MULTIVALUED COUPLED COINCIDENCE POINT RESULTS IN METRIC SPACES
B. S. Choudhury, N. Metiya, S. Kundu
Abstract
In this paper, we use an inequality involving a coupled multivalued mapping and a singlevalued mapping to obtain a
coupled coincidence point theorem. We discuss special conditions under which coupled common fixed point theorems are obtained.
The result combines several ideas prevalent in fixed point theory studies. There are several corollaries and illustrative examples.
The Hausdorff-Pompeiu metric between sets is used. The work is in the context of metric spaces and is a part of set-valued analysis
with the singlevalued consequences.