This work aims to generalize the Banach contraction theorem to M-fuzzy cone metric spaces. We construct generalized M-fuzzy cone contractive conditions for three self mappings with which they have a unique common fixed point.
In this paper, we introduce the concept of non-Archimedean generalized intuitionistic fuzzy metric space and obtain some results for two semi compatible mappings in this newly defined space. Our results improve and generalize the results of Mustafa et al. [8] and Abbas and Rhoades [1] in non-Archimedean G-fuzzy metric space.
In this paper, we prove the existence and uniqueness of a common fixed point in symmetric generalized intuitionistic fuzzy metric spaces using property (E.A.) or CLRg property. We introduce the new notion for a pair of mappings (f, g) on a generalized intuitionistic fuzzy metric space called weakly commuting of type (J f) and R-weakly commuting of type (J f).
This work defines MM-Fuzzy Cone Metric Space, as a new metric space. It also analyzes possible forms of contractive conditions and groups them accordingly to set up generalized contractive conditions for self-mappings defined over MM-fuzzy cone metric spaces. We prove the existence of fixed points of these mappings and exhibit the same through a suitable example.
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