A new method for estimating the real roots of real differentiable functions

Abstract

We introduce a new type of Krasnoselskii's result. Using a simple differentiability condition, we relax the nonexpansive condition in Krasnoselskii's theorem. More clearly, we analyze the convergence of the sequence xn+1=xn+g(xn)2 based on some differentiability condition of g and present some fixed point results. We introduce some iterative sequences that for any real differentiable function g and any starting point x0∈ [a,b] converge monotonically to the nearest root of g in [a,b] that lay to the right or left side of x0. Based on this approach, we present an efficient and novel method for finding the real roots of real functions. We prove that no root will be missed in our method. It is worth mentioning that our iterative method is free from the derivative evaluation which can be regarded as an advantage of this method in comparison with many other methods. Finally, we illustrate our results with some numerical examples.