The basic requirement of Newton’s method in solving systems of nonlinear equations is, the Jacobian must be non-singular. This condition restricts to some extent the application of Newton method. In this paper we present a modification of Newton’s method for systems of nonlinear equations where the Jacobian is singular. This is made possible by approximating the Jacobian inverse into a diagonal matrix by means of variational techniques. The anticipation of our approach is to bypass the point in which the Jacobian is singular. The local convergence of the proposed method has been proven under suitable assumptions. Numerical experiments are carried out which show that, the proposed method is very encouraging
We propose some improvements on a diagonal Newton's method for solving large-scale systems of nonlin...
AbstractFor solving systems of nonlinear equations, we have recently developed a Newton’s method to ...
AbstractThe Behavior of the Newton-Raphson method at the singular roots has been studied by a number...
It is well known that when the Jacobian of nonlinear systems is nonsingular in the neighborhood of t...
We propose a modification to Newton’s method for solving nonlinear equations,namely a Jacobian Compu...
The basic requirement of Newtons method in solving systems of nonlinear equations is, the Jacobian m...
Newton-type methods with diagonal update to the Jacobian matrix are regarded as one most efficient a...
The famous and well known method for solving systems of nonlinear equations is the Newton’s method. ...
Problem statement: The major weaknesses of Newton method for nonlinear equations entail computation ...
AbstractOne of the widely used methods for solving a nonlinear system of equations is the quasi-Newt...
Abstract. Several methods have been proposed to solve systems of nonlinear equations. Among them, Ne...
We suggested a Broyden's-Like method in which the Jacobian of the system has some special structure...
AbstractThis paper presents a new modified Newton method for nonlinear equations. This method uses a...
One of the widely used methods for solving a nonlinear system of equations is the quasi-Newton metho...
We present a new diagonal quasi-Newton update with an improved diagonal Jacobian approximation for s...
We propose some improvements on a diagonal Newton's method for solving large-scale systems of nonlin...
AbstractFor solving systems of nonlinear equations, we have recently developed a Newton’s method to ...
AbstractThe Behavior of the Newton-Raphson method at the singular roots has been studied by a number...
It is well known that when the Jacobian of nonlinear systems is nonsingular in the neighborhood of t...
We propose a modification to Newton’s method for solving nonlinear equations,namely a Jacobian Compu...
The basic requirement of Newtons method in solving systems of nonlinear equations is, the Jacobian m...
Newton-type methods with diagonal update to the Jacobian matrix are regarded as one most efficient a...
The famous and well known method for solving systems of nonlinear equations is the Newton’s method. ...
Problem statement: The major weaknesses of Newton method for nonlinear equations entail computation ...
AbstractOne of the widely used methods for solving a nonlinear system of equations is the quasi-Newt...
Abstract. Several methods have been proposed to solve systems of nonlinear equations. Among them, Ne...
We suggested a Broyden's-Like method in which the Jacobian of the system has some special structure...
AbstractThis paper presents a new modified Newton method for nonlinear equations. This method uses a...
One of the widely used methods for solving a nonlinear system of equations is the quasi-Newton metho...
We present a new diagonal quasi-Newton update with an improved diagonal Jacobian approximation for s...
We propose some improvements on a diagonal Newton's method for solving large-scale systems of nonlin...
AbstractFor solving systems of nonlinear equations, we have recently developed a Newton’s method to ...
AbstractThe Behavior of the Newton-Raphson method at the singular roots has been studied by a number...