Atlas: C(K) spaces that could be Gateaux Differentiability Spaces and which are not weak Asplund by Dean J. Ives

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Functional Analysis Valencia 2000
July 3-7, 2000
Technical University of Valencia (UPV) and University of Valencia (UV)
Valencia, Spain

Organizers
R.M. Aron (Kent State U., USA), K.D. Bierstedt (U. Paderborn, Germany), J. Bonet (UPV), J. Cerdà (U. Barcelona, Spain), H. Jarchow (U. Zürich, Switzerland), M. Maestre (UV), J. Schmets (U. Liège, Belgium)

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C(K) spaces that could be Gateaux Differentiability Spaces and which are not weak Asplund
by
Dean J. Ives
University College London
Coauthors: David Preiss (University College London)

We obtain partial results that could eventually lead to showing that there are Banach spaces that are GDS spaces but not weak Asplund spaces. Let K be a first countable Hausdorff compact space. A topology \tau is defined on C(K) that is finer than the norm topology but with which C(K) is still a Baire space.

It is shown that for a continuous convex function f on C(K) such that every subdifferential, \partialf(j), of f contains a measure of finite support, f is Gâteaux differentiable on a \tau residual set. An example of such a function is the distance from a finite dimensional subspace of C(K). A non-trivial example of such a space is the double arrow space D of functions on [0, 1] that are right continuous at every 0 <= x < 1, left continuous at x=1, and have left limits at at every 0 < x < 1, equipped with the supremum norm We can also show that for a continuous convex function f on D such that every subdifferential contains only atomic measures, f is Gâteaux differentiable on a \tau residual set.

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Date received: April 4, 2000