On Gateaux differentiability of pointwise Lipschitz mappings

Abstract

We prove that for every function f:X Y, where X is a separable Banach space and Y is a Banach space with RNP, there exists a set A∈ such that f is Gateaux differentiable at all x∈ S(f) A, where S(f) is the set of points where f is pointwise-Lipschitz. This improves a result of Bongiorno. As a corollary, we obtain that every K-monotone function on a separable Banach space is Hadamard differentiable outside of a set belonging to ; this improves a result due to Borwein and Wang. Another corollary is that if X is Asplund, f:X cone monotone, g:X continuous convex, then there exists a point in X, where f is Hadamard differentiable and g is Frechet differentiable.

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