Separation of Zeros of Translates of Polynomials and Entire Functions

Using potential theoretic methods we study the asymptotic distribution of zeros and critical points of Sobolev orthogonal polynomials, i.e., polynomials orthogonal with respect to an inner product involving derivatives. Under general assumptions it is shown that the critical points have a canonical

It is shown that if f z is a nonconstant real entire function of genus 0 and if all Ž . < < Ž . the zeros of f z are distributed in an infinite strip Im z F A, A ) 0, then f z has just as many critical points as couples of nonreal zeros.

Special entire functions of completely regular growth with additional properties are utilized to interpolate entire functions with certain bounds, and to give an example of a weighted inductive limit of Banach spaces of entire functions such that its topology cannot be described by the canonical wei

We consider the distribution of alternation points in best real polynomial approximation of a function f # C[&1, 1]. For entire functions f we look for structural properties of f that will imply asymptotic equidistribution of the corresponding alternation points.