On some fixed point theorems for multivalued F-contractions in partial metric space
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De Gruyter Open Access
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Full Text Article. Also Available at: https://www.degruyter.com/document/doi/10.1515/dema-2021-0012/html
Altun et al. explored the existence of fixed points for multivalued F-contractions and proved some fixed point theorems in complete metric spaces. This paper extended the results of Altun et al. in partial metric spaces and proved fixed point theorems for multivalued F-contraction mappings. Some illustrative examples are provided to support our results. Moreover, an application for the existence of a solution of an integral equation is also enunciated, showing the materiality of the obtained results.
Altun et al. explored the existence of fixed points for multivalued F-contractions and proved some fixed point theorems in complete metric spaces. This paper extended the results of Altun et al. in partial metric spaces and proved fixed point theorems for multivalued F-contraction mappings. Some illustrative examples are provided to support our results. Moreover, an application for the existence of a solution of an integral equation is also enunciated, showing the materiality of the obtained results.
Keywords
Fixed points, F-contractions, Metric spaces, Integral equation, Multivalued F-contraction mappings, Partial metric spaces