Fixed point theorem satisfying cyclical conditions in b-Menger spaces

[1] Banach S., Sur les opérations dans les ensembles abstraits et leur applications aux équations intégrales. Fundam. Maths. 3, 133-181(1922)Search in Google Scholar

[2] Cirić L., Solving the Banach fixed point principle for nonlinear contractions in probabilistic metric spaces, Nonlinear Analysis 72 (2010) 2009-2018.10.1016/j.na.2009.10.001Search in Google Scholar

[3] Kirk W. A., Srinivasan P. S., Veeramani, Fixed points for mappings satisfying cyclical contractive conditions. Fixed Point Theory, volume 4, No. 1, 2003, 79-89.Search in Google Scholar

[4] Mbarki A., Oubrahim R., Probabilistic b-metric spaces and nonlinear contractions. Fixed Point Theory and Applications (2017) 2017:2910.1186/s13663-017-0624-xSearch in Google Scholar

[5] Mbarki A., Oubrahim R., Cyclical contractive conditions in probabilistic metric spaces. Advances in Science, Technology and Engineering System Journal. Vol. 2, No. 5, 100-103 (2017).Search in Google Scholar

[6] Menger K., Statistical metrics, Proc. Natl. Acad. Sci. 28 (1942), 535-537.10.1073/pnas.28.12.535107853416588583Search in Google Scholar

[7] Schweizer B. and Sklar A., Probabilistic Metric Spaces, North-Holland Series in Probability and Applied Mathimatics, 5, (1983).Search in Google Scholar

[8] Sehgal V. M., and Bharucha-Reid A. T., Fixed points of contractions mappings on probabilistic metric spaces, Math. Systemes Theory, 6 (1972), 97-102.10.1007/BF01706080Search in Google Scholar

[9] Shen Y.H., Qiu D., Chen W., Fixed point for cyclic φ-contractions in fuzzy metric spaces. Iranian Journal of Fuzzy Systems Vol. 10, No. 4,(2013) pp 125-133.10.1186/1687-1812-2013-133Search in Google Scholar