Final Sets for Operators on Real Entire Functions of Order One, Normal Type

Abstract

Let $f$ be a real entire function of order one, normal type that is bounded on the real axis and $L = \varphi \left ( D \right )$, $D = \left ( {d / dz} \right )$ with $\varphi \left ( \omega \right )$ a Laguerre-Pólya function satisfying $\varphi \left ( 0 \right ) = 0$. Then the final set of $f$ with respect to $L$ is contained in the real axis as either a discrete subset or the whole axis.