Mean convergence of Hermite-Feijér and Hermite interpolation for Freud weights
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Publication:1298564
DOI10.1016/S0377-0427(98)00159-9zbMath1041.41501MaRDI QIDQ1298564
Publication date: 1998
Published in: Journal of Computational and Applied Mathematics (Search for Journal in Brave)
Orthogonal functions and polynomials, general theory of nontrigonometric harmonic analysis (42C05) Approximation by polynomials (41A10)
Related Items (4)
On mean convergence of Hermite-Fejér and Hermite interpolation for Erdős weights ⋮ Convergence of Hermite and Hermite-Fejér interpolation of higher order for Freud weights ⋮ Necessary conditions of convergence of Hermite-Fejér interpolation polynomials for exponential weights ⋮ \(L_{\infty}\) convergence of interpolation and associated product integration for exponential weights.
Cites Work
- Mean convergence of Hermite-Fejér interpolation
- Christoffel functions, orthogonal polynomials, and Nevai's conjecture for Freud weights
- The weighted \(L_ p\)-norms of orthonormal polynomials for Freud weights
- A class of orthogonal polynomials
- Necessary and Sufficient Conditions for Mean Convergence of Lagrange Interpolation for Freud Weights
- On Hermite-Fejér interpolation sequences
- Über die Konvergenz des Hermite-Fejérschen Interpolationsverfahrens
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