A Unique Common Fixed Point Theorem for Four Maps under Contractive Conditions in Cone Metric Spaces

Common Fixed Points of Generalized Contractive Maps in Cone Metric Spaces

Common Fixed Point in Cone Metric Space for $mathbf{s}-mathbf{varphi}$-contractive

Huang and Zhang cite{Huang} have introduced the concept of cone metric space where the set of real numbers is replaced by an ordered Banach space. Shojaei cite{shojaei} has obtained points of coincidence and common fixed points for s-Contraction mappings which satisfy generalized contractive type conditions in a complete cone metric space.In this paper, the notion of complete cone metric ...

Unique common coupled fixed point theorem for four maps in $S_b$-metric spaces

In this paper we prove a unique common coupled fixed point theorem for two pairs of $w$-compatible mappings in $S_b$-metric spaces satisfying a contrctive type condition. We furnish an example to support our main theorem. We also give a corollary for Junck type maps.

Common fixed point of four maps in $S_b$-Metric spaces

In this paper is introduced a new type of generalization of metric spaces called $S_b$ metric space. For this new kind of spaces it has been proved a common fixed point theorem for four mappings which satisfy generalized contractive condition. We also present example to confirm our theorem.

A unique common fixed point theorem for six maps in g-metric spaces

In this paper we obtain a unique common xed point theorem for sixweakly compatible mappings in G-metric spaces.