Fixed Points Results for Various Types of Tricyclic Contractions
Mustapha Sabiri,
Abdelhafid Bassou,
Jamal Mouline,
Taoufik Sabar
Affiliations
Mustapha Sabiri
Laboratory of Algebra, Analysis and Applications (L3A), Departement of Mathematics and Computer Science, Faculty of Sciences Ben M’sik, Hassan II University of Casablanca, Casablanca 20000, Morocco
Abdelhafid Bassou
Laboratory of Algebra, Analysis and Applications (L3A), Departement of Mathematics and Computer Science, Faculty of Sciences Ben M’sik, Hassan II University of Casablanca, Casablanca 20000, Morocco
Jamal Mouline
Laboratory of Algebra, Analysis and Applications (L3A), Departement of Mathematics and Computer Science, Faculty of Sciences Ben M’sik, Hassan II University of Casablanca, Casablanca 20000, Morocco
Taoufik Sabar
Laboratory of Algebra, Analysis and Applications (L3A), Departement of Mathematics and Computer Science, Faculty of Sciences Ben M’sik, Hassan II University of Casablanca, Casablanca 20000, Morocco
In this paper, we introduce four new types of contractions called in this order Kanan-S-type tricyclic contraction, Chattergea-S-type tricyclic contraction, Riech-S-type tricyclic contraction, Cirić-S-type tricyclic contraction, and we prove the existence and uniqueness for a fixed point for each situation.
