Tripled Coincidence Point Theorem for Compatible Maps in Partially Ordered Metric Spaces

Authors

  • P.P.Murthy, R.M.Kenvat, B. S. Selukar, G. S. Kamble, M. V. Jagtap

DOI:

https://doi.org/10.17762/msea.v70i2.2568

Abstract

The present study introduce the notion of compatibility of maps in partially ordered metric spaces and use this perception to establish a tripled coincidence point result for mixed g-monotone mappings. Our effort extend the recent work of Borcut and Berinde [M. Borcut, V. Berinde, Tripled fixed point theorem for contractive type mappings in partially ordered metric spaces, Nonlinear Anal., Accepted (2011)] and refrences therein. We support the result by establishing an illustrative example.

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Published

2021-12-26

How to Cite

G. S. Kamble, M. V. Jagtap, P. R. B. S. S. . (2021). Tripled Coincidence Point Theorem for Compatible Maps in Partially Ordered Metric Spaces. Mathematical Statistician and Engineering Applications, 70(2), 1952–1960. https://doi.org/10.17762/msea.v70i2.2568

Issue

Vol. 70 No. 2 (2021)

Section

Articles