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On Separable Determination of Sigma-P-Porous Sets in Banach Spaces

We use a method involving elementary submodels and a partial converse of Foran lemma to prove separable reduction theorems concerning Suslin sigma-P-porous sets where "P" can be from a rather wide class of porosity-like relations in complete metric spaces. In particular, we separably reduce the notion of Suslin cone small set in Asplund spaces. As an application we prove a theorem stating that a continuous approximately convex function on an Asplund space is Frechet differentiable up to a cone small set.

preprint2013arXivOpen access
Marek CuthMartin RmoutilMiroslav Zeleny
math.FA
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Marek CuthMartin RmoutilMiroslav Zeleny

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