Hadamard differentiability via G\ ateaux differentiability

Abstract

Let X be a separable Banach space, Y a Banach space and f: X Y a mapping. We prove that there exists a σ-directionally porous set A⊂ X such that if x∈ X A, f is Lipschitz at x, and f is G\ateaux differentiable at x, then f is Hadamard differentiable at x. If f is Borel measurable (or has the Baire property) and is G\ ateaux differentiable at all points, then f is Hadamard differentiable at all points except a set which is σ-directionally porous set (and so is Aronszajn null, Haar null and -null). Consequently, an everywhere G\ ateaux differentiable f: n Y is Fr\' echet differentiable except a nowhere dense σ-porous set.