AbstractWe analyse the classical third-order methods (Chebyshev, Halley, super-Halley) to solve a nonlnnear equation F(x) = 0, where F is an operator defined between two Banach spaces. Until now the convergence of these methods is established assuming that the second derivative F″ satisfies a Lipschitz condition. In this paper we prove, by using recurrence relations, the convergence of these and other third-order methods just assuming F″ is bounded. We show examples where our conditions are fulfilled and the classical ones fail
The geometrical interpretation of a family of higher order iterative methods for solving nonlinear s...
AbstractIn this paper, we extend to Banach spaces the result given by Gander in (Amer. Math. Monthly...
AbstractA new two-point iteration of order three is introduced to approximate a solution of a nonlin...
AbstractWe analyse the classical third-order methods (Chebyshev, Halley, super-Halley) to solve a no...
AbstractA modification of classical third-order methods is proposed. The main advantage of these met...
AbstractThe convergence of iterative methods for solving nonlinear operator equations in Banach spac...
AbstractNew conditions on the convergence of the Chebyshev method in Banach spaces are stated by usi...
AbstractA modification of some classical third order methods is studied. The main advantage of these...
AbstractThis paper deals with a third order Stirling-like method used for finding fixed points of no...
The aim of this paper is to discuss the convergence of a third order method for solving nonlinear eq...
In this paper, we use a one-parametric family of second-order iterations to solve a nonlinear operat...
AbstractWe introduce a new two-step method to approximate a solution of a nonlinear operator equatio...
AbstractIn this paper we give sufficient conditions in order to assure the convergence of the super-...
AbstractThe geometrical interpretation of a family of higher order iterative methods for solving non...
A large number of problems in applied mathematics and engineering are solved by finding the solution...
The geometrical interpretation of a family of higher order iterative methods for solving nonlinear s...
AbstractIn this paper, we extend to Banach spaces the result given by Gander in (Amer. Math. Monthly...
AbstractA new two-point iteration of order three is introduced to approximate a solution of a nonlin...
AbstractWe analyse the classical third-order methods (Chebyshev, Halley, super-Halley) to solve a no...
AbstractA modification of classical third-order methods is proposed. The main advantage of these met...
AbstractThe convergence of iterative methods for solving nonlinear operator equations in Banach spac...
AbstractNew conditions on the convergence of the Chebyshev method in Banach spaces are stated by usi...
AbstractA modification of some classical third order methods is studied. The main advantage of these...
AbstractThis paper deals with a third order Stirling-like method used for finding fixed points of no...
The aim of this paper is to discuss the convergence of a third order method for solving nonlinear eq...
In this paper, we use a one-parametric family of second-order iterations to solve a nonlinear operat...
AbstractWe introduce a new two-step method to approximate a solution of a nonlinear operator equatio...
AbstractIn this paper we give sufficient conditions in order to assure the convergence of the super-...
AbstractThe geometrical interpretation of a family of higher order iterative methods for solving non...
A large number of problems in applied mathematics and engineering are solved by finding the solution...
The geometrical interpretation of a family of higher order iterative methods for solving nonlinear s...
AbstractIn this paper, we extend to Banach spaces the result given by Gander in (Amer. Math. Monthly...
AbstractA new two-point iteration of order three is introduced to approximate a solution of a nonlin...