Suzuki-Type of Common Fixed Point Theorems in S-Fuzzy Metric Spaces

Abstract: 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.

“…Ishtiaq et al [15] introduced the concept of orthogonal neutrosophic metric spaces and proved several interesting fixed point results in the context of orthogonal neutrosophic metric spaces. Jeyaraman and Sowndrarajan [16] used contraction mappings to prove various common fixed point results in the context of neutrosophic metric spaces. Şahin et al [17] introduced the notion of neutrosophic triple partial metric spaces and proved some fixed point results.…”

On Neutrosophic 2-Metric Spaces with Application

“…Ishtiaq et al [15] introduced the concept of orthogonal neutrosophic metric spaces and proved several interesting fixed point results in the context of orthogonal neutrosophic metric spaces. Jeyaraman and Sowndrarajan [16] used contraction mappings to prove various common fixed point results in the context of neutrosophic metric spaces. Şahin et al [17] introduced the notion of neutrosophic triple partial metric spaces and proved some fixed point results.…”

On Neutrosophic 2-Metric Spaces with Application