The nonlinear matrix equation was solved by Gao (2016) via standard fixed point method. In this paper, three more elegant iterative methods are proposed to find the approximate solution of the nonlinear matrix equation namely: Newton’s method; modified fixed point method and a combination of Newton’s method and fixed point method. The convergence of Newton’s method and modified fixed point method are derived. Comparative numerical experimental results indicate that the new developed algorithms have both less computational time and good convergence properties when compared to their respective standard algorithms. Keywords: Hermitian positive definite solution; nonlinear matrix equation; modified fixed point method; iterative met...
A class of optimal iterative methods for solving nonlinear equations is extended up to sixteenth-ord...
In this paper, we are presenting Hermite collocation method to solve numer- ically the Fredholm-Volt...
In this paper we present the development of the algorithm the Hestenes and Steifel (HS),that will be...
In recent years nonlinear problems have several methods to be solved and utilize a well-known analyt...
In this paper, the iterative method, proposed by Gejji and Jafari in 2006, has been modified for sol...
This work proposes new fourth-order iterative methods to solve non-linear equations . The ite...
In this paper, We propose a new nonlinear conjugate gradient method (FRA) that satisfies a sufficien...
In Twenty century, Partial Differential Equations (PDE) are solved by Numerical Approach such as Ada...
[EN] Thesemilocal and local convergence analyses of a two-step iterative method for nonlinear nondif...
The solutions of the SchrÓ§dinger equation with Manning-Rosen plus Yukawa potential (MRYP) have been...
In this paper, an approximate solution of nonlinear two points boundary variational problem is prese...
A new preconditioner of the type =+̅+′ which generalizes the preconditioners of Evans et al. (2001) ...
A new one-step block method with generalized three hybrid points for solving initial value problems ...
A novel family of numerical integration of closed Newton-Cotes quadrature rules is presented which u...
Solutions of second – order nonlinear differential system is investigated. A sufficient condition fo...
A class of optimal iterative methods for solving nonlinear equations is extended up to sixteenth-ord...
In this paper, we are presenting Hermite collocation method to solve numer- ically the Fredholm-Volt...
In this paper we present the development of the algorithm the Hestenes and Steifel (HS),that will be...
In recent years nonlinear problems have several methods to be solved and utilize a well-known analyt...
In this paper, the iterative method, proposed by Gejji and Jafari in 2006, has been modified for sol...
This work proposes new fourth-order iterative methods to solve non-linear equations . The ite...
In this paper, We propose a new nonlinear conjugate gradient method (FRA) that satisfies a sufficien...
In Twenty century, Partial Differential Equations (PDE) are solved by Numerical Approach such as Ada...
[EN] Thesemilocal and local convergence analyses of a two-step iterative method for nonlinear nondif...
The solutions of the SchrÓ§dinger equation with Manning-Rosen plus Yukawa potential (MRYP) have been...
In this paper, an approximate solution of nonlinear two points boundary variational problem is prese...
A new preconditioner of the type =+̅+′ which generalizes the preconditioners of Evans et al. (2001) ...
A new one-step block method with generalized three hybrid points for solving initial value problems ...
A novel family of numerical integration of closed Newton-Cotes quadrature rules is presented which u...
Solutions of second – order nonlinear differential system is investigated. A sufficient condition fo...
A class of optimal iterative methods for solving nonlinear equations is extended up to sixteenth-ord...
In this paper, we are presenting Hermite collocation method to solve numer- ically the Fredholm-Volt...
In this paper we present the development of the algorithm the Hestenes and Steifel (HS),that will be...