A lower bound for the norm of the minimal residual polynomial

Abstract

Let S be a compact infinite set in the complex plane with 0S, and let Rn be the minimal residual polynomial on S, i.e., the minimal polynomial of degree at most n on S with respect to the supremum norm provided that Rn(0)=1. For the norm Ln(S) of the minimal residual polynomial, the limit (S):=n∞[n]Ln(S) exists. In addition to the well-known and widely referenced inequality Ln(S)≥(S)n, we derive the sharper inequality Ln(S)≥2(S)n/(1+(S)2n) in the case that S is the union of a finite number of real intervals. As a consequence, we obtain a slight refinement of the Bernstein--Walsh Lemma.