Wild boundary behaviour of holomorphic functions in domains of CN

Abstract

Given a domain of holomorphy D in CN, N≥ 2, we show that the set of holomorphic functions in D whose cluster sets along any finite length paths to the boundary of D is maximal, is residual, densely lineable and spaceable in the space O(D) of holomorphic functions in D. Besides, if D is a strictly pseudoconvex domain in CN, and if a suitable family of smooth curves γ(x,r), x∈ bD, r∈ [0,1), ending at a point of bD is given, then we exhibit a spaceable, densely lineable and residual subset of O(D), every element f of which satisfies the following property: For any measurable function h on bD, there exists a sequence (rn)n ∈ [0,1) tending to 1, such that \[ f γ(x,rn) → h (x),\,n→ ∞, \] for almost every x in bD.