Generalized spline interpolation of functions with large gradients in boundary layers
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Publication:2207518
DOI10.1134/S0965542520030057zbMath1451.41002OpenAlexW3025512663MaRDI QIDQ2207518
E. V. Kitaeva, A. I. Zadorin, Igor A. Blatov
Publication date: 23 October 2020
Published in: Computational Mathematics and Mathematical Physics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1134/s0965542520030057
Cites Work
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- Non-polynomial spline method for the solution of two-dimensional linear wave equations with a nonlinear source term
- On the parameter-uniform convergence of exponential spline interpolation in the presence of a boundary layer
- Interpolation formula for functions with a boundary layer component and its application to derivatives calculation
- Exponential B-spline collocation method for self-adjoint singularly perturbed boundary value problems
- A practical guide to splines
- Parabolic spline interpolation for functions with large gradient in the boundary layer
- Fourth order accuracy collocation method for singularly perturbed boundary value problems
- Cubic spline interpolation of functions with high gradients in boundary layers
- Differencing scheme for a differential equation with a small parameter affecting the highest derivative
- Analysis of Some Difference Approximations for a Singular Perturbation Problem Without Turning Points
- Inverses of Band Matrices and Local Convergence of Spline Projections
- Exponentially fitted cubic spline for two-parameter singularly perturbed boundary value problems
- On the uniform convergence of parabolic spline interpolation on the class of functions with large gradients in the boundary layer
- Numerical solution of second-order one-dimensional hyperbolic equation by exponential B-spline collocation method
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