Local Convergence for an Improved Jarratt-type Method in Banach Space

Abstract: -We present a local convergence analysis for an improved Jarratt-type methods of order at least five to approximate a solution of a nonlinear equation in a Banach space setting. The convergence ball and error estimates are given using hypotheses up to the first Fréchet derivative in contrast to earlier studies using hypotheses up to the third Fréchet derivative. Numerical examples are also provided in this study, where the older hypotheses are not satisfied to solve equations but the new hypotheses are satisfi… Show more

“…Classically, vector spaces are used with other tools like topology, norm, and metric. Different types of convergence have many direct applications like in solving nonlinear equations [16,17]. Whereas, in a series of papers [18][19][20][21][22], the unbounded order convergence is defined for the nets that are not necessarily to be order bounded in Banach lattices, this is a different approach than convergence in norm or topology.…”

The Unbounded Fuzzy Order Convergence in Fuzzy Riesz Spaces

“…Classically, vector spaces are used with other tools like topology, norm, and metric. Different types of convergence have many direct applications like in solving nonlinear equations [16,17]. Whereas, in a series of papers [18][19][20][21][22], the unbounded order convergence is defined for the nets that are not necessarily to be order bounded in Banach lattices, this is a different approach than convergence in norm or topology.…”

The Unbounded Fuzzy Order Convergence in Fuzzy Riesz Spaces

“…Mathematics is always changing and the way we teach it also changes as it is presented in [1,2]. In the literature [3][4][5][6][7][8], we can find many problems in engineering and applied sciences that can be solved by finding solutions of equations in a way such as (1). Finding exact solutions for this type of equation is not easy.…”

Study of a High Order Family: Local Convergence and Dynamics

“…Several iterative methods are used to solve nonlinear equations, the most famous being Newton's method. To improve the order of convergence, many authors have proposed modifications to the Newton formula, obtained by various techniques and with different order of convergence [1][2][3][4][5][6][7][8][9] and references related to higher-order iterative methods [10][11][12]. In addition to the classic iteration schemes, interval methods are also used to solve nonlinear equations.…”

Interval Methods with Fifth Order of Convergence for Solving Nonlinear Scalar Equations