Аннотация:
The aim of this paper is to prove some existence and uniqueness results of the fixed points for Hardy–Rogers type contraction in cone metric spaces associated with a $c$-distance and endowed with a graph. These results prepare a more general statement, since we apply the condition of orbitally $G$-continuity of mapping instead of the condition of continuity, and consider cone metric spaces endowed with a graph instead of cone metric spaces.