A homotopy method is presented for the construction of frozen Jacobian iterative methods. The frozen Jacobian iterative methods are attractive because the inversion of the Jacobian is performed in terms of LUfactorization only once, for a single instance of the iterative method. We embedded parameters in the iterative methods with the help of the homotopy method: the values of the parameters are determined in such a way that a better convergence rate is achieved. The proposed homotopy technique is general and has the ability to construct different families of iterative methods, for solving weakly nonlinear systems of equations. Further iterative methods are also proposed for solving general systems of nonlinear equations.

### Constructing frozen jacobian iterative methods for solving systems of nonlinear equations, associated with ODEs and PDEs using the homotopy method

#### Abstract

A homotopy method is presented for the construction of frozen Jacobian iterative methods. The frozen Jacobian iterative methods are attractive because the inversion of the Jacobian is performed in terms of LUfactorization only once, for a single instance of the iterative method. We embedded parameters in the iterative methods with the help of the homotopy method: the values of the parameters are determined in such a way that a better convergence rate is achieved. The proposed homotopy technique is general and has the ability to construct different families of iterative methods, for solving weakly nonlinear systems of equations. Further iterative methods are also proposed for solving general systems of nonlinear equations.
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2016
http://www.mdpi.com/1999-4893/9/1/18/pdf
Frozen jacobian; Homotopy method; Ordinary differential equations; Partial differential equations; Systems of nonlinear equations; Computational Theory and Mathematics; Computational Mathematics; Numerical Analysis; Theoretical Computer Science
Qasim, U.; Ali, Z.; Ahmad, F.; SERRA CAPIZZANO, Stefano; Ullah, M. Z.; Asma, M.
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Utilizza questo identificativo per citare o creare un link a questo documento: `https://hdl.handle.net/11383/2047968`
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