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Some Geometric Properties of Quasi-Banach Spaces.
by
Fernando Albiac
Departamento de Matemáticas e Informatica. Universidad Pública de Navarra.
Coauthors: Camino Leránoz Istúriz (Universidad Pública de Navarra)
If X is a (real) Banach space, C is a closed convex subset of X, and x not in C, the convex hull of {x} \cup C is called drop. The geometric properties of drops in the particular case of C=BX (the closed unit ball of X) are related to other geometric properties of the space such as reflexivity and uniform convexity. The concept of drop is not natural in quasi-Banach spaces because the unit ball of a quasi-Banach space does not have to be convex. If X is a quasi-Banach space, C is a closed p-convex subset of X, 0 < p < 1, and x in X\C, the p-convex hull of {x} \cup C is called p-drop. Many definitions and classical results on drops in Banach spaces can be translated in a natural way to definitions and results about p-drops in p-Banach spaces, 0 < p < 1. We study how some properties related to p-drops give us information about the p-convexity of the space. The p-Drop Property and the p-(\beta) Property are among the most interesting ones. We deal with the strict p-convexity of a quasi-Banach space in relation to the p-extreme points of its unit ball and prove that the Lorentz sequence spaces in the non-locally convex case are strictly p-convex but cannot be q-convex for any p < q <= 1. Many examples are given.
(T)
Date received: April 6, 2000
Copyright © 2000 by the author(s). The author(s) of this document and the organizers of the conference have granted their consent to include this abstract in Atlas Conferences Inc. Document # caei-77.