Entire functions of exponential type represented by pseudo-random and random Taylor series

Abstract

We study the influence of the multipliers (n) on the angular distribution of zeroes of the Taylor series \[ F (z) = Σn 0 (n) znn!\,. \] We show that the distribution of zeroes of F is governed by certain autocorrelations of the sequence . Using this guiding principle, we consider several examples of random and pseudo-random sequences and, in particular, answer some questions posed by Chen and Littlewood in 1967. As a by-product we show that if is a stationary random integer-valued sequence, then either it is periodic, or its spectral measure has no gaps in its support. The same conclusion is true if is a complex-valued stationary ergodic sequence that takes values from a uniformly discrete set.