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Original scientific paper

Maps for which some power is a contraction

Satish Shirali ; House No.899, Sector 21, Panchkula, Haryana, India


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Abstract

It is well known that if some power of a self map of a
complete metric space is a contraction, then the map has a unique
fixed point. It is natural to ask whether such a map is itself a
contraction with respect to some related metric on the space. We
show that this is indeed so and furthermore, if the map is
uniformly continuous, then the related metric is complete. Also,
we give an example to show that, if the map is not continuous,
then the related metric need not be complete.

Keywords

contraction; related metric; fixed point

Hrčak ID:

53215

URI

https://hrcak.srce.hr/53215

Publication date:

10.6.2010.

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