AbstractA modification of some classical third order methods is studied. The main advantage of these methods is that they do not need evaluate any Fréchet derivative. A convergence theorem in Banach spaces, just assuming that the second divided difference is bounded by a nondecreasing function and a punctual condition, is presented. Fréchet differentiability is not required. Finally, a particular example is analyzed where our conditions are fulfilled and the classical ones fail
AbstractA new two-point iteration of order three is introduced to approximate a solution of a nonlin...
Two new semilocal convergence results of Newton-Kantorovich type are presented for the Halley method...
In this paper we use a one-parametric family of second-order iterations to solve a nonlinear operato...
AbstractA modification of some classical third order methods is studied. The main advantage of these...
AbstractA modification of classical third-order methods is proposed. The main advantage of these met...
AbstractWe analyse the classical third-order methods (Chebyshev, Halley, super-Halley) to solve a no...
A family of third-order iterative processes (that includes Chebyshev and Halley's methods) is studie...
In this work we study a class of secant-like iterations for solving nonlinear equations in Banach sp...
The aim of this paper is to establish the semilocal convergence of a family of third-order Chebyshev...
The geometrical interpretation of a family of higher order iterative methods for solving nonlinear s...
AbstractIn this work we study a class of secant-like iterations for solving nonlinear equations in B...
AbstractThe geometrical interpretation of a family of higher order iterative methods for solving non...
The semilocal and local convergence analyses of a two-step iterative method for nonlinear nondiffere...
This paper presents a new nonstationary iterative method for solving non linear algebraic equations ...
The convergence of new second-order iterative methods are analyzed in Banach spaces by introducing a...
AbstractA new two-point iteration of order three is introduced to approximate a solution of a nonlin...
Two new semilocal convergence results of Newton-Kantorovich type are presented for the Halley method...
In this paper we use a one-parametric family of second-order iterations to solve a nonlinear operato...
AbstractA modification of some classical third order methods is studied. The main advantage of these...
AbstractA modification of classical third-order methods is proposed. The main advantage of these met...
AbstractWe analyse the classical third-order methods (Chebyshev, Halley, super-Halley) to solve a no...
A family of third-order iterative processes (that includes Chebyshev and Halley's methods) is studie...
In this work we study a class of secant-like iterations for solving nonlinear equations in Banach sp...
The aim of this paper is to establish the semilocal convergence of a family of third-order Chebyshev...
The geometrical interpretation of a family of higher order iterative methods for solving nonlinear s...
AbstractIn this work we study a class of secant-like iterations for solving nonlinear equations in B...
AbstractThe geometrical interpretation of a family of higher order iterative methods for solving non...
The semilocal and local convergence analyses of a two-step iterative method for nonlinear nondiffere...
This paper presents a new nonstationary iterative method for solving non linear algebraic equations ...
The convergence of new second-order iterative methods are analyzed in Banach spaces by introducing a...
AbstractA new two-point iteration of order three is introduced to approximate a solution of a nonlin...
Two new semilocal convergence results of Newton-Kantorovich type are presented for the Halley method...
In this paper we use a one-parametric family of second-order iterations to solve a nonlinear operato...