Fixed point theorems by altering distances between ...
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Fixed point theorems by altering distances between ...
positive integers. Delbosco [/] and Skof [&] have established fixed point theorems for selfmaps of complete metric spaces by altering the distances between the.
BULL. AUSTRAL. MATH. SOC. VOL.
54H25
30 ( 1 9 8 4 ) , 1-9.
(47H10)
FIXED POINT THEOREMS BY ALTERING DISTANCES BETWEEN THE POINTS 1.S. KHAN, M. SWALEH AND S. SESSA
In this paper we have established some fixed point theorems in complete and compact metric spaces.
1. Introduction Let
R
be the set of nonnegative real numbers and
N
the set of
positive integers. Delbosco [/] and Skof [&] have established fixed point theorems for selfmaps of complete metric spaces by altering the distances between the points with the use of a function
(0 : R
-*• R
satisfying the following
properties: 1. cp is continuous and strictly increasing in R 2.
ip(t) = 0
if and only if
3. 0 , where
We denote the set of above functions
M > 0 , \i > 0 ip with
are constant.
$ .
Precisely in [S, corol. 2] the following theorem was proved:
THEOREM 1. Let T be a selfmap of a complete metric space (X,d) and tp £ $ such that for every x,y in X, (A)
w(d(Tx,Ty)) < a.y(d(x,y)) + b.y$>(d(x,Tx)) Received 5 January 1984.
Copyright Clearance Centre, Inc. Serial-fee code: 0004-9727/84 $A2.00 + 0.00 1
2 where
M.S. Khan, M. Swaleh and S. Sessa O^a
+ b + c q(n) > n, d(xp(n),xq(n))
For each
n 0 and two sequences
n € N U {0}., we find that
> z and d(xp(n)_13xq(n))
< e.
n ^ 0} we put s = (ifx , .,x . .). Then we have
p(n)-l>xp(n)}
e.
e < S
d(x
+
Since
{ T } converges to 0, {s } converges to e.
^
Furthermore, the triangular inequality implies, for each -Xp(n) ~ \(n) +sn
therefore also the sequence
x
} q(n)+l
< T p ^ + \(ph(n)+l)>i*'(d(xh(n)>Tz)))
Since
{p } converges to 0, for n -*• °° the last inequality yields
