A class of superlinear decomposition beetiiods in nonlinear equations
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Publication:3792158
DOI10.1080/01630568708816251zbMath0647.65039OpenAlexW1994080771MaRDI QIDQ3792158
Publication date: 1987
Published in: Numerical Functional Analysis and Optimization (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/01630568708816251
Banach spacesdecomposition methodslocal convergencesuperlinear convergenceNewton-like methodsconsistent approximation
Iterative procedures involving nonlinear operators (47J25) Numerical solutions to equations with nonlinear operators (65J15)
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On the R-order of coupled sequences arising in single-step type methods ⋮ Parallel ABS projection methods for linear and nonlinear systems with block arrowhead structure
Cites Work
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- Consistent approximations in Newton-type decomposition methods
- On the R-order of coupled sequences
- A note on solution of large sparse systems of nonlinear equations
- A Decomposition Methodology and a Class of Algorithms for the Solution of Nonlinear Equations
- An Approximate Newton Method for Coupled Nonlinear Systems
- GAUSS-newton-like methods for nonlinear least squares with equality constraints-local convergence and applications
- A multilevel Newton algorithm with macromodeling and latency for the analysis of large-scale nonlinear circuits in the time domain
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