A property shared by continuous linear functions and holomorphic functions

Abstract

In this note, we continue to highlight some applications of Theorem 1 of [3]. Here is a sample: Let X be an open set in Cn, an open convex set in C and f, g : X C two holomorphic functions such that f(X)≠, f(X)≠ and g(X)⊂eq . Then, there exists a set A in [0,1] with the following properties:(a) for each x∈ X, there exists λ∈ A such that λ g(x)+(1-λ)f(x)∈\ ; (b) for each finite set B in A, there exists u∈ X such that μ g(u)+(1-μ)f(u)∈ C for all μ∈ B.