참고문헌
- Ya I. Alber and S. Guerre-Delabrier, Principles of weakly contractive maps in Hilbert spaces, new results in operator theory, Adv. and Appl., Birkhauser Verlag, Basel 98 (1997), 7-22.
- S. Banach, Sur les operations dans les ensembles abstraits et leur application auxequations integrales, Fundam. Math., 3 (1922), 133-181.
- Kh. Bulbul, N. Priyobarta, Y. Rohren and Th. Indubala, Remarks on (α, β)-Admissible Mappings and Fixed Points under Z-Contraction Mappings, J. Math., 2021 (2021), Article ID 6697739, 10 pages.
- D. Chand and Y. Rohen, Fixed points of αs-βs-ψ-contraction mappings under simulation functions, Nonlinear Funct. Anal. Appl., 28(2) (2023), 571-587.
- S.K. Chatterjea, Fixed point theorems, C. R. Acad. Bulgare Sci., 25 (1972), 727-73
- A. Fulga and E. Karapinar, Some results on S-contractions of type E, Mathematics, 6:195 (2018).
- A. Fulga and A. Proca, A new Generalisation of Wardowski Fixed Point Theorem in Complete Metric Spaces, Adv. Theory Nonlinear Anal. Appl., 1 (2017), 57-63.
- A. Fulga and A. Proca, Fixed points for ϕE-Geraghty contractions, J. Nonlinear Sci. Appl., 10 (2017), 5125-5131.
- R. Kannan, Some results on fixed points, Bull. Calcutta Math. Soc., 60 (1968), 71-76.
- F. Khjasteh, S. Shukla and S. Radenovic, A new approach to the study of fixed point theorems for simulation functions, Filomat 2015, 29, 1189-1194.
- S. Mishra, A.K. Dubey, U. Mishra and H.G. Hyun, Some Fixed Point Theorems for Rational (α, β, z)-Contraction Mappings under Simulation functions and Cyclic (α, β)-admissibility, Nonlinear Funct. Anal. Appl., 27(4) (2022), 757-771.
- M. Pradeep Singh, Y. Rohen, Naeem Saleem, K.H. Alam, K. Anthony Singh and A. Razzaque. On Fixed-Point Equations Involving Geraghty-Type Contractions with Solution to Integral Equation, Mathematics, 2023 (2023):11, 4882.
- N. Priyobarta, Y. Rohen, Th. Stephen and S. Radenovic, Some remarks on α-admissibility in S-metric spaces, J. Ineq. Appl., (2022) 2022:34.
- T. Qawasmeh, H-Simulation Functions and Ωb-Distance Mappings in the Setting of Gb-Metric Spaces and Application, Nonlinear Funct. Anal. Appl., 28(2) (2023), 557-570.
- S. Sedghi, N. Shobe and A. Aliouche, A generalization of fixed point theorems in S-metric spaces, Mat. Vesnik., 64(3) (2012), 258-266.
- D.P. Shukla and S.K. Tiwari, Unique fixed point theorem for weakly S-contractive mappings, Gen. Math. Notes, 4(1) (2011), 28-34.
- T. Stephen and Y. Rohen, Fixed points of generalized rational (α, β, Z)-contraction mappings under simulation functions, J. Math. Comput., Sci., 24 (2022), 345-357.