Area of the complement of the fast escaping sets of a family of entire functions

Abstract

Let f be an entire function with the form f(z)=P(ez)/ez, where P is a polynomial with degree at least 2 and P(0)≠ 0. We prove that the area of the complement of the fast escaping set (hence the Fatou set) of f in a horizontal strip of width 2π is finite. In particular, the corresponding result can be applied to the sine family α(z+β), where α≠ 0 and β∈C.