Javascript must be enabled to continue!

On the convergence, stability and data dependence results of the JK iteration process in Banach spaces

Abstract This article analyzes the JK iteration process with the class of mappings that are essentially endowed with a condition called condition (E). The convergence of the iteration toward a fixed point of a specific mapping satisfying the condition (E) is obtained under some possible mild assumptions. It is worth mentioning that the iteration process JK converges better toward a fixed point compared to some prominent iteration processes in the literature. This fact is confirmed by a numerical example. Furthermore, it has been shown that the iterative scheme JK is stable in the setting of generalized contraction. The data dependence result is also established. Our results are new in the iteration theory and extend some recently announced results of the literature.

Walter de Gruyter GmbH

Kifayat Ullah Naeem Saleem Hazrat Bilal Junaid Ahmad Muhammad Ibrar Fahd Jarad

Open Mathematics

2023

Title: On the convergence, stability and data dependence results of the JK iteration process in Banach spaces

Description:

Abstract This article analyzes the JK iteration process with the class of mappings that are essentially endowed with a condition called condition (E).

The convergence of the iteration toward a fixed point of a specific mapping satisfying the condition (E) is obtained under some possible mild assumptions.

It is worth mentioning that the iteration process JK converges better toward a fixed point compared to some prominent iteration processes in the literature.

This fact is confirmed by a numerical example.

Furthermore, it has been shown that the iterative scheme JK is stable in the setting of generalized contraction.

The data dependence result is also established.

Our results are new in the iteration theory and extend some recently announced results of the literature.

Back

Related Results

Unbounded Star Convergence in Lattices

Let L be a vector lattice, "(" x_α ") " be a L-valued net, and x∈L . If |x_α-x|∧u→┴o 0 for every u ∈〖 L〗_+ then it is said that the net "(" x_α ")" unbounded order converges ...

ECONOMIC ESSENCE OF THE FINANCIAL STABILITY OF THE BANKING SYSTEM

Introduction. The article examines the essence of financial stability and stability of the banking system in order to analyze and understand them. The main approaches to interpreti...

Orthogonal Stability and Solution of a Three-Variable Functional Equation in Extended Banach Spaces

This manuscript introduces a novel three-variable cubic functional equation and derives its general solution. Employing both the direct and fixed-point methods, we investigate the ...

The Bregman–Opial Property and Bregman Generalized Hybrid Maps of Reflexive Banach Spaces

The Opial property of Hilbert spaces is essential in many fixed point theorems of non-expansive maps. While the Opial property does not hold in every Banach space, the Bregman–Opia...

Embedding optimization reveals long-lasting history dependence in neural spiking activity

AbstractInformation processing can leave distinct footprints on the statistics of neural spiking. For example, efficient coding minimizes the statistical dependencies on the spikin...

Asymptotically isometric copies of $\ell^{1\boxplus 0}$

Using James' Distortion Theorems, researchers have inquired relations between spaces containing nice copies of $c_0$ or $\ell^1$ and the failure of the fixed point property for non...

A note on the convergence of Mann iteration

The main result in this note slightly generalizes Theorem 3.4 in [S¸ t. Maruster and I. A. Rus, ˘ Kannan contractions and strongly demicontractive mappings, Creat. Math. Inform., 2...

Applications of Bregman-Opial Property to Bregman Nonspreading Mappings in Banach Spaces

The Opial property of Hilbert spaces and some other special Banach spaces is a powerful tool in establishing fixed point theorems for nonexpansive and, more generally, nonspreading...

Email:
Password:

Email: