An extension of Lakzian-Rhoades results in the structure of ordered b-metric spaces via wt-distance with an application
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摘要
In this present article, we establish two new kinds of nonlinear contraction mappings to obtain fixed point results in the structure of ordered b - metric space via wt-distance. In fact, our presented results are extensions of recent theorems due to Lakzian-Rhoades [2019. Appl. Math. Comput.] and other existing classical results of fixed point theory. Furthermore, we provide examples to show the validity of our new investigations. As an application we apply our new findings to obtain solution of a matrix equation. Finally, we verify the accuracy of our new results numerically.
论文关键词:wt−distance,Coincidence point,b−metric space,Meir - Keeler function,Contractive mapping,Matrix equation
论文评审过程:Received 3 July 2019, Revised 11 January 2020, Accepted 1 March 2020, Available online 30 March 2020, Version of Record 30 March 2020.
论文官网地址:https://doi.org/10.1016/j.amc.2020.125197