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Some fixed point results based on contractions of new types for extended $ b $-metric spaces

Wasfı Shatanawi, Taqi A. M. Shatnawi

2023AIMS Mathematics18 citationsDOIOpen Access PDF

Abstract

<abstract><p>The construction of contraction conditions plays an important role in science for formulating new findings in fixed point theories of mappings under a set of specific conditions. The aim of this work is to take advantage of the idea of extended $ b $-metric spaces in the sense introduced by Kamran et al. [A generalization of $ b $-metric space and some fixed point theorems, <italic>Mathematics</italic>, <bold>5</bold> (2017), 1–7] to construct new contraction conditions to obtain new results related to fixed points. Our results enrich and extend some known results from $ b $-metric spaces to extended b-metric spaces. We construct some examples to show the usefulness of our results. Also, we provide some applications to support our results.</p></abstract>

Topics & Concepts

Metric spaceMathematicsFixed pointGeneralizationContraction (grammar)Discrete mathematicsFixed-point theoremConstruct (python library)Metric (unit)Pure mathematicsComputer scienceMathematical analysisOperations managementProgramming languageEconomicsInternal medicineMedicineFixed Point Theorems Analysis
Some fixed point results based on contractions of new types for extended $ b $-metric spaces | Litcius