A relation between Newton and Gauss-Newton steps for singular nonlinear equations
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Publication:1090072
DOI10.1007/BF02242187zbMath0621.65046OpenAlexW74726671MaRDI QIDQ1090072
Publication date: 1988
Published in: Computing (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/bf02242187
Related Items (4)
An efficiently implementable Gauss-Newton-like method for solving singular nonlinear equations ⋮ An ABS algorithm for solving singular nonlinear systems with rank defects. ⋮ A modified Brown algorithm for solving singular nonlinear systems with rank defects ⋮ A ABS algorithm for solving singular nonlinear system with space transformation
Cites Work
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- Computing simple bifurcation points using a minimally extended system of nonlinear equations
- On solving nonlinear least-squares problems in case of rankdeficient Jacobians
- An efficiently implementable Gauss-Newton-like method for solving singular nonlinear equations
- On the accurate determination of nonisolated solutions of nonlinear equations
- Computing turning points of curves implicitly defined by nonlinear equations depending on a parameter
- Convergence of the Newton process to multiple solutions
- Analysis of Newton’s Method at Irregular Singularities
- Characterization and Computation of Generalized Turning Points
- A New Acceleration Method for Newton’s Method at Singular Points
- Tensor Methods for Nonlinear Equations
- On Solving Nonlinear Equations with Simple Singularities or Nearly Singular Solutions
- Newton’s Method for Singular Problems when the Dimension of the Null Space is $>1$
- The Calculation of Turning Points of Nonlinear Equations
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