Common Fixed Point for Meir–Keeler Type Contraction in Bipolar Metric Space

Penumarthy Parvateesam Murthy; Chandra Prakash Dhuri; Santosh Kumar; Rajagopalan Ramaswamy; Muhannad Abdullah Saud Alaskar; Stojan Radenovi’c

doi:10.3390/fractalfract6110649

Common Fixed Point for Meir–Keeler Type Contraction in Bipolar Metric Space

Penumarthy Parvateesam Murthy, Chandra Prakash Dhuri, Santosh Kumar, Rajagopalan Ramaswamy, Muhannad Abdullah Saud Alaskar, Stojan Radenovi’c

Mathematics

Research output: Contribution to journal › Article › peer-review

8 Scopus citations

Abstract

In mathematical analysis, the Hausdorff derivatives or the fractal derivatives play an important role. Fixed-point theorems and metric fixed-point theory have varied applications in establishing a unique common solution to differential equations and integral equations. In the present work, some fixed-point theorems using the extension of Meir–Keeler contraction in the setting of bipolar metric spaces have been proved. The derived results have been supplemented with non-trivial examples. Our results extend and generalise the results established in the past. We have provided an application to find an analytical solution to an Integral Equation to supplement the derived result.

Original language	English
Article number	649
Journal	Fractal and Fractional
Volume	6
Issue number	11
DOIs	https://doi.org/10.3390/fractalfract6110649
State	Published - Nov 2022

Keywords

Cauchy bisequence
bipolar metric space
compatible maps
covariant map
fixed points

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title = "Common Fixed Point for Meir–Keeler Type Contraction in Bipolar Metric Space",

abstract = "In mathematical analysis, the Hausdorff derivatives or the fractal derivatives play an important role. Fixed-point theorems and metric fixed-point theory have varied applications in establishing a unique common solution to differential equations and integral equations. In the present work, some fixed-point theorems using the extension of Meir–Keeler contraction in the setting of bipolar metric spaces have been proved. The derived results have been supplemented with non-trivial examples. Our results extend and generalise the results established in the past. We have provided an application to find an analytical solution to an Integral Equation to supplement the derived result.",

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AU - Murthy, Penumarthy Parvateesam

AU - Dhuri, Chandra Prakash

AU - Kumar, Santosh

AU - Ramaswamy, Rajagopalan

AU - Alaskar, Muhannad Abdullah Saud

AU - Radenovi’c, Stojan

PY - 2022/11

Y1 - 2022/11

N2 - In mathematical analysis, the Hausdorff derivatives or the fractal derivatives play an important role. Fixed-point theorems and metric fixed-point theory have varied applications in establishing a unique common solution to differential equations and integral equations. In the present work, some fixed-point theorems using the extension of Meir–Keeler contraction in the setting of bipolar metric spaces have been proved. The derived results have been supplemented with non-trivial examples. Our results extend and generalise the results established in the past. We have provided an application to find an analytical solution to an Integral Equation to supplement the derived result.

AB - In mathematical analysis, the Hausdorff derivatives or the fractal derivatives play an important role. Fixed-point theorems and metric fixed-point theory have varied applications in establishing a unique common solution to differential equations and integral equations. In the present work, some fixed-point theorems using the extension of Meir–Keeler contraction in the setting of bipolar metric spaces have been proved. The derived results have been supplemented with non-trivial examples. Our results extend and generalise the results established in the past. We have provided an application to find an analytical solution to an Integral Equation to supplement the derived result.

KW - Cauchy bisequence

KW - bipolar metric space

KW - compatible maps

KW - covariant map

KW - fixed points

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JF - Fractal and Fractional

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ER -

Common Fixed Point for Meir–Keeler Type Contraction in Bipolar Metric Space

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