An Enhanced Darbo-Type Fixed Point Theorems and Application to Integral Equations

Authors

  • Suhas Talekar Thakur College of Science and Commerce, Mumbai, Maharashtra, India Author
  • Dadasaheb Arekar K.B.P. Mahavidyalaya, Pandharpur, Maharashtra, India Author
  • Vishal Nikam Arts Commerce and Science College Onde Vikramgad, Palghar, Maharashtra, India Author
  • Kuldeep Kandwal Thakur College of Science and Commerce, Mumbai, Maharashtra, India Author

DOI:

https://doi.org/10.32628/IJSRST24116165

Keywords:

Generalized Operator, Existence Theory, Integral Equations, Differential Equations, Measure of Noncompactness, Banach Spaces, Functional Equations, Mathematical Structures, Solution Guarantees, Theoretical Mathematics

Abstract

This manuscript introduces a generalized operator and presents new Darbo-type fixed point theorems pivotal in the existence theory of integral and differential equations. The significance of these theorems lies in their ability to provide conditions under which solutions to complex mathematical problems can be guaranteed. We establish our results by employing the measure of noncompactness within the context of Banach spaces, a framework that allows for a comprehensive analysis of functional equations. Our findings extend existing Darbo-type fixed point theorems and offer a deeper understanding of the underlying mathematical structures. By generalizing these results, we contribute to the broader field of fixed-point theory, enhancing its applicability to various mathematical disciplines. The implications of our work are substantial, as they facilitate the development of new methods for solving integral and differential equations that arise in both theoretical and applied contexts.

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Author Biography

  • Dadasaheb Arekar, K.B.P. Mahavidyalaya, Pandharpur, Maharashtra, India
    •  

References

REFERENCES

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Banaś, Józef, Mohamed Jleli, Mohammad Mursaleen, Bessem Samet, and Calogero Vetro, eds. Advances in nonlinear analysis via the concept of measure of noncompactness. Singapore: Springer Singapore, 2017. DOI: https://doi.org/10.1007/978-981-10-3722-1

Nikam, V., Shukla, A. K., & Gopal, D. (2024). Existence of a system of fractional order differential equations via generalized contraction mapping in partially ordered Banach space. International Journal of Dynamics and Control, 12(1), 125-135. DOI: https://doi.org/10.1007/s40435-023-01245-y

Sumalai, P., Nikam, V., Shukla, A. K., Gopal, D., & Khaofong, C. (2024). Solution of system of delay differential equations via new darbo type fixed point theorem in partially ordered banach space. Computational and Applied Mathematics, 43(5), 273. DOI: https://doi.org/10.1007/s40314-024-02735-1

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Published

15-11-2024

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Section

Research Articles

How to Cite

An Enhanced Darbo-Type Fixed Point Theorems and Application to Integral Equations. (2024). International Journal of Scientific Research in Science and Technology, 11(6), 120-130. https://doi.org/10.32628/IJSRST24116165

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