In this paper, we introduce the notions of T-cyclic (α, β, H, F)-contractive mappings using a pair (F, h)-upper class functions type in order to obtain new common fixed point results in the settings of metric spaces. The presented results generalize and extend existing results in the literature.
- Common fixed point
- Pair (F,H)-upper class
- Point of coincidence
- T-cyclic (α, β)-admissible mapping
- T-cyclic (α,β,H,F)-contractive mappings