Let ∅≠Ŕ,Ś be subsets of a partial metric space (Ω,ϑ) and Ψ:Ŕ→Ś mapping. If Ŕ∩Ś=∅, it cannot have solution equation Ψς=ς for some ς∈Ŕ. Hence, is sensible to investigate if there point ἣ satisfying ϑ(ἣ,Ψἣ)=ϑ(Ŕ,Ś) which called best proximity point. In this paper, we first introduce concept Hausdorff cyclic mapping pair. Then, revise the definition 0-boundedly compact on spaces. After that, give re...

In this paper, we introduce two new concepts of Feng-Liu type multivalued contraction mapping and cyclic mapping. Then, obtain some best proximity point results for such mappings on partial metric spaces by considering Feng-Liu's technique. Finally, provide examples to show the effectiveness our results.