Coincidence Point Results for Multivalued Suzuki Type Mappings Using θ-Contraction in b-Metric Spaces

Saleem, Naeem; Vujaković, Jelena; Baloch, Wali Ullah; Radenović, Stojan

doi:10.3390/math7111017

Cited by 27 publications

(13 citation statements)

References 30 publications

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“…Since α(q 1 , q 2 ) ≥ 1 and the pair (g, M) satisfy Suzuki-type (α, β, γ g )−modified proximal contraction which implies that H(Mq 1 , Mq 2 ) ≤ α(q 1 , q 2 )H(Mq 1 , Mq 2 ) ≤ γD * (gq 1 , Mq 1 ) + βD * (Mq 1 , gq 2 ), after simplification we have the following (20) = γH(Mq 0 , Mq 1 ).…”

Section: A Mapping M : Q → C B (R)mentioning

confidence: 99%

Some New Results on Coincidence Points for Multivalued Suzuki-Type Mappings in Fairly Complete Spaces

2020

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In this paper, we introduce Suzuki-type ( α , β , γ g ) - generalized and modified proximal contractive mappings. We establish some coincidence and best proximity point results in fairly complete spaces. Also, we provide coincidence and best proximity point results in partially ordered complete metric spaces for Suzuki-type ( α , β , γ g ) - generalized and modified proximal contractive mappings. Furthermore, some examples are presented in each section to elaborate and explain the usability of the obtained results. As an application, we obtain fixed-point results in metric spaces and in partially ordered metric spaces. The results obtained in this article further extend, modify and generalize the various results in the literature.

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Section: A Mapping M : Q → C B (R)mentioning

confidence: 99%

Some New Results on Coincidence Points for Multivalued Suzuki-Type Mappings in Fairly Complete Spaces

2020

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“…For the details, one can refer Corollary 4 and Corollary 7 which are special cases of main theorems. Specifically, in this paper, we will show that there is only one solution F of the general sextic functional equation (4) near the function f , which approximates the functional equation 4by using fixed point theorem [32][33][34][35]. Moreover, the solution mapping F of the functional equation 4can be explicitly constructed by the formula…”

Section: Introductionmentioning

confidence: 99%

The Stability of a General Sextic Functional Equation by Fixed Point Theory

Roh

Lee

Jung

2020

Journal of Function Spaces

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In this paper, we will consider the generalized sextic functional equation ∑ i = 0 7 7 C i − 1 7 − i f x + i y = 0 . And by applying the fixed point theorem in the sense of C a ˘ dariu and Radu, we will discuss the stability of the solutions for this functional equation.

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“…In 1969, Nadler [3] extended the Banach contraction principle to multi-valued mappings. After that, many authors generalized Nadler's result in different ways (see, for instance [4][5][6][7][8]).…”

Section: Introductionmentioning

confidence: 99%

Common Fixed Point and Endpoint Theorems for a Countable Family of Multi-Valued Mappings

et al. 2020

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Coincidence Point Results for Multivalued Suzuki Type Mappings Using θ-Contraction in b-Metric Spaces

Cited by 27 publications

References 30 publications

Some New Results on Coincidence Points for Multivalued Suzuki-Type Mappings in Fairly Complete Spaces

Some New Results on Coincidence Points for Multivalued Suzuki-Type Mappings in Fairly Complete Spaces

The Stability of a General Sextic Functional Equation by Fixed Point Theory

Common Fixed Point and Endpoint Theorems for a Countable Family of Multi-Valued Mappings

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