Proof That a Contracting Mapping on a Complete Metric Space Has One Fixed Point
Theorem
If
is a contracting mapping on a complete metric space
then there exists one and only one
such that
Proof
Let
Define
so that
Since
is a contracting mapping,
for some
Hence
but
Hence
Since
Hence
Take
and define
Since
exists such that
Fo
Thus
is a Cauchy sequence and since
is complete,
is continuous hence
is unique since suppose
then
so that
and
