Coincidence of maps in Q-simplicial spaces
Coincidence point and invariant approximation for mappings satisfying generalized weak contractive condition.
Coincidence point, best approximation, and best proximity theorems for condensing set-valued maps in hyperconvex metric spaces.
Coincidence point theorems for multivalued mappings.
Coincidence point theorems in certain topological spaces
In this paper, we establish some new versions of coincidence point theorems for single-valued and multi-valued mappings in F-type topological space. As applications, we utilize our main theorems to prove coincidence point theorems and fixed point theorems for single-valued and multi-valued mappings in fuzzy metric spaces and probabilistic metric spaces.
Coincidence point theorems in pseudocompact Tichonov spaces.
Coincidence points and maximal elements of multifunctions on convex spaces
Generalized and unified versions of coincidence or maximal element theorems of Fan, Yannelis and Prabhakar, Ha, Sessa, Tarafdar, Rim and Kim, Mehta and Sessa, Kim and Tan are obtained. Our arguments are based on our recent works on a broad class of multifunctions containing composites of acyclic maps defined on convex subsets of Hausdorff topological vector spaces.
Coincidence points and -weakly commuting maps
In this paper we extend the concept of -weak commutativity to the setting of single-valued and multivalued mappings. We also establish a coincidence theorem for pairs of -weakly commuting single-valued and multivalued mappings satisfying a contractive type condition.
Coincidence points for contraction type maps.
Coincidence points for multivalued mappings.
Coincidence points in uniform spaces.
Coincidence points of compatible multivalued mappings.
Coincidence set of minimal surfaces for the thin obstacle.
Coincidence theorems for certain classes of hybrid contractions.
Coincidence theorems for contractive type multivalued mappings.
Coincidence theorems for families of multimaps and their applications to equilibrium problems.
Coincidence theorems for nonlinear hybrid contractions.
Coincidence theorems for set-valued maps with g-kkm property on generalized convex space
In this paper, a set-valued mapping with G-KKM property is defined and a generalization of minimax theorem for set-valued maps with G-KKM property on generalized convex space is established. As a consequence of this results we verify the coincidence theorem for set-valued maps with G-KKM property on G-convex space. Finally, we apply our results to the best approximation problem and fixed point problem.
Coincidence theorems for some multivalued mappings.
Coincidence theorems, generalized variational inequality theorems, and minimax inequality theorems for the -mapping on -convex spaces.