A two-point eighth-order method based on the weight function for solving nonlinear equations

Abstract: In this work, we have designed a family of with-memory methods with eighth-order convergence. We have used the weight function technique. The proposed methods have three parameters. Three self-accelerating parameters are calculated in each iterative step employing only information from the current and all previous iteration. Numerical experiments are carried out to demonstrate the convergence and the e?ciency of our iterative method.

“…In this section, we examine the performance and the computational efficiency of the newly developed with and without-memory methods discussed in Sections 2 and 3 and compare with some methods of similar nature available in the literature. In particular, we have considered for the comparison the following derivative-free three-parametric methods: FZM 4 (4.1) [15], VTM 4 (28) [16], and SM 4 (4.1) [17], and the following four-parametric methods: AJM 8 [13], ZM 8 ( ZR1 from [18]), and ACM 8 (M1 from [19]).…”

Efficient Families of Multi-Point Iterative Methods and Their Self-Acceleration with Memory for Solving Nonlinear Equations

“…In this section, we examine the performance and the computational efficiency of the newly developed with and without-memory methods discussed in Sections 2 and 3 and compare with some methods of similar nature available in the literature. In particular, we have considered for the comparison the following derivative-free three-parametric methods: FZM 4 (4.1) [15], VTM 4 (28) [16], and SM 4 (4.1) [17], and the following four-parametric methods: AJM 8 [13], ZM 8 ( ZR1 from [18]), and ACM 8 (M1 from [19]).…”

Efficient Families of Multi-Point Iterative Methods and Their Self-Acceleration with Memory for Solving Nonlinear Equations