Let (X, P) be a finite set and the algebra of all its subsets. The collection of pro...