Title of article :
A coincidence-point problem of Perov type on rectangular cone metric spaces
Author/Authors :
Tchier ، Fairouz - King Saud University , Vetro ، Calogero - University of Palermo , Vetro ، Francesca - University of Palermo
Abstract :
We consider a coincidence-point problem in the setting of rectangular cone metric spaces. Using α-admissible mappings and following Perov’s approach, we establish some existence and uniqueness results for two self-mappings. Under a compatibility assumption, we also solve a common fixed-point problem.
Keywords :
Rectangular cone metric space , spectral radius , solid cone , g , contraction of Perov type , α , admissible mapping , α , g , contraction of Perov type
Journal title :
Journal of Nonlinear Science and Applications
Journal title :
Journal of Nonlinear Science and Applications
