- Proceedings of International Mathematical Sciences
- Volume:6 Issue:1
- Fixed Point Theorems for Contravariant Maps in Bipolar b-Metric Spaces with Integration Application
Fixed Point Theorems for Contravariant Maps in Bipolar b-Metric Spaces with Integration Application
Authors : Shaban Sedghi, Merryam Sımkha, Utku Gürdal, Ali Mutlu
Pages : 29-43
Doi:10.47086/pims.1442731
View : 36 | Download : 47
Publication Date : 2024-06-30
Article Type : Research Paper
Abstract :As a natural extension of the metric and the bipolar metric, this article introduces the new abstract bipolar $b-$ metric. The bipolar $b-$metric is a novel technique addressed in this article; it is explained by combining the well-known $b-$metric in the theory of metric spaces, as defined by Mutlu and G\\\"{u}rdal (2016) \\cite{mg1}, with the description of the bipolar metric. In this new definition, well-known mathematical terms such as Cauchy and convergent sequences are utilized. In the bipolar $b-$metric, fundamental topological concepts are also defined to investigate the existence of fixed points implicated in such mappings under different contraction conditions. An example is provided to demonstrate the presented results.Keywords : bipolar b metric space, complete b metric space, Fixed point theory
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