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$L_p$-Convergence of higher order Hermite or Hermite-Fejér interpolation polynomials with exponential-type weights

Published 10 Jul 2014 in math.CA | (1407.3702v1)

Abstract: Let $\mathbb{R}=(-\infty,\infty)$, and let $Q\in C1(\mathbb{R}): \mathbb{R}\rightarrow \mathbb{R+}=[0,\infty)$ be an even function, which is an exponent. We consider the weight $w_\rho(x)=|x|{\rho} e{-Q(x)}$, $\rho\geqslant 0$, $x\in \mathbb{R}$, and then we can construct the orthonormal polynomials $p_{n}(w_\rho 2;x)$ of degree n for $w_\rho 2(x)$. In this paper we obtain $L_p$-convergence theorems of even order Hermite-Fej\'er interpolation polynomials at the zeros $\left{x_{k,n,\rho}\right}{k=1}n$ of $p{n}(w_\rho 2;x)$.

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