Common Fixed Point Results for Rational (α,β)φ-mω Contractions in Complete Quasi Metric Spaces

Qawasmeh, Tariq; Shatanawi, Wasfı; Bataihah, Anwar; Tallafha, Abdalla

doi:10.3390/math7050392

Cited by 5 publications

(3 citation statements)

References 22 publications

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“…The theorem of Banach asserts the existence and uniqueness of fixed point for any contraction mapping on a complete metric space. Then after, many researchers generalized the result of Banach in two directions; some of them by replacing the frame of distance space (for example see [2]- [16]), and the others by improving the contraction condition (for example see [17]- [30]). In this manuscript, we consider the following notations: W is a non empty set, R the set of all real numbers, N the set of all natural numbers and G the set of all fixed point for a self mapping g : W → W .…”

Section: Introduction and Mathematical Preliminariesmentioning

confidence: 99%

A new contraction based on ℋ-simulation functions in the frame of extended b-metric spaces and application

Qawasmeh

Hatamleh

2023

IJECE

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The conceptions of b-metric spaces and metric spaces play a remarkable role in proving many theorems of uniqueness and existence solution of such equations as integral or differential equations. The conception of extended b-metric spaces is considered as a generalization concept of b-metric spaces and metric spaces and this concept was employed to unify some new fixed point results in the literature. On the other hand, a new concept of simulation functions founded in 2020 in the name of ℋ-simulation functions and employed this class of functions to unify some fixed point results in the literature. The main objective of this manuscript, is to establish a new contraction namely, (γ, ϕ, θ) ℋ-contraction, this contraction based on the concepts of extended b-metric spaces and the class of functions (ℋ-simulation functions) and the class of functions Θ-functions and the class of functions Φ-functions, We utilize this new contraction to unify the uniqueness and existence of fixed point results in the literature. In addition, some illustrative examples and an interesting application were established to show the novelty of our work.

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Section: Introduction and Mathematical Preliminariesmentioning

confidence: 99%

A new contraction based on ℋ-simulation functions in the frame of extended b-metric spaces and application

Qawasmeh

Hatamleh

2023

IJECE

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“…Te result of Banach [1] is considered a principle in the theory of the fxed point. After that, many generalizations of this result were obtained by many researchers, see [2][3][4][5][6][7][8][9][10][11][12][13][14][15][16][17][18][19][20]. For example, Berinde [21] introduced the weak contraction as follows.…”

Section: Introductionmentioning

confidence: 99%

N^th Composite Iterative Scheme via Weak Contractions with Application

Qawasmeh,

Bataihah,

Bataihah

et al. 2023

International Journal of Mathematics and Mathematical Sciences

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The main goal of this study is to formulate an effective iterative scheme, namely, an n t h − composite iterative scheme for approximating the fixed point of a self-map T : U ⟶ U with weak contraction property. We show that the n t h − composite iterative scheme is faster than the scheme obtained by Sintunavarat–Pitea’s iterative scheme. We present some examples using the MATLAB simulator to illustrate our results. Finally, we approximate the solution of some integral equations using our scheme and the Sintunavarat–Pitea scheme.

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“…In [20], Samet et al introduced the concept of α-admissible mappings, and proved fixed point theorems for α-ψ contractive-type mappings, which paved a way to prove new results and generalise existing results in the fixed point theory. For some recent results on fixed point theorems of α-admissible mappings, the reader may refer to [21][22][23][24].…”

Section: Introductionmentioning

confidence: 99%

(C , Ψ * , G ) Class of Contractions and Fixed Points in a Metric Space Endowed with a Graph

George

Tamrakar

Vujaković³

et al. 2019

Mathematics

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In this paper, we introduce the ( C , Ψ * , G ) class of contraction mappings using C-class functions and some improved control functions for a pair of set valued mappings as well as a pair of single-valued mappings, and prove common fixed point theorems for such mappings in a metric space endowed with a graph. Our results unify and generalize many important fixed point results existing in literature. As an application of our main result, we have derived fixed point theorems for a pair of α -admissible set valued mappings in a metric space.

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Common Fixed Point Results for Rational (α,β)φ-mω Contractions in Complete Quasi Metric Spaces

Cited by 5 publications

References 22 publications

A new contraction based on ℋ-simulation functions in the frame of extended <em>b</em>-metric spaces and application

A new contraction based on ℋ-simulation functions in the frame of extended <em>b</em>-metric spaces and application

N^th Composite Iterative Scheme via Weak Contractions with Application

(C , Ψ * , G ) Class of Contractions and Fixed Points in a Metric Space Endowed with a Graph

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Common Fixed Point Results for Rational (α,β)φ-mω Contractions in Complete Quasi Metric Spaces

Cited by 5 publications

References 22 publications

A new contraction based on ℋ-simulation functions in the frame of extended <em>b</em>-metric spaces and application

A new contraction based on ℋ-simulation functions in the frame of extended <em>b</em>-metric spaces and application

Nth Composite Iterative Scheme via Weak Contractions with Application

(C , Ψ * , G ) Class of Contractions and Fixed Points in a Metric Space Endowed with a Graph

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Product

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N^th Composite Iterative Scheme via Weak Contractions with Application