In this paper, by using of Suzuki-type approach [Suzuki, T., A generalized Banach contraction principle that characterizes metric completeness, Proc. Amer. Math. Soc., 136, 1861–1869, 2008.] we prove new type of Suzuki- type fixed point theorem for non-Archimedean S - fuzzy metric spaces which is generalization of Suzuki-Type fixed point results in S - metric spaces.
In this paper, we present a common tripled fixed point theorem for weakly compatible mappings under ϕ-contractive condition in M-fuzzy metric spaces. The result generalizes, extends and improves several classical and very recent related results of Sedghi, Altun and Shobe.
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 consider generalized fuzzy metric spaces and provide existence and uniqueness fixed point results. First, we use compatible maps of type (β) to prove fixed point results, then we introduce weakly compatible maps to approximate common fixed point results by using an implicit relation.
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