A Rolle type theorem for cyclicity of zeros of families of analytic functions

Abstract

Let \fλ; j\λ∈ V; 1 j k be families of holomorphic functions in the open unit disk ⊂ depending holomorphically on a parameter λ∈ V⊂ n. We establish a Rolle type theorem for the generalized multiplicity (called cyclicity) of zero of the family of univariate holomorphic functions Σj=1k fλ;jλ∈ V at 0∈. As a corollary, we estimate the cyclicity of the family of generalized exponential polynomials, that is, the family of entire functions of the form Σk=1m Pk(z)eQk(z), z∈, where Pk and Qk are holomorphic polynomials of degrees p and q, respectively, parameterized by vectors of coefficients of Pk and Qk.