ON AN INTERPOLATION PROCESS OF LAGRANGE–HERMITE TYPE

Giuseppe Mastroianni, Gradimir V. Milovanovic, Incoronata Notarangelo

Abstract: We consider a Lagrange–Hermite polynomial, interpolating a function at the Jacobi zeros and, with its first $(r-1)$ derivatives, at the points $\pm 1$. We give necessary and sufficient conditions on the weights for the uniform boundedness of the related operator in certain suitable weighted $L^p$-spaces, $1<p<\infty$, proving a Marcinkiewicz inequality involving the derivative of the polynomial at $\pm 1$. Moreover, we give optimal estimates for the error of this process also in the weighted uniform metric.

Keywords: Hermite–Lagrange interpolation, approximation by polynomials, orthogonal polynomials, Jacobi weights

Classification (MSC2000): 41A05; 41A10

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