Non-extendability of holomorphic functions with bounded or continuously extendable derivatives

Abstract

We consider the spaces HF∞() and AF() containing all holomorphic functions f on an open set ⊂eq C, such that all derivatives f(l), l∈ F ⊂eq N0=\ 0,1,...\, are bounded on , or continuously extendable on , respectively. We endow these spaces with their natural topologies and they become Fr\'echet spaces. We prove that the set S of non-extendable functions in each of these spaces is either void, or dense and Gδ. We give examples where S= or not. Furthermore, we examine cases where F can be replaced by F=\ l∈ N0: F ≤slant l ≤slant F\, or F0= \ l∈ N0:0≤slant l ≤slant F\ and the corresponding spaces stay unchanged.