On the P\'olya-Wiman properties of Differential Operators
Abstract
Let φ(x)=Σ αn xn be a formal power series with real coefficients, and let D denote differentiation. It is shown that "for every real polynomial f there is a positive integer m0 such that φ(D)mf has only real zeros whenever m≥ m0" if and only if "α0=0 or 2α0α2 - α12 <0", and that if φ does not represent a Laguerre-P\'olya function, then there is a Laguerre-P\'olya function f of genus 0 such that for every positive integer m, φ(D)mf represents a real entire function having infnitely many nonreal zeros.
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