Regularity and growth conditions for fast escaping points of entire functions

Abstract

Let f be a transcendental entire function. The quite fast escaping set, Q(f), and the set Q2(f), which was defined recently, are equal to the fast escaping set, A(f), under certain conditions. In this paper we generalise these sets by introducing a family of sets Qm(f), m ∈ N. We also give one regularity and one growth condition which imply that Qm(f) is equal to A(f) and we show that all functions of finite order and positive lower order satisfy Qm(f)=A(f) for any m. Finally, we relate the new regularity condition to a sufficient condition for Q2(f)=A(f) introduced in recent work.