Exponential polynomials with Fatou and non-escaping sets of finite Lebesgue measure

Abstract: We give conditions ensuring that the Fatou set and the complement of the fast escaping set of an exponential polynomial f both have finite Lebesgue measure. Essentially, these conditions are designed such that $|f(z)|\ge \exp (|z|^\alpha )$ for some $\alpha>0$ and all z outside a set of finite Lebesgue measure.

“…Schubert [10] showed that the Lebesgue measure of the Fatou set of sin(z) is finite in any vertical strip of width 2π. Hemke [7] and the author [13] gave examples of transcendental entire functions whose Fatou set has finite measure. Now the natural question arises whether the Julia set of a transcendental entire function can also have positive measure and still be small in the sense that the Julia set itself has finite measure.…”

Transcendental Julia sets of positive finite Lebesgue measure

“…Schubert [10] showed that the Lebesgue measure of the Fatou set of sin(z) is finite in any vertical strip of width 2π. Hemke [7] and the author [13] gave examples of transcendental entire functions whose Fatou set has finite measure. Now the natural question arises whether the Julia set of a transcendental entire function can also have positive measure and still be small in the sense that the Julia set itself has finite measure.…”

Transcendental Julia sets of positive finite Lebesgue measure

The Lebesgue Measure of the Julia Sets of Permutable Transcendental Entire Functions