DIFFERENTIABILITY OF BANACH SPACES VIA CONSTRUCTIBLE SETS

Type: PAPER

Author(s): HAGHSHENAS H.*

*FACULTY OF MATHEMATICAL SCIENCES, BIRJAND UNIVERSITY

Name of Seminar: SEMINAR ON MATHEMATICAL ANALYSIS AND ITS APPLICATIONS (SMAA18)

Type of Seminar: CONFERENCE

Sponsor: FACULTY OF MATHEMATICAL SCIENCES AND COMPUTER, TARBIAT MOALLEM UNIVERSITY

Date: 2009, Volume 18

Abstract:

The main goal of this paper is to prove that any Banach space X, that every dual ball in X** is weak*−separable, or every weak* − closed convex subset in X** is weak* − separable, or every norm-closed convex set in X*is constructible, admits an equivalent Frechet differentiable norm.

Keyword(s): FRECHET DIFFERENTIABILITY, LOCALLY UNIFORMLY CONVEX NORM, ASPLUND SPACES, BIORTHOGONAL SYSTEM, COUNTABLE INTERSECTIONS, CONSTRUCTIBLE SETS

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