Ostrowski type methods for solving systems of nonlinear equations

Numerical analysis of a vortex tube: a review ⋮ Efficient derivative-free numerical methods for solving systems of nonlinear equations ⋮ A new family of iterative methods widening areas of convergence ⋮ An efficient fifth-order method for linear optimization ⋮ An efficient method based on progressive interpolation for solving non-linear equations ⋮ Derivative free iterative methods for nonlinear systems ⋮ On a two-step Kurchatov-type method in Banach space ⋮ An efficient fifth order method for solving systems of nonlinear equations ⋮ Increasing the order of convergence for iterative methods to solve nonlinear systems ⋮ An efficient class of optimal sixteenth-order root-finding methods and their basins of attraction ⋮ A new class of methods with higher order of convergence for solving systems of nonlinear equations ⋮ New techniques to develop higher order iterative methods for systems of nonlinear equations ⋮ Collocation method for solving systems of Fredholm and Volterra integral equations ⋮ A ball comparison between extended modified Jarratt methods under the same set of conditions for solving equations and systems of equations ⋮ Ball convergence of an efficient multi-step scheme for solving equations and systems of equations ⋮ A study of the local convergence of a derivative free method in Banach spaces ⋮ On the complexity of a unified convergence analysis for iterative methods ⋮ Computers in mathematical research: the study of three-point root-finding methods ⋮ A multidimensional generalization of some classes of free-derivative iterative methods to solve nonlinear equations ⋮ A multidimensional generalization of some classes of iterative methods ⋮ Extended local convergence and comparisons for two three-step Jarratt-type methods under the same conditions ⋮ Local convergence of a multi-step high order method with divided differences under hypotheses on the first derivative ⋮ A family of Steffensen type methods with seventh-order convergence ⋮ Design and analysis of a faster King-Werner-type derivative free method ⋮ Improved Newton-like methods for solving systems of nonlinear equations ⋮ A faster King–Werner-type iteration and its convergence analysis ⋮ A family of higher order derivative free methods for nonlinear systems with local convergence analysis ⋮ Solving nondifferentiable nonlinear equations by new Steffensen-type iterative methods with memory ⋮ Newton-like methods with increasing order of convergence and their convergence analysis in Banach space ⋮ Two efficient derivative-free iterative methods for solving nonlinear systems ⋮ A new family of optimal eighth order methods with dynamics for nonlinear equations ⋮ Higher order multi-step iterative method for computing the numerical solution of systems of nonlinear equations: application to nonlinear PDEs and ODEs ⋮ An efficient three-step method to solve system of nonlinear equations ⋮ Achieving higher order of convergence for solving systems of nonlinear equations ⋮ A fast and robust method for computing real roots of nonlinear equations ⋮ On some efficient techniques for solving systems of nonlinear equations ⋮ A simple and efficient method with high order convergence for solving systems of nonlinear equations ⋮ Higher order multi-step Jarratt-like method for solving systems of nonlinear equations: application to PDEs and ODEs ⋮ Efficient Jarratt-like methods for solving systems of nonlinear equations ⋮ Generalized Kung-Traub method and its multi-step iteration in Banach spaces ⋮ Higher-order modification of Steffensen's method for solving system of nonlinear equations ⋮ A fast and efficient composite Newton-Chebyshev method for systems of nonlinear equations ⋮ On some efficient derivative-free iterative methods with memory for solving systems of nonlinear equations ⋮ A new efficient parametric family of iterative methods for solving nonlinear systems ⋮ ON A CLASS OF EFFICIENT HIGHER ORDER NEWTON-LIKE METHODS ⋮ Efficient Family of Sixth-Order Methods for Nonlinear Models with Its Dynamics ⋮ CMMSE: a novel scheme having seventh-order convergence for nonlinear systems ⋮ Unnamed Item ⋮ On Convergence and Efficiency in the Resolution of Systems of Nonlinear Equations from a Local Analysis ⋮ Weaker convergence criteria for Traub's method ⋮ Unnamed Item ⋮ Accelerating the convergence speed of iterative methods for solving nonlinear systems ⋮ Some higher-order iteration functions for solving nonlinear models ⋮ Generalized newton multi-step iterative methods GMN_p,m for solving system of nonlinear equations ⋮ High-order iterations for systems of nonlinear equations

• Unnamed Item
• Unnamed Item
• Unnamed Item
• Unnamed Item
• Unnamed Item
• Frozen divided difference scheme for solving systems of nonlinear equations
• On iterative methods with accelerated convergence for solving systems of nonlinear equations
• On the computational efficiency index and some iterative methods for solving systems of nonlinear equations
• Some eighth-order root-finding three-step methods
• A note on some quadrature based three-step iterative methods for non-linear equations
• Eighth-order methods with high efficiency index for solving nonlinear equations
• On some computational orders of convergence
• Modified Ostrowski's method with eighth-order convergence and high efficiency index
• Some sixth-order variants of Ostrowski root-finding methods
• Three-step iterative methods with eighth-order convergence for solving nonlinear equations
• Some improvements of Ostrowski's method
• Geometric constructions of iterative functions to solve nonlinear equations
• On a higher order secant method.
• A class of quasi-Newton generalized Steffensen methods on Banach spaces
• Secant-like methods for solving nonlinear integral equations of the Hammerstein type
• A family of modified Ostrowski methods with accelerated sixth order convergence
• Some variants of Ostrowski's method with seventh-order convergence
• An improvement to Ostrowski root-finding method
• A Technique to Composite a Modified Newton's Method for Solving Nonlinear Equations
• A sixth-order family of methods for nonlinear equations
• A new family of modified Ostrowski's methods with accelerated eighth order convergence