1] Huang Long-Guang, Zhang Xian, “Cone metric spaces and fixed point
theorems of contractive mapping”, J. Math. Appl., 332, 2007, pp. 1468-1476.
[2] Osama Kada, Tomonari Suzuki, And Wataru Takahashi, “Nonconvex
minimization theorems and fixed point theorems in complete metric spaces”,
Math. Japonica, 44, 1996, pp. 381-591.
[3] Naoki Shioji, Tomonari Suzuki, and Wataru Takahashi, “Contractive
mappings, Kannan mappings and metric completeness”, Bull. Amer. Math.
Soc. 10, 1998, pp. 3117-3124.
[4] H. Lakzian F. Arabyani, “A Generalization on fixed point theorem on cone
metric spaces with w-distance”, Int. Journal of Math. Analysis, Vol. 3, no. 22,
2009, pp. 1081-1086.
[5] G. A. Dhanorkar and J. N. Salunke, “A Generalization on Fixed Point
Theorem on Cone Metric Spaces with w-Distance”, International
Mathematical Forum, Vol. 6, no. 39, 2011, pp. 1915-1919.
[6] J.Caristi, “Fixed Point theorems for satisfying inward conditions”, Trans.
A.M.S , 215, 1976, pp. 241-251.
[7] I. Ekeland, “Non Convex Minimization Problems”, Bull. A.M.S, 1, 1979, pp.
443-474.
[8] W. Takahashi, “Existence Theorems generalizing fixed point theorems for
multivalued Mappings” Fixed Point theory and Applications, Pitman
Research Notes in Mathematics Series 252, 1991, pp. 397-406.
[9] P. V. Subrahmanyan, “Remarks on some fixed point theorems related to
Banach’s Contraction principle”, J. Math. Phy. Sci, 8, 1974, pp. 445-447.
[10] R.Kannan, Some results on fixed points II, Amer.Math. Monthly, 76, 1969 pp,
405-408.
[11] L.J.Ciric, A generalization of Banach Contraction principle, Proc. Amer.
Math. Soc. 45, 1974, pp. 267-273.
Thank you for copying data from http://www.arastirmax.com
