Abstract
Based on quadratically convergent Schroder's method, we derive many new interesting families of fourth-order multipoint iterative methods without memory for obtaining simple roots of nonlinear equations by using the weight function approach. The classical King's family of fourth-order methods and Traub-Ostrowski's method are obtained as special cases. According to the Kung-Traub conjecture, these methods have the maximal efficiency index because only three functional values are needed per step. Therefore, the fourth-order family of King's family and Traub-Ostrowski'smethod are the main findings of the present work. The performance of proposed multipoint methods is compared with their closest competitors, namely, King's family, Traub-Ostrowski's method, and Jarratt's method in a series of numerical experiments. All the methods considered here are found to be effective and comparable to the similar robust methods available in the literature.