Common Fixed Point Theorems for Multi-Fuzzy Mappings via Weak Contractive Conditions in MR-Metric Spaces
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Abstract
In this paper, we study common fixed point results for multiple fuzzy mappings in the framework of MR metric spaces. By applying a max-type contractive con-dition, we establish the existence and uniqueness of common fixed points for four and six fuzzy mappings in a complete MR-metric space. Using a cyclic iterative construction together with the Hausdorff MR-metric structure, we prove the con-vergence of the generated sequence and demonstrate that all the mappings admit a unique common fixed point. The proposed results extend and strengthen existing fixed point principles by relaxing contraction assumptions and expanding the the-ory to multi-mapping settings. These findings further advance the development of fixed point theory in generalized metric spaces and provide a broader foundation for applications in fuzzy analysis, optimization, and uncertainty modeling