An improvement of the Euler-Chebyshev iterative method

An improvement of Chebyshev-Halley methods free from second derivative, Second derivative free sixth order continuation method for solving nonlinear equations with applications, The improvements of Chebyshev-Halley methods with fifth-order convergence, Modified Chebyshev-Halley methods with sixth-order convergence, A variant of Jarratt method with sixth-order convergence, An infinite family of one-step iterators for solving nonlinear equations to increase the order of convergence and a new algorithm of global convergence, Modified Jarratt method with sixth-order convergence, Some variants of Chebyshev-Halley methods with fifth-order convergence, Some new sixth-order methods for solving non-linear equations, On Chebyshev‐type methods free from second derivative, The Fibonacci family of iterative processes for solving nonlinear equations, An improvement of the Jarratt method, On Chebyshev-Halley methods with sixth-order convergence for solving non-linear equations, Some improvements of Jarratt's method with sixth-order convergence, Accelerated iterative methods for finding solutions of a system of nonlinear equations, Sixth-order variants of Chebyshev-Halley methods for solving non-linear equations, A study on the local convergence and complex dynamics of Kou's family of iterative methods, Improvements of the efficiency of some three-step iterative like-Newton methods, A variant of Chebyshev's method with sixth-order convergence, Three novel fifth-order iterative schemes for solving nonlinear equations, A family of fifth-order iterations composed of Newton and third-order methods, Various Newton-type iterative methods for solving nonlinear equations, Zero-finder methods derived using Runge-Kutta techniques, Sixth order derivative free family of iterative methods, Variants of a classic Traub's result, Local convergence of a multi-step high order method with divided differences under hypotheses on the first derivative, 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, On new third-order convergent iterative formulas, On computational efficiency for multi-precision zero-finding methods, Constructing third-order derivative-free iterative methods, A family of second derivative free fourth order continuation method for solving nonlinear equations, On some cubic convergence iterative formulae without derivatives for solving nonlinear equations, Some higher-order modifications of Newton's method for solving nonlinear equations, Some variants of the Chebyshev–Halley family of methods with fifth order of convergence, Some modifications of Newton's method with fifth-order convergence, On the local convergence of a family of two-step iterative methods for solving nonlinear equations, On some computational orders of convergence, Note on a cubically convergent Newton-type method under weak conditions, On the semilocal convergence of damped Newton's method, Improving order and efficiency: Composition with a modified Newton's method, Extending the applicability of the super-Halley-like method using \(\omega\)-continuous derivatives and restricted convergence domains, On new computational local orders of convergence, Some eighth-order root-finding three-step methods, A family of improved Jarratt multipoint methods, A Hummel \& Seebeck family of iterative methods with improved convergence and efficiency, Some sixth-order variants of Ostrowski root-finding methods, A fifth-order iterative method for solving nonlinear equations, ON A CLASS OF EFFICIENT HIGHER ORDER NEWTON-LIKE METHODS, Some sixth order zero-finding variants of Chebyshev-Halley methods, Adams-like techniques for zero-finder methods, Zero-finder methods derived from Obreshkov's techniques, Note on improvements of order and efficiency in some iterative methods for solving nonlinear equations

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• Some efficient methods for enclosing simple zeros of nonlinear equations
• P. L. Chebyshev (1821-1894). A guide to his life and work
• A variant of Cauchy's method with accelerated fifth-order convergence.
• A new iterative method for the computation of the solutions of nonlinear equations