Extreme points for convex mappings ofB n

We exhibit a collection of extreme points of the family of normalized convex mappings of the open unit ball of ℂ ⁿ forn≥2. These extreme points are defined in terms of the extreme points of a closed ball in the Banach space of homogeneous polynomials of degree 2 in ℂ ⁿ⁻¹, which are fully classified. Two examples are given to show that there are more convex mappings than those contained in the closed convex hull of the set of extreme points here exhibited.     

Extreme points, exposed points, differentiability points in CL-spaces

This paper presents a property of geometric and topological nature of Gateaux differentiability points and Fréchet differentiability points of almost CL-spaces. More precisely, if we denote by a maximal convex set of the unit sphere of a CL-space , and by the cone generated by , then all Gateaux differentiability points of are just n-s, and all Fréchet differentiability points of are (where n-s denotes the non-support points set of ).

     

A Positivstellensatz for forms on the positive orthant

We shall extend the research on power structure of finite p-groups in Mann (J Algebra 42:121–135, 1976) to locally nilpotentp-groups. Firstly, we obtain that a locally nilpotent \(P_i\)-group G with \(|G:\mho _1(G)|< \infty \) is an extension of a divisible abelian group by a finite p-group. Next we get the structure of infinite locally nilpotent p-groups which are not \(P_i\)-groups, but all of whose proper infinite subgroups are \(P_i\)-groups. Finally, we show that locally nilpotent \(P_i\)-groups with all subgroups subnormal are nilpotent.     

Extreme points and isometries on vector-valued Lipschitz spaces

For a Banach space E and a compact metric space (X,d), a function F:X→E is a Lipschitz function if there exists k>0 such that

     

Extreme points in polyhedral Banach spaces

We show that there exists a polyhedral Banach space X such that the closed unit ball of X is the closed convex hull of its extreme points. This solves a problem posed by J. Lindenstrauss in 1966.     

Extreme points of discrete location polyhedra

The problem of characterizing extreme points of a family of polyhedra is considered. This family embraces a variety of linear relaxations of feasible regions of discrete location problems. After characterizing the extreme points by means of a homogeneous system of linear equations, we obtain, as particular cases, four problems which have already been treated from a polyhedral point of view in the literature. Finally, we show that our characterization improves the one known for the Simple Plant Location Problem and corrects the one established for the Two-Level Uncapacitated Facility Location Problem. The first and third authors were supported by Fundación Séneca, project PB/11/FS/97     

Extreme points in triangular UHF algebras

We examine the strongly extreme point structure of the unit balls of triangular UHF algebras. The semisimple triangular UHF algebras are characterized as those for which this structure is minimal in the sense that every strongly extreme point belongs to the diagonal. In contrast to this, for the class of full nest algebras we prove a Krein-Milman type theorem which asserts that every operator in the open unit ball of the algebra is a convex combination of strongly extreme points.

     

Extreme points of the distance function on convex surfaces

We first see that, in the sense of Baire categories, many convex surfaces have quite large cut loci and infinitely many relative maxima of the distance function from a point. Then we find that, on any convex surface, all these extreme points lie on a single subtree of the cut locus, with at most three endpoints. Finally, we confirm (both in the sense of measure and in the sense of Baire categories) Steinhaus' conjecture that ``almost all" points admit a single farthest point on the surface.

     

Implementable positive maps on standard forms

We determine those unital positive maps on a von Neumann algebra in standard form that can be isometrically implemented, thereby generalizing the result that in this situation any automorphism can be unitarily implemented and that any normal state is a vector state.     

Extreme points and retractions in Banach spaces

ForT a completely regular topological space andX a strictly convex Banach space, we study the extremal structure of the unit ball of the spaceC(T,X) of continuous and bounded functions fromT intoX. We show that when dimX is an even integer then every point in the unit ball ofC(T, X) can be expressed as the average of three extreme points if, and only if, dimT< dimX, where dimT is the covering dimension ofT. We also prove that, ifX is infinite-dimensional, the aforementioned representation of the points in the unit ball ofC(T, X) is always possible without restrictions on the topological spaceT. Finally, we deduce from the above result that the identity mapping on the unit ball of an infinite-dimensional strictly convex Banach space admits a representation as the mean of three retractions of the unit ball onto the unit sphere. The author wishes to express his gratitude to Dr. Juan Francisco Mena Jurado for many helpful suggestions during the preparation of this paper.