Strong coupled fixed point results in fuzzy cone metric spaces
Nafea, A., Kishka, Z., Hammad, H., Rashwan., R. (2022). Strong coupled fixed point results in fuzzy cone metric spaces. EKB Journal Management System, 7(3), 1-10. doi: 10.21608/sjsci.2022.247698
Ahmed Nafea; Zenhom Kishka; Hasanen. A. Hammad; Rashwan A. Rashwan.. "Strong coupled fixed point results in fuzzy cone metric spaces". EKB Journal Management System, 7, 3, 2022, 1-10. doi: 10.21608/sjsci.2022.247698
Nafea, A., Kishka, Z., Hammad, H., Rashwan., R. (2022). 'Strong coupled fixed point results in fuzzy cone metric spaces', EKB Journal Management System, 7(3), pp. 1-10. doi: 10.21608/sjsci.2022.247698
Nafea, A., Kishka, Z., Hammad, H., Rashwan., R. Strong coupled fixed point results in fuzzy cone metric spaces. EKB Journal Management System, 2022; 7(3): 1-10. doi: 10.21608/sjsci.2022.247698

Strong coupled fixed point results in fuzzy cone metric spaces

Sohag Journal of Sciences
Article 1, Volume 7, Issue 3, September 2022, Page 1-10  XML PDF (180.62 K)
Document Type: Regular Articles
DOI: 10.21608/sjsci.2022.247698
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Authors
Ahmed Nafea email orcid 1; Zenhom Kishka1; Hasanen. A. Hammad1; Rashwan A. Rashwan.2
1Department of Mathematics, Faculty of Science, Sohag University, Sohag 82524, Egypt.
2Department of Mathematics, Faculty of Science, Assuit University, Assuit 71516, Egypt.
Abstract
Abstract: In this paper, strong coupled fixed point theorems are obtained for coupled Kannan-type contraction mappings in the setting of fuzzy cone metric spaces. Moreover, to support our results, non-trivial examples are given. Our results generalize and extend a lot of papers in the literatures.
References
References
[1] Agarwal, R. P.; Meehan, M.; O’Regan, D.; Fixed point theory and applications, Cambridge University, 2006.
[2] Lan, K.Q.; Wu, J.H.; A fixed-point theorem and applications to problems on sets with convex sections and to Nash
equilibria, Mathematical and Computer Modeling, 2002, 36, 139-145.
[3] Khan, M.S.; Berzig, M.; Chandok, S.; Fixed point theorems in bimetric space endowed with a binary relation and
application, Miskolc Mathematical Notes, 2015, 16(2), 939– 951.
[4] Ben Amar, A.; Jeribi, A.; Mnif, M.; Some fixed point theorems and application to biological model, Numerical
Functional Analysis and Optimization, 2008, 29, 1-23.
[5] Lan, K. Q.; Wu, J. H.; A fixed point theorem and applications to problems on sets with convex sections and
to Nash equilibria, Mathematical and Computer Modeling, 2002, 36, 139-145.
[6] Guran, L.; Mitrovic, Z. D.; Reddy, G. S. M.; Belhenniche, ´A.; Radenovic, S.; Applications of a fixed point result ´
for solving nonlinear fractional and integral differential equations, Fractal Fract., 2021, 5(4), 211.
[7] Kirk, W. A.; Srinivasan, P. S.; Veermani, P.; Fixed points for mappings satisfying cyclic contractive conditions, Fixed
Point Theory, 2003, 4, 79–89.
[8] Lakshmikantham, V.; Ciric, L.; Coupled fixed point theorems for nonlinear contractions in partially ordered
metric spaces, Nonlinear Anal., 2009, 70, 4341–4349.
[9] Choudhury, B. S.; Maity, P.; Cyclic coupled fixed point result using Kannan type contractions, Journal of
Operators, 2014, Article ID 876749.
[10] Eke, K. S.; Olisama, V. O.; Bishop, S. A.; Liu, L.; Some fixed point theorems for convex contractive mappings in
complete metric spaces with applications, Cogent. Math. Stat., 2019, 6, Article ID 1655870.
[11] Luong, N. V.; Thuan, N. X.; Coupled fixed points in partially ordered metric spaces and application, Nonlinear Anal.,
2011, 74, 983-992.
[12] Hammad, H. A.; Albaqeri, D. M.; Rashwan, R. A.; Coupled coincidence point technique and its application for solving
nonlinear integral equations in RPOCbML spaces, J. Egypt. Math. Soc., 2020, 28, Article ID 8.
[13] Berinde, V.; Coupled coincidence point theorems for mixed monotone non linear operators, Computers Mathematics
with Applications, 2012, 64(6), 1770-1777.
[14] Shatanawi, W.; Coupled fixed point theorems in generalized metric spaces, Hacet. J. Math. Stat., 2011, 40, 441–447.
[15] Samet, B.; Vetro, C.; Coupled fixed point F-invariant set and fixed point of N-order, Ann. Funct. Anal., 2010, 2, 46–56.
[16] Bhaskar, T. G.; Lakshmikantham, V.; Fixed point theorems in partially ordered metric spaces and applications,
Nonlinear Anal., TMA., 2006, 65, 1379–1393.
[17] Huang, L.; Zhang, X.; Cone metric spaces and fixed point theorems of contractive mappings, J. Math. Anal. Appl.,
2007, 332, 1468–1476.
[18] Zadeh, L. A.; Fuzzy set, Inform. Control, 1965, 8, 338–353.
[19] Kramosil, O.; Michalek, J.; Fuzzy metric and statistical metric spaces, Kybernetika., 1975, 11, 336–344.
[20] Ilic, D.; Rako ´ cevi ˇ c, V.; Common fixed points for maps on ´cone metric space, Journal of Mathematical Analysis and
Applications, 2008, 341(2), 876–882.
[21] Oner, T.; Kandemire, M. B.; Tanay, B.; Fuzzy cone metric spaces, J. Nonlinear Sci. Appl., 2015, 8, 610–616.
[22] Chen, G. X.; Jabeen, S.; Rehman, S.U. et al.; Coupled fixed point analysis in fuzzy cone metric spaces with an
application to nonlinear integral equations, Advances in Difference Equations, 2020, Article ID 671.

[23] Samet, B.; Vetro, C.; Coupled fixed point F-invariant set and fixed point of N-order, Ann. Funct. Anal., 2010, 2, 46–56.
[24] Kiyani, F.; Amini-Haradi, A.; Fixed point and endpoint theorems for set-valued fuzzy contraction maps in fuzzy metric spaces, Fixed Point Theory Appl., 2011, Article ID 94.
[25] Rashwan, R. A.; Hammad, H. A.; Nafea, A.; A new contribution in fuzzy cone metric spaces by strong fixed
point techniques with supportive application, Journal of Intelligent and Fuzzy Systems, 2022, 42, 3923-3943.
[26] Rehman, S. U.; Li, H. X.; Fixed point theorems in fuzzy cone metric spaces, J. Nonlinear Sci. Appl., 2017, 10, 5763–
5769. 

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