Publication at Faculty of Mathematics and Physics |
2015
Abstract
Let f be a mapping from a separable Banach space to a Banach space. We prove that, except for a sigma-directionally porous set, f is Hadamard differentiable at those points, at which f is Lipschitz and Gateaux differentiable.
As a consequence we obtain that an everywhere Gateaux differentiable mapping from an Euclidean space to a Banach space is Frechet differentiable except for a nowhere dense sigma-porous set.