Open Access  Subscription or Fee Access

In this paper, the concept of metric space, replacing the set of real numbers by an ordered Bunch space and defined a Cone metric space. The authors there described the convergence of sequences in cone metric spaces and introduced the completeness. Also, they proved some fixed point theorems of contractive mappings on complete cone metric Spaces. Since then, fixed point theorems for different (classic) classes of Mappings on these spaces have been appeared, see for instance the subject of “Functional Analysis” may be said to have started its development at the beginning of the present century. Functional Analysis born in the present century and growing very rapidly, is an area of mathematics based on linear algebra and topology combined together. The early growth of functional analysis was based on the nineteenth century function theory and was given a great impetus by the birth of lebesgue theory of measure and integration. Functional analysis is the study of certain topological-algebraic structures and of the methods by which knowledge of these structures can be applied to analytic problems. A topological space being simply a non-empty set in which there is given a class of subsets, called open sets.

Functional Analysis, Cone Metric Space, Functional Analysis, T-Contraction, Bench Space, Topology Combined.

A. Beiranvand, S. Moradi, M. Omid, H. Pazandeh, Two fixed point theorem for special mapping, arXiv: 0903.1504v1.

J.R. Morales, E. Rojas, Cone metric spaces and fixed point theorems of T-contractive mappings, Revista Notas de Matematica, 4, No. 2, (2008), 66-78.

L.G. Huang, X. Zhang, Cone metric spaces and fixed point theorems of contractive mappings, J. Math. Anal. Appl., 332, No. 2 (2007), 1468-1476.

P. Raja, S.M. Vaezpour, Some extensions of Banach’s contraction principle in complete cone metric spaces, Fixed Point Theory and Applications (2008), 11.

G. Jungck, S. Radenovic, S. Radojevic, V. Rakocevic, Common fixed point theorems for weakly compatible pairs on cone metric spaces, To Appear.

Kazimierz Goebel, W.A. Kirk, Topics in Metric Fixed Point Theory, Cambridge University Press, NY (1990).

M. Abbas, B.E. Rhoades, Fixed and periodic point results in cone metric spaces, Appl. Math. Lett., 22 (2009), 511-515.

S. Rezapour, R. Hamlbarani, Some notes on the paper “Cone metric spaces and fixed point theorem of contractive mappings”, J. Math. Anal. Appl., 345 (2008), 719-724.

Dejan Ilic, Vladimir Rakocevic, Common fixed point for maps on cone metric space, J. Math. Anal. Appl., 341, No. 2 (2008), 876-882.

Dariusz Wardowski, End points and fixed points of set-valued contractions in cone metric spaces, Nonlinear Analysis (2009).

B. S. Choudhury and N. Metiya, Fixed points of weak contractions in cone metric spaces, Nonlinear Analysis 72 (2010), no. 3-4, 1589-1593.

P. N. Dutta and B. S. Choudhury, A generalisation of contraction principle in metric spaces, Fixed Point Theory Appl. 2008 (2008). Art. ID 406368, 8 pp.

L.-G. Huang and X. Zhang, Cone metric spaces and fixed point theorems of contractive mappings, J. Math. Anal. Appl. 332 (2007) 1468-1476.