Hermite-Poulain theorems for linear finite difference operators

Abstract

We establish analogues of the Hermite-Poulain theorem for linear finite difference operators with constant coefficients defined on sets of polynomials with roots on a straight line, in a strip, or in a half-plane. We also consider the central finite difference operator of the form θ, h(f)(z)=eiθf(z+ih)-e-iθf(z-ih), θ∈[0,π),\ \ h∈C\0\, where f is a polynomial or an entire function of a certain kind, and prove that the roots of θ, h(f) are simple under some conditions. Moreover, we prove that the operator θ, h does not decrease the mesh on the set of polynomials with roots on a line and find the minimal mesh. The asymptotics of the roots of θ, h(p) as |h|∞ is found for any complex polynomial p. Some other interesting roots preserving properties of the operator θ, h are also studied, and a few examples are presented.