AbstractIn this paper, we introduce a new condition namely: condition (W.C.C.) and utilize the same to prove a Suzuki type unique common fixed point theorem for two hybrid pairs of mappings in partial metric spaces employing the partial Hausdorff metric which generalizes several known results of the existing literature proved in metric and partial metric spaces.
AbstractIn this paper, we present a common fixed point theorem by altering distances for a contractive condition of integral type in partial metric spaces.
In this paper, we prove a common fixed point theorem for two self-mappings
satisfying certain conditions over the class of partial metric spaces. In
particular, the main theorem of this manuscript extends some well-known
fixed point theorems in the literature on this topic.