Common fixed point results for Boyd-Wong and Meir-Keeler contraction in F-Metric spaces
A new notion of metric space generalization has been defined by Jleli and Samet, namely F-metric space, in 2018. The objective of this study is to prove the existence and uniqueness of a common fixed point in the context of F-metric space. We construct theorems of a common fixed point for commuting...
保存先:
| 主要な著者: | , |
|---|---|
| フォーマット: | 論文 |
| 言語: | English |
| 出版事項: |
Penerbit Universiti Kebangsaan Malaysia
2023
|
| オンライン・アクセス: | http://journalarticle.ukm.my/23302/1/Paper11.pdf http://journalarticle.ukm.my/23302/ http://www.ukm.my/jqma |
| タグ: |
タグ追加
タグなし, このレコードへの初めてのタグを付けませんか!
|
| 要約: | A new notion of metric space generalization has been defined by Jleli and Samet, namely F-metric space, in 2018. The objective of this study is to prove the existence and uniqueness of a common fixed point in the context of F-metric space. We construct theorems of a common fixed point for commuting mapping pairs with Boyd-Wong and Meir-Keeler contraction in this space. Moreover, we extend the results of Park and Bae (1981) and Bera et al. (2022) to common fixed point theorems and F-metric space, respectively. The Boyd-Wong contraction is attractive to discuss since we cannot apply the metrizability result on the F-metric space to prove the theorem. The Meir-Keeler contraction is also interesting since it is a generalization of the Boyd-Wong contraction. Lastly, we provide an example of each case to support the findings of our study. |
|---|