On an interpolation process of Lagrange-Hermite type (Q2853206)

The authors consider a Lagrange-Hermite polynomial, interpolating a function at the Jacobi zeros and, with its first \((r-1)\) derivatives, at the points \(\pm 1\). They 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, optimal estimates for the error of this process also in the weighted uniform metric are given.