AbstractIn this paper, we present some variants of Cauchy's method for solving non-linear equations. Analysis of convergence shows that the methods have fourth-order convergence. Per iteration the new methods cost almost the same as Cauchy's method. Numerical results show that the methods can compete with Cauchy's method
AbstractWe extend to n-dimensional case a known multi-point family of iterative methods for solving ...
AbstractThis paper concentrates on iterative methods for obtaining the multiple roots of nonlinear e...
This paper is partially supported by project ISM-4 of Department for Scientific Research, “Paisii Hi...
AbstractIn this paper, we present a new modification of Newton's method for solving non-linear equat...
AbstractIn this paper, we present some new modifications of Newton's method for solving non-linear e...
AbstractIn this paper a zero-finding technique for solving nonlinear equations more efficiently than...
AbstractIn [YoonMee Ham etal., Some higher-order modifications of Newton’s method for solving nonlin...
In this paper, we consider iterative methods to find a simple root of a nonlinear equation f(x) = 0,...
AbstractWe suggest an improvement to the iteration of Cauchy's method viewed as a generalization of ...
AbstractAn improved method for the order of convergence of iterative formulas of order two is given....
AbstractIn this paper, we consider a geometric construction for improving the order of convergence o...
Abstract: In this report, we presented three high-order iterative methods for solving nonlinear equa...
Recently, there has been progress in developing Newton-type methods with higher convergence to solve...
AbstractIn this paper, we present some variants of Cauchy's method for solving non-linear equations....
AbstractA two-step derivative-free iterative algorithm is presented for solving nonlinear equations....
AbstractWe extend to n-dimensional case a known multi-point family of iterative methods for solving ...
AbstractThis paper concentrates on iterative methods for obtaining the multiple roots of nonlinear e...
This paper is partially supported by project ISM-4 of Department for Scientific Research, “Paisii Hi...
AbstractIn this paper, we present a new modification of Newton's method for solving non-linear equat...
AbstractIn this paper, we present some new modifications of Newton's method for solving non-linear e...
AbstractIn this paper a zero-finding technique for solving nonlinear equations more efficiently than...
AbstractIn [YoonMee Ham etal., Some higher-order modifications of Newton’s method for solving nonlin...
In this paper, we consider iterative methods to find a simple root of a nonlinear equation f(x) = 0,...
AbstractWe suggest an improvement to the iteration of Cauchy's method viewed as a generalization of ...
AbstractAn improved method for the order of convergence of iterative formulas of order two is given....
AbstractIn this paper, we consider a geometric construction for improving the order of convergence o...
Abstract: In this report, we presented three high-order iterative methods for solving nonlinear equa...
Recently, there has been progress in developing Newton-type methods with higher convergence to solve...
AbstractIn this paper, we present some variants of Cauchy's method for solving non-linear equations....
AbstractA two-step derivative-free iterative algorithm is presented for solving nonlinear equations....
AbstractWe extend to n-dimensional case a known multi-point family of iterative methods for solving ...
AbstractThis paper concentrates on iterative methods for obtaining the multiple roots of nonlinear e...
This paper is partially supported by project ISM-4 of Department for Scientific Research, “Paisii Hi...