Numerical evaluation of Cauchy principal value integrals based on local spline approximation operators
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Publication:5961657
DOI10.1016/S0377-0427(96)00105-7zbMath0869.65015MaRDI QIDQ5961657
Cattarina Dagnino, Paola Lamberti
Publication date: 1 September 1997
Published in: Journal of Computational and Applied Mathematics (Search for Journal in Brave)
convergencenumerical examplesquadrature formulasapproximating splinesCauchy principal value integral
Related Items (7)
Bivariate quasi-interpolating splines with applications in numerical integration ⋮ Constructing solutions of Cauchy type integral equations by using four kinds of basis ⋮ Numerical integration based on bivariate quadratic spline quasi-interpolants on Powell-Sabin partitions ⋮ Superconvergent spline quasi-interpolants and an application to numerical integration ⋮ Approximating the singular integrals of Cauchy type with weight function on the interval ⋮ Quadrature formula for approximating the singular integral of Cauchy type with unbounded weight function on the edges ⋮ On spline quasi-interpolation through dimensions
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- Application of approximating splines for the solution of Cauchy singular integral equations
- On the uniform convergence of Cauchy principal values of quasi-interpolating splines
- The use of modified quasi-interpolatory splines for the solution of the Prandtl equation
- Numerical integration based on quasi-interpolating splines
- Numerical Evaluation of Cauchy Principal Value Integrals with Singular Integrands
- Quasi-interpolatory splines based on Schoenberg points
- A practical guide to splines.
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