In this paper, we use the notion of cyclic representation of a nonempty set with respect to a pair of mappings to obtain coincidence points and common fixed points for a pair of…
Abstract
Purpose
In this paper, we use the notion of cyclic representation of a nonempty set with respect to a pair of mappings to obtain coincidence points and common fixed points for a pair of self-mappings satisfying some generalized contraction- type conditions involving a control function in partial metric spaces. Moreover, we provide some examples to analyze and illustrate our main results.
Design/methodology/approach
Theoretical method.
Findings
We establish some coincidence points and common fixed point results in partial metric spaces.
Originality/value
Results of this study are new and interesting.