BOUNDEDNESS AND UNIFORM NUMERICAL APPROXIMATION OF THE WEIGHTED HILBERT TRANSFORM ON THE REAL LINE
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Publication:2748920
DOI10.1081/NFA-100103786zbMath0983.41015OpenAlexW1985010728WikidataQ59411869 ScholiaQ59411869MaRDI QIDQ2748920
Kai Diethelm, Steven B. Damelin
Publication date: 16 April 2002
Published in: Numerical Functional Analysis and Optimization (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1081/nfa-100103786
Numerical methods for integral transforms (65R10) Approximate quadratures (41A55) Numerical integration (65D30)
Related Items (8)
An Analytic and Numerical Analysis of Weighted Singular Cauchy Integrals with Exponential Weights on ℝ ⋮ Pointwise bounds of orthogonal expansions on the real line via weighted Hilbert transforms ⋮ Marcinkiewicz-Zygmund inequalities and the numerical approximation of singular integrals for exponential weights: Methods, results and open problems, some new, some old ⋮ The Hilbert transform of cubic splines ⋮ Weighted Lagrange interpolation with preassigned nodes on the real line ⋮ Convergence and stability of a new quadrature rule for evaluating Hilbert transform ⋮ A note on finite quadrature rules with a kind of Freud weight function ⋮ Approximation methods and stability of singular integral equations for Freud exponential weights on the line
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