A note on a conjecture concerning boundary uniqueness

Abstract

We consider the following conjecture (from Huang, et al): Let + denote the upper half disc in C and let γ = ( - 1, 1) (viewed as an interval in the real axis in C). Assume that F is a holomorphic function on + with continuous extension up to γ such that F maps γ into \|Im z|≤ C|Re z|\, for some positive C. If F vanishes to infinite order at 0 then F vanishes identically. We show that given the conditions of the conjecture, either F 0 or there is a sequence in +, converging to 0, along which Im F/Re F (defined where Re F≠ 0) is unbounded.