Abstract
<jats:p>In this article, we define a generalized concept of pairwise eventually $H$-restrictive multi-valued mappings which is based on the restrictive conditions described in [Symmetry 2020, 12 (1), 127]. We also utilize the concept of $D(\epsilon)$-restrictive mappings to explore the coincidence points of the pair of a continuous single-valued map and an $H$-continuous multi-valued map. Our main results are further applied to deduce their corresponding fuzzy fixed point theorems. The latter technique is in appreciation of the fact that many results from the existing literature on contractive or nonexpansive multifunctions have their fuzzy counterparts. Finally, for the validity of our results, some useful examples are also added.</jats:p>