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
AbstractNew conditions on the convergence of the Chebyshev method in Banach spaces are stated by usi...
AbstractWe introduce a new two-step method to approximate a solution of a nonlinear operator equatio...
The geometrical interpretation of a family of higher order iterative methods for solving nonlinear s...
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...
AbstractA simplification of a third order iterative method is proposed. The main advantage of this m...
AbstractThe geometrical interpretation of a family of higher order iterative methods for solving non...
AbstractIn this work we study a class of secant-like iterations for solving nonlinear equations in B...
AbstractWe introduce a three-step Chebyshev–Secant-type method (CSTM) with high efficiency index for...
AbstractThe present paper is concerned with the convergence problem of the variants of the Chebyshev...
AbstractThis paper deals with a third order Stirling-like method used for finding fixed points of no...
AbstractWe study an iterative method with order (1+2) for solving nonlinear operator equations in Ba...
AbstractIn this paper we give sufficient conditions in order to assure the convergence of the super-...
We introduce a Derivative Free Method (DFM) for solving nonlinear equations in a Banach space settin...
AbstractNew conditions on the convergence of the Chebyshev method in Banach spaces are stated by usi...
AbstractWe introduce a new two-step method to approximate a solution of a nonlinear operator equatio...
The geometrical interpretation of a family of higher order iterative methods for solving nonlinear s...
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...
AbstractA simplification of a third order iterative method is proposed. The main advantage of this m...
AbstractThe geometrical interpretation of a family of higher order iterative methods for solving non...
AbstractIn this work we study a class of secant-like iterations for solving nonlinear equations in B...
AbstractWe introduce a three-step Chebyshev–Secant-type method (CSTM) with high efficiency index for...
AbstractThe present paper is concerned with the convergence problem of the variants of the Chebyshev...
AbstractThis paper deals with a third order Stirling-like method used for finding fixed points of no...
AbstractWe study an iterative method with order (1+2) for solving nonlinear operator equations in Ba...
AbstractIn this paper we give sufficient conditions in order to assure the convergence of the super-...
We introduce a Derivative Free Method (DFM) for solving nonlinear equations in a Banach space settin...
AbstractNew conditions on the convergence of the Chebyshev method in Banach spaces are stated by usi...
AbstractWe introduce a new two-step method to approximate a solution of a nonlinear operator equatio...
The geometrical interpretation of a family of higher order iterative methods for solving nonlinear s...