Fixed point results on complete G-metric spaces
2011 ◽
Vol 48
(3)
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pp. 304-319
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Keyword(s):
In this paper several fixed point theorems for a class of mappings defined on a complete G-metric space are proved. In the same time we show that if the G-metric space (X, G) is symmetric then the existence and uniqueness of these fixed point results follows from the Hardy-Rogers theorem in the induced usual metric space (X, dG). We also prove fixed point results for mapping on a G-metric space (X, G) by using the Hardy-Rogers theorem where (X, G) need not be symmetric.
2020 ◽
pp. 492-502
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Keyword(s):
2005 ◽
Vol 2005
(5)
◽
pp. 789-801
Keyword(s):