Banach contraction principle for cyclical mappings on partial metric spaces
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Date
2012
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Springer international Publishing Ag
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Abstract
We prove that the Banacah contraction principle proved by Matthews in 1994 on 0-complete partial metric spaces can be extended to cyclical mappings. However, the generalized contraction principle proved by (Ilic et al. in Appl. Math. Lett. 24:1326-1330, 2011) on complete partial metric spaces can not be extended for cyclical mappings. Some examples are given to illustrate our results. Moreover, our results generalize some of the results obtained by (Kirk et al. in Fixed Point Theory 4(1):79-89, 2003). An Edelstein type theorem is also extended when one of the sets in the cyclic decomposition is 0-compact.
Description
Alzabut, Prof. Dr. Jehad/0000-0002-5262-1138; Mukheimer, Aiman/0000-0001-8798-3297; Abdeljawad, Thabet/0000-0002-8889-3768
Keywords
Partial Metric Space, Fixed Point, Cyclic Mapping, Banach Contraction Principle, 0-Compact Set
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Citation
Abdeljawad, T...et al. (2012). Banach contraction principle for cyclical mappings on partial metric spaces. Fixed Point Theory And Applications, 154, 1-7. http://dx.doi.org/10.1186/1687-1812-2012-154
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Q3