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Fixed points of non-linear set-valued $ \left(\alpha _{\ast }, \phi _{M}\right) $-contraction mappings and related applications

  • Received: 12 December 2021 Revised: 02 February 2022 Accepted: 11 February 2022 Published: 04 March 2022
  • MSC : 47H10, 54H25

  • The aim of this manuscript is to prove some fixed point results for non-linear set-valued maps with new approach of $ \left(\alpha _{\ast }, \phi _{M}\right) $-contraction in complete $ M $-metric space. Also, we prove some fixed point results in ordered $ M $-metric space. As an presented work which are the extension and improves the current study of set-valued mappings. Finally, we also give an non-trivial extensive examples and application to homotopy theory and the existence solution of functional equations to show that our concepts are meaningful and to support our results.

    Citation: Muhammad Tariq, Mujahid Abbas, Aftab Hussain, Muhammad Arshad, Amjad Ali, Hamid Al-Sulami. Fixed points of non-linear set-valued $ \left(\alpha _{\ast }, \phi _{M}\right) $-contraction mappings and related applications[J]. AIMS Mathematics, 2022, 7(5): 8861-8878. doi: 10.3934/math.2022494

    Related Papers:

  • The aim of this manuscript is to prove some fixed point results for non-linear set-valued maps with new approach of $ \left(\alpha _{\ast }, \phi _{M}\right) $-contraction in complete $ M $-metric space. Also, we prove some fixed point results in ordered $ M $-metric space. As an presented work which are the extension and improves the current study of set-valued mappings. Finally, we also give an non-trivial extensive examples and application to homotopy theory and the existence solution of functional equations to show that our concepts are meaningful and to support our results.



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