Extrapolation of a discrete collocation-type method of Hammerstein equations
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Publication:1903652
DOI10.1016/0377-0427(94)00049-7zbMath0841.65133OpenAlexW2043569612MaRDI QIDQ1903652
Publication date: 1 February 1996
Published in: Journal of Computational and Applied Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/0377-0427(94)00049-7
numerical resultsHammerstein integral equationscollocationRichardson extrapolationquadrature methodasymptotic error expansion
Related Items (12)
Fast Fourier-Galerkin methods for nonlinear boundary integral equations ⋮ Multilevel augmentation methods with matrix compression for solving reformulated Hammerstein equations ⋮ About a numerical method of successive interpolations for functional Hammerstein integral equations ⋮ A fast multiscale solver for modified Hammerstein equations ⋮ The numerical method of successive interpolations for Fredholm functional integral equations ⋮ Numerical approach for solving neutral differential equation with deviating argument ⋮ Numerical solution of volterra functional integral equation by using cubic B‐spline scaling functions ⋮ Superconvergent Nyström and degenerate kernel methods for Hammerstein integral equations ⋮ Superconvergent product integration method for Hammerstein integral equations ⋮ Asymptotic error analysis of a quadrature method for integral equations with Green's function kernels ⋮ Extrapolation of Nyström solution for two dimensional nonlinear Fredholm integral equations ⋮ Richardson Extrapolation of Superconvergent Projection-Type Methods for Hammerstein Equations*
Cites Work
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- Extrapolation method for Fredholm integral equations with non-smooth kernels
- Extrapolation of the Iterated–Collocation Method for Integral Equations of the Second Kind
- Degenerate Kernel Method for Hammerstein Equations
- Richardson extrapolation in the approximate solution of fredholm integral equations of the second kind
- Superconvergence of a Collocation-type Method for Hummerstein Equations
- A Discrete Collocation-Type Method for Hammerstein Equations
- A New Collocation-Type Method for Hammerstein Integral Equations
- Asymptotic Error Expansions for Numerical Solutions of Integral Equations
- On the Approximation of Fixed Points of Nonlinear Compact Operators
- The Deferred Approach to the Limit for Eigenvalues of Integral Equations
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