Study of Common Fixed Point Theorems for Interpolative Contraction in Metric Space

Authors

  • Surendra Kumar Tiwari Department of Mathematics, Dr. C. V. Raman University, Bilaspur, India
  • Jayant Prakash Ganvir Department of Mathematics, Dr. C. V. Raman University, Bilaspur, India

DOI:

https://doi.org/10.3126/njmathsci.v5i1.76442

Keywords:

Metric space, Common fixed point, Interpolation, Hardy–Rogers contraction, Reich–Rus–Ciric contraction

Abstract

This paper aims to establish common fixed point results that can be addressed using an interpolative contraction condition proposed by Karapinar et al. [6] and Karapinar et al. [7] within a complete metric space. We have developed both the H-R type contraction and R-R-C–Rus–type contraction in the context of metric spaces, and we have proved related interpolation common fixed point theorem. Furthermore, we provide examples to illustrate the significance of our findings.

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Published

2024-02-19

How to Cite

Tiwari, S. K., & Ganvir, J. P. (2024). Study of Common Fixed Point Theorems for Interpolative Contraction in Metric Space. Nepal Journal of Mathematical Sciences, 5(1), 7–14. https://doi.org/10.3126/njmathsci.v5i1.76442

Issue

Vol. 5 No. 1 (2024)

Section

Articles

License

© School of Mathematical Sciences, Tribhuvan University