Lp-Convergence of higher order Hermite or Hermite-Fej\'er interpolation polynomials with exponential-type weights

Abstract

Let R=(-∞,∞), and let Q∈ C1(R): R→ R+=[0,∞) be an even function, which is an exponent. We consider the weight w(x)=|x| e-Q(x), ≥slant 0, x∈ R, and then we can construct the orthonormal polynomials pn(w 2;x) of degree n for w 2(x). In this paper we obtain Lp-convergence theorems of even order Hermite-Fej\'er interpolation polynomials at the zeros \xk,n,\k=1n of pn(w 2;x).