References
- Aage, C. A., & Salunke, J. N. (2012). Fixed points for weak contraction in G-metric spaces. Applied Mathematics E-Note, 12, 23–28.
- Alber, Y. I., & Guerre-Delabriere, S. (1997). Principles of weakly contractive maps in Hilbert spaces. In I. Gohberg & Y. Lyubich (Eds.), New results in operator theory and its applications, (Vol. 98, pp. 7–22). Birkhuser, Basel.
- Chatterjea, S. K. (1972). Fixed-point theorems, C. R Academic Bulgare Sciences, 25, 727–730.
- Chen, C., & Zhu, C. (2013). Fixed point theorems for weakly C- contractive mappings in partial metric spaces. Fixed Point Theory and Applications, 107, 1687-1812.
- Chi, K. P., Karapinar, E., & Thanh, T. D. (2013). On the fixed point theorems for generalized weakly contractive mappings on partial metric spaces. Bulletin of the Iranian Mathematical Society, 39(2), 369–381.
- Choudhury, B. S. (2009). Unique fixed point theorem for weakly C-contractive mappings. Kathmandu University Journal of Science Engineering and Technical, 5(1), 6–13.
- Eke, K. S. (2016). Fixed point results for generalized weakly C-contractive mappings in ordered G- partial metric spaces. British Journal of Mathematics and Computer Science, 12(1), 1–11. doi:10.9734/BJMCS/2016/18991
- Eke, K. S., Imaga, O. F., & Odetunmibi, O. A. (2017). Convergence and stability of some modified iterative processes for a class of generalized contractive like operators. IAENG International Journal of Computer Science, 44(4), 17.
- Eke, K. S., & Olaleru, J. O. (2013). Some fixed point results on ordered G-partial metric spaces. ICASTOR Journal of Mathematical Sciences, 7(1), 65–78.
- Gairola, U. C., & Krishan, R. (2015). Fixed point theorems for hybrid contraction without continuity. Global Journal of Mathematical Analysis, 3(1), 8–17. doi:10.14419/gjma.v3i1
- Hardy, G. E., & Rogers, T. D. (1973). A generalisation of a fixed point theory of Reich. Canad Mathematical BullVol, 16(2), 201–206. doi:10.4153/CMB-1973-036-0
- Long, H. V., & Dong, N. P. (2018). An extension of Krasnoselskii’s fixed point theorem and its application to nonlocal problems for implicit fractional differential systems with uncertainity. Journal Fixed Point Theory Applications, 20(1), 37. doi:10.1007/s11784-018-0507-8
- Long, H. V., Son, N. T. K., & Hoa, N. V. (2017). Fuzzy fractional partial differential equations in partially ordered metric spaces. Iran Journal Fuzzy Systems, 14(2), 107–126.
- Long, H. V., Son, N. T. K., & Rodriguez-Lopez, R. (2018). Some generalizations of fixed point theorems in partially ordered metric spaces and applications to partial differential equations with uncertainity. Vietnam Journal Mathematical, 46, 531-555.
- Matthews, S. G. (1992). Partial metric spaces, 8th British Colloquium for Theoretical Computer Science. In Research Report 212 (pp. 708–718). Dept. of Computer Science, University of Warwick.
- Mishra, L. N., Tiwari, S. K., Mishra, V. N., & Mishra, V. (2015). Unique fixed point theorems for generalized contractive mappings in partial metric spaces, Journal of Function spaces, 2015, 8, Article ID 960827.
- Mustafa, Z., & Sims, B. (2006). A new approach to generalised metric spaces. Journal of Nonlinear And Convex Analysis, 7(2), 289–297.
- Olatinwo, M. O. (2010). Some fixed point theorems for weak contraction conditions of integral type. Acta Universitatis Apulensis, 24, 331–338.
- Ran, A. C. M., & Reurings, M. C. B. (2003). A fixed point theorem in partially ordered sets and some applications to matrix equations. Proceedings of the American Mathematical Society, 132(5), 1435–1443. doi:10.1090/S0002-9939-03-07220-4
- Rhoades, B. E. (2001). Some theorems on weakly contractive maps. Nonlinear Analysis, 47, 2683–2693. doi:10.1016/S0362-546X(01)00388-1
- Shatanawi, W. (2011). Fixed point theorems for nonlinear weakly C-contractive mappings in metric spaces. Mathematical Computation Modelling, 54, 2816–2826. doi:10.1016/j.mcm.2011.06.069