Frechet differentiability via partial Frechet differentiability
Functional Analysis
2022-09-27 v1
Abstract
Let be Banach spaces and a real function on . Let be the set of all points at which is partially Fr\' echet differentiable but is not Fr\' echet differentiable. Our results imply that if are Asplund spaces and is continuous (resp. Lipschitz) on , then is a first category set (resp. a -upper porous set). We also prove that if , are separable Banach spaces and is a Lipschitz mapping, then the set of all points at which is G\^ ateaux differentiable, is Fr\' echet differentiable along a closed subspace of finite codimension but is not Fr\' echet differentiable, is -upper porous. A number of related more general results are also proved.
Keywords
Cite
@article{arxiv.2209.12679,
title = {Frechet differentiability via partial Frechet differentiability},
author = {Ludek Zajicek},
journal= {arXiv preprint arXiv:2209.12679},
year = {2022}
}