Abstract
The aim of this paper is to study the local convergence of the four order iteration of Euler's family for solving nonlinear operatorequations. We get the optimal radius of the local convergence ball of the method for operators satisfying the weak third order generalized Lipschitz condition with L−average. We also show that the local convergence of the method is determined by a period 2 orbit of the method itself applied to a real function. AMS subject classifications: 65H05, 65L20, 65N12, 39B42
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