The convergence of a sequence of polynomials and the distribution of their zeros

Abstract

Suppose that fn is a sequence of polynomials, fn(k)(0) converges for every non-negative integer k, and that the limit is not 0 for some k. It is shown that if all the zeros of f1, f2, … lie in the closed upper half plane Im\ z≥ 0, or if f1, f2, … are real polynomials and the numbers of their non-real zeros are uniformly bounded, then the sequence converges uniformly on compact sets in the complex plane. The results imply a theorem of Benz and a conjecture of P\'olya.