Fixed Point Theorem for Non-self Mapping in Cone Metric Space

B. Geethalakshmi; R. Hemavathy

American Journal of Applied Mathematics and Statistics. 2019, 7(2), 52-58
DOI: 10.12691/AJAMS-7-2-1

Original Research

Fixed Point Theorem for Non-self Mapping in Cone Metric Space

B. Geethalakshmi^1, and R. Hemavathy²

¹Ɗeparţment of Mathematics, Dr. M.G.R. Educational Research& Institute, Maduravoyal, Chennai -95, India

²Ɗeparţment of Mathematics, Queen Mary’s College, (Autonomous), Chennai-4, UK

Pub. Date: January 21, 2019

Full Text PDF

Cite this paper

B. Geethalakshmi and R. Hemavathy. Fixed Point Theorem for Non-self Mapping in Cone Metric Space. American Journal of Applied Mathematics and Statistics. 2019; 7(2):52-58. doi: 10.12691/AJAMS-7-2-1

Abstract

In this paper, we prove a common fixed point theorem for coincidentally commuting non-self mappings for a generalized contraction condition in cone b-metric space.

Keywords

cone b-metric space, common fixed point, non-self mapping, coincidentally commuting, coincidentally point

Copyright

This work is licensed under a Creative Commons Attribution 4.0 International License. To view a copy of this license, visit http://creativecommons.org/licenses/by/4.0/

References

[1]	S. Jankovic, Z.Kadelburg, S. Radenovic and B.E. Rhoades. “Assad –Kirk-type fixed point theorems for a pair of Non-Self mappings in Cone Metric Space”, Fixed point theory and applications, Volume 2009, Article ID 761086, 16 pages.

[2]	M. Abbas and G. Jungck. “Common fixed point results for noncommuting mappings without continuity in cone metric spaces”, Journal of Mathematical Analysis and Applications, Vol.341, no.1, pp. 416-420, 2008.

[3]	M. Abbas and B. E. Rhoades. “Fixed and Periodic point results in cone metric spaces”, Applied Mathematics Letters, Vol.22, no.4, pp.511-515, 2009.

[4]	Stojan Radenovic. “A pair of Non-Self Mappings in cone metric spaces”, Kragujevac Journal of Mathematics, Volume 36 Number 2(2012), Pages 189-198.

[5]	Bakhtin, IA. “The contraction mapping principle in almost metric Hussain, N.Shah, MH: “kkm mappings in cone b-metric spaces. comput. math. Appl. 62, 1677-1684 (2011).

[6]	N.A. Assard, W.A. Kirk. “Fixed point theorems for set valued mappings of contractive type”, Pacific J. Math., 43 (1972), 553-562.

[7]	R. Sumithra, V. RhymendUthariaraj, R. Hemavathy and P. Vijayaraju. “Common fixed point theorem for Non-Self Mappings satisfying GeneralisedCiric Type Contraction condition in Cone Metric Space”, Hindawi Publishing Corporation, Fixed point theory and Applcations Volume 2010, Article ID 408086, 17 pages.

[8]	Huang and Xu, “Fixed point theorems of contractive mappings in cone b-metric spaces and applications”, Fixed point theory and Applications 2013, 2013: 112.

[9]	L. G. Huang and X. Zhang, “Cone Metric Spaces and Fixed Point Theorems of contractive mappings”, Journal of Mathematicl Analysis and Applications, Vol. 332, no. 2, pp. 1468-1476, 2007.

[10]	Z.Kadelburg, S. Radenovic, V.Rakocevic, “A note on the equivalence of some metric and cone metric fixed point results, Appl. Math. Lett.24(2011), 370-374.

[11]	P. Raja and S.M. Vaezpour, “Some extensions of Banach’s contraction principle in complete cone metric spaces”, Fixed point theory and Applications”, Vol. 2008, Article ID 768924, 11 pages 2008.

[12]	Stojan Radenovic, B.E. Rhoades, “Fixed point theorem for two non-self mappings in cone metric spaces”, Computers and Mathematics with Applications 57(2009) 1701-1707.

[13]	X.J. Huang , J. Luo, C.X. Zhu, X.Wen, “Common fixed point theorem for two pairs of non-self mappings satisfying generalisedciric type contraction condition in cone metric spaces”, Fixed point theory, Appln., 2014 (2014), 19 pages.

[14]	Xianjiu Huang, Xin Xin Lu, Xi wen,”New common fixed point theorem for a family of non-self mappings in cone metric spaces”, J.Non linear Sci. Appl. 8(2015), 387-401.