Numerical approximation of Fredholm integral equation by the constrained mock-Chebyshev least squares operator
From MaRDI portal
Publication:6567306
DOI10.1016/J.CAM.2024.115886zbMATH Open1544.41021MaRDI QIDQ6567306
Donatella Occorsio, Domenico Mezzanotte, Federico Nudo, F. Dell'Accio
Publication date: 4 July 2024
Published in: Journal of Computational and Applied Mathematics (Search for Journal in Brave)
Numerical methods for integral equations (65R20) Abstract approximation theory (approximation in normed linear spaces and other abstract spaces) (41A65) Fredholm integral equations (45B05)
Cites Work
- Title not available (Why is that?)
- Title not available (Why is that?)
- Title not available (Why is that?)
- On the constrained mock-Chebyshev least-squares
- Filtered interpolation for solving Prandtl's integro-differential equations
- Divergence (Runge phenomenon) for least-squares polynomial approximation on an equispaced grid and mock-Chebyshev subset interpolation
- Über empirische Funktionen und die Interpolation zwischen äquidistanten Ordinaten.
- Generalizations of the constrained mock-Chebyshev least squares in two variables: tensor product vs total degree polynomial interpolation
- Constrained mock-Chebyshev least squares quadrature
- Quadrature methods for integro-differential equations of Prandtl's type in weighted spaces of continuous functions
- Product integration rules by the constrained mock-Chebyshev least squares operator
- Nyström methods for Fredholm integral equations using equispaced points
- Interpolation Processes
- The Numerical Solution of Integral Equations of the Second Kind
- Radiation of water waves by a heaving submerged horizontal disc
- Bivariate generalized Bernstein operators and their application to Fredholm integral equations
- Projection Methods and Condition Numbers in Uniform Norm for Fredholm and Cauchy Singular Integral Equations
- A numerical method for solving systems of hypersingular integro-differential equations
- Polynomial approximation of derivatives by the constrained mock-Chebyshev least squares operator
- An adaptive algorithm for determining the optimal degree of regression in constrained mock-Chebyshev least squares quadrature
Related Items (2)
An extension of a mixed interpolation-regression method using zeros of orthogonal polynomials ⋮ A mixed interpolation-regression approximation operator on the triangle
This page was built for publication: Numerical approximation of Fredholm integral equation by the constrained mock-Chebyshev least squares operator
Report a bug (only for logged in users!)Click here to report a bug for this page (MaRDI item Q6567306)
