A Note on Banach Contraction Mapping principle in Cone Hexagonal Metric Space
Abba Auwalu *
Department of Mathematics, Near East University, Nicosia - TRNC, Mersin 10, Turkey and Department of Mathematics, Sule Lamido University, PMB 048, Ka n Hausa, Jigawa State, Nigeria.
Evren Hınçal
Department of Mathematics, Near East University, Nicosia - TRNC, Mersin 10, Turkey.
*Author to whom correspondence should be addressed.
Abstract
In this paper, we prove fixed point theorem of a self mapping in non-normal cone hexagonal metric spaces. Our result extend and improve some recent results of Azam et al., [Banach contraction principle on cone rectangular metric spaces, Applicable Analysis and Discrete Mathematics, 3 (2), 236 - 241, 2009], Rashwan and Saleh [Some Fixed Point Theorems in Cone Rectangular Metric Spaces, Mathematica Aeterna, 2 (6): 573 - 587, 2012], Garg and Agarwal, [Banach Contraction Principle on Cone Pentagonal Metric Space, J. Adv. Studies Topol., 3 (1), 12 - 18, 2012], Garg, [Banach Contraction Principle on Cone Hexagonal Metric Space, Ultra Scientist, 26 (1), 97 - 103, 2014], and others.
Keywords: Cone metric space, fixed point, Banach contraction mapping principle.