Applications of Multivalued $\mathcal{F}_\delta$-Contraction with Stability Results
Gopal Meena, Deepak Singh, Mudasir Younis, Vishal Joshi
Keywords:
tripled coincidence point, tripled fixed point, Fδ-contraction, stability, matrix equations, integral inculsionsAbstract
The aim of this paper is to propose some new tripled coincidence and tripled fixed point theorems in the natural setting of metric spaces. First, we introduce the notion of multivalued almost $\mathcal{F}_\delta$-contraction endowed with suitable examples. Second, we utilize the established results to derive stability for the tripled coincidence point sets. Final section is devoted to the application part, where we apply our results to establish the existence of solution of matrix equations and integral inclusions so as to demonstrate the materiality and viability of our results, which is further garnished by a numerical experiment.Downloads
Published
2022-06-30
How to Cite
Team, S. (2022). Applications of Multivalued $\mathcal{F}_\delta$-Contraction with Stability Results: Gopal Meena, Deepak Singh, Mudasir Younis, Vishal Joshi. Thai Journal of Mathematics, 20(2), 527–544. Retrieved from https://thaijmath2.in.cmu.ac.th/index.php/thaijmath/article/view/1342
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