On the convergence of iterative methods for general differential-algebraic systems
DOI10.1016/j.cam.2003.12.032zbMath1054.65130OpenAlexW2023128239MaRDI QIDQ1877185
Jankowski, Tadeusz, Zbigniew Bartoszewski, Marian Kwapisz
Publication date: 16 August 2004
Published in: Journal of Computational and Applied Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.cam.2003.12.032
convergencenumerical examplesdifferential-algebraic equationsPicard algorithmiterative processeswaveform relaxationfunctional-integral-algebraic equationsGauss-Seidel algorithms
Integro-ordinary differential equations (45J05) Numerical methods for integral equations (65R20) Other nonlinear integral equations (45G10) Implicit ordinary differential equations, differential-algebraic equations (34A09) Numerical methods for initial value problems involving ordinary differential equations (65L05) Numerical methods for differential-algebraic equations (65L80)
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Cites Work
- On solving systems of differential algebraic equations
- A boundary value problem for differential equations with a retarded argument
- On the convergence of waveform relaxation methods for differential-functional systems of equations
- Introduction to functional differential equations
- Convergence of numerical methods for systems of neutral functional-differential-algebraic equations
- A Constructive Theorem of Existence and Uniqueness for the Problem\documentclass{article}\pagestyle{empty}\begin{document}$ y' = f(x,y,\lambda),y(a) = \alpha,y\left( b\right) = \beta $\end{document}
- Waveform Relaxation for Functional-Differential Equations
- General Parameter Mapping Technique—A Procedure for Solution of Non-linear Boundary Value Problems Depending on an Actual Parameter
- Convergence of Waveform Relaxation Methods for Differential-Algebraic Systems
- A monotone boundary-value problem for differential equations with parameters
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