1 Introduction

Fixed point theory is one of the famous and traditional theories in mathematics and has a broad set of applications. In this theory, contraction is one of the main tools to prove the existence and uniqueness of a fixed point. Banach’s contraction principle, which gives an answer on the existence and uniqueness of a solution of an operator equation Tx=x, is the most widely used fixed point theorem in all of analysis. This principle is constructive in nature and is one of the most useful tools in the study of nonlinear equations. There are many generalizations of Banach’s contraction mapping principle in the literature [16]. These generalizations were made either by using the contractive condition or by imposing some additional conditions on an ambient space. There have been a number of generalizations of metric spaces such as rectangular metric spaces, pseudo metric spaces, fuzzy metric spaces, quasi metric spaces, quasi semi-metric spaces, probabilistic metric spaces, D-metric spaces and cone metric spaces

The basic topological properties of ordered sets were discussed by Wolk [7] and Monjardet [8]. The existence of fixed points in partially ordered metric spaces was considered by Ran and Reurings [9]. After this paper, Nieto et al. [1012] published some new results. Recently, many papers have been reported on partially ordered metric spaces (see, e.g., [919] and also [8, 2033]).

The triple (X,d,) is called partially ordered metric spaces (POMS) if (X,) is a partially ordered set and (X,d) is a metric space. Further, if (X,d) is a complete metric space, the triple (X,d,) is called partially ordered complete metric spaces (POCMS). Throughout the manuscript, we assume that X. A partially ordered metric space (X,d,) is called ordered complete (OC) if for each convergent sequence { x n } n = 0 X, the following condition holds: either

  • if { x n } is a non-increasing sequence in X such that x n x implies x x n nN, that is, x =inf{ x n }, or

  • if { x n } is a non-decreasing sequence in X such that x n x implies x n x nN, that is, x =sup{ x n }.

In this manuscript, we prove that an operator T satisfying certain rational contraction condition has a fixed point in a partially ordered metric space. Our results generalize the main result of Jaggi [34].

2 Main results

We start this section with the following definition.

Definition 1 Let (X,d,) be a partially ordered metric space. A self-mapping T on X is called an almost Jaggi contraction if it satisfies the following condition:

d(Tx,Ty) α d ( x , T x ) d ( y , T y ) d ( x , y ) +βd(x,y)+Lmin { d ( x , T y ) , d ( y , T x ) }
(1)

for any distinct x,yX with xy, where L0 and α,β[0,1) with α+β<1.

Theorem 2 Let (X,d,) be a complete partially ordered metric space. Suppose that a self-mapping T is an almost Jaggi contraction, continuous and non-decreasing. Suppose there exists x 0 X with x 0 T x 0 . Then T has a unique fixed point.

Proof Let x 0 X and set x n + 1 =T x n . If x n 0 = x n 0 + 1 for some n 0 N, then T has a fixed point. In particular, x n 0 is a fixed point of T. So, we assume that x n x n + 1 for all n. Since x 0 T x 0 , then

x 0 x 1 x n x n + 1 .
(2)

Now

d ( x n + 1 , x n ) = d ( T x n , T x n 1 ) α d ( x n 1 , T x n 1 ) d ( x n , T x n ) d ( x n , x n 1 ) + β d ( x n , x n 1 ) + L min { d ( x n , x n ) , d ( x n 1 , x n + 1 ) } ,

which implies that

d( x n + 1 , x n ) ( β 1 α ) d( x n , x n 1 ) ( β 1 α ) n d( x 1 , x 0 ).

By the triangle inequality, for mn we have

d ( x n , x m ) d ( x n , x n + 1 ) + d ( x n + 1 , x n + 2 ) + + d ( x m 1 , x m ) ( k n + k n + 1 + + k m 1 ) d ( x 0 , T x 0 ) . k n 1 k d ( x 0 , T x 0 ) ,
(3)

where k= β 1 α . Letting n in the inequality (3), we get d( x n , x m )=0. Thus, the sequence { x n } is Cauchy. Since X is complete, there exists a point zX such that x n z. Furthermore, the continuity of T in X implies that

T z = T ( lim n x n ) = lim n T x n = lim n x n + 1 = z .

Therefore, z is a fixed point of T in X. Now, if there exists another point wz in X such that Tw=w, then

d ( w , z ) = d ( T w , T z ) α d ( w , T w ) d ( z , T z ) d ( w , z ) + β d ( w , z ) = β d ( w , z ) < d ( w , z ) ,

a contradiction. Hence u is a unique fixed point of T in X. □

Example 3 Let X=[0,1] with the usual metric and usual order ≤. We define an operator T:XX as follows:

Tx={ x 10 if  x [ 0 , 1 2 ] , x 5 1 20 if  x ( 1 2 , 1 ] .

Then T is continuous and non-decreasing. Take β= 1 4 . Then, for any α[0,1) with α+β<1, we have the result. Let us examine in detail. Without loss of generality, we assume that yx.

Case 01. If x,y[0, 1 2 ], then

d ( T x , T y ) = 1 10 | x y | 1 4 | x y | = 1 4 d ( x , y ) α d ( x , T x ) d ( y , T y ) d ( x , y ) + 1 4 d ( x , y ) + L min { d ( x , T y ) , d ( y , T x ) }

holds for any L1 and any α[0,1) with α+β<1. Thus, all the conditions of Theorem 2 are satisfied.

Case 02. If x,y( 1 2 ,1], then

d ( T x , T y ) = 1 5 | x y | 1 4 | x y | = 1 4 d ( x , y ) α d ( x , T x ) d ( y , T y ) d ( x , y ) + 1 4 d ( x , y ) + L min { d ( x , T y ) , d ( y , T x ) }

holds for any L0 and any α[0,1) with α+β<1. Hence, all the conditions of Theorem 2 are satisfied.

Case 03. If x( 1 2 ,1] and y[0, 1 2 ], then we can easily evaluate that 1 20 |2x1| 1 20 . Further, we have 9 20 d(x,Ty)=|x y 10 |1 and 3 20 d(y,Tx)=| x 5 1 20 y| 9 20 . By the help of these observations, we derive that

d ( T x , T y ) = | x 5 1 20 y 10 | = | x 10 y 10 + x 10 1 20 | 1 10 | x y | + 1 20 | 2 x 1 | α d ( x , T x ) d ( y , T y ) d ( x , y ) + 1 4 d ( x , y ) + L min { d ( x , T y ) , d ( y , T x ) } .

Notice that 0X is the fixed point of T.

Definition 4 Let (X,d,) be a partially ordered metric space. A self-mapping T on X is called a Jaggi contraction if it satisfies the following condition:

d(Tx,Ty) α d ( x , T x ) d ( y , T y ) d ( x , y ) +βd(x,y)
(4)

for any distinct x,yX with xy, where α,β[0,1) with α+β<1.

Corollary 5 Let (X,d,) be a complete partially ordered metric space. Suppose that a self-mapping T is a Jaggi contraction, continuous and non-decreasing. Suppose that there exists x 0 X with x 0 T x 0 . Then T has a fixed point.

Proof Set L=0 in Theorem 2. □

Example 6 Let X=[0,), d:X×X R + be defined by

d(x,y)={ max { x , y } if  x y , 0 if  x = y .

Then (X,d) is a complete metric space. Let T:XX be defined by

Tx={ x 8 ( 1 + x ) if  0 x 2 , x 12 if  2 < x .

Also, xy iff xy. Clearly, T is an increasing and continuous self-mapping on X. We shall prove that conditions of Corollary 5 hold and T has a fixed point.

Proof For the proof of this example, we have the following cases.

  • Let 0x<y2. Then

    d ( T x , T y ) = max { T x , T y } = y 8 ( 1 + y ) 1 4 ( x + y ) = 1 4 ( x y y + y ) = 1 4 [ max { x , x 8 ( 1 + x ) } max { y , y 8 ( 1 + y ) } max { x , y } + max { x , y } ] = 1 4 ( d ( x , T x ) d ( y , T y ) d ( x , y ) + d ( x , y ) ) ,

that is,

d(Tx,Ty) 1 4 d ( x , T x ) d ( y , T y ) d ( x , y ) + 1 4 d(x,y).
  • Let 2<x<y. Then

    d ( T x , T y ) = max { T x , T y } = y 12 1 4 ( x + y ) = 1 4 ( x y y + y ) = 1 4 [ max { x , x 12 } max { y , y 12 } max { x , y } + max { x , y } ] = 1 4 ( d ( x , T x ) d ( y , T y ) d ( x , y ) + d ( x , y ) ) ,

that is,

d(Tx,Ty) 1 4 d ( x , T x ) d ( y , T y ) d ( x , y ) + 1 4 d(x,y).
  • Let 0x2 and 2<y. Then

    d ( T x , T y ) = max { T x , T y } = y 12 1 4 ( x + y ) = 1 4 ( x y y + y ) = 1 4 [ max { x , x 8 ( 1 + x ) } max { y , y 12 } max { x , y } + max { x , y } ] = 1 4 ( d ( x , T x ) d ( y , T y ) d ( x , y ) + d ( x , y ) ) ,

that is,

d(Tx,Ty) 1 4 d ( x , T x ) d ( y , T y ) d ( x , y ) + 1 4 d(x,y).

Then conditions of Corollary 5 hold and T has a fixed point (here, x=0 is a fixed point of T). □

In the next theorem, we establish the existence of a unique fixed point of a map T by assuming only the continuity of some iteration of T.

Theorem 7 Let (X,d,) be a complete partially ordered metric space. Suppose that a self-mapping T is non-decreasing and an almost Jaggi contraction. Suppose there exists x 0 X with x 0 T x 0 . If the operator T p is continuous for some positive integer p, then T has a unique fixed point.

Proof As in Theorem 2, we define a sequence x n and conclude that the sequence x n converges to some point zX. Thus its subsequence x n k ( n k =kp) also converges to z. Also,

T p z = T p ( lim k x n k ) = lim k x n k + 1 = z .

Therefore z is a fixed point of T p . We now show that Tz=z. Let m be the smallest positive integer such that T m z=z but T q z (q=1,2,,m1). If m>1, then

d ( T z , z ) = d ( T z , T m z ) α d ( z , T z ) d ( T m 1 z , T m z ) d ( z , T m 1 z ) + β d ( z , T m 1 z ) + L min { d ( z , T m z ) , d ( T m 1 z , T z ) }

which implies that

d(Tz,z) β 1 α d ( z , T m 1 z ) .

Regarding (1), we have

d ( z , T m 1 z ) = d ( T m z , T m 1 z ) α d ( T m 1 z , T m z ) d ( T m 2 z , T m 1 z ) d ( T m 2 z , T m 1 z ) + β d ( T m 1 z , T m 2 z ) .

Inductively, we get

d ( z , T m 1 z ) =d ( T m z , T m 1 z ) kd ( T m 1 z , T m 2 z ) k m 1 d(Tz,z),

where k= β 1 α . Notice that k<1. Therefore,

d(Tz,z) k m d(Tz,z)d(Tz,z),

a contradiction. Hence Tz=z. The uniqueness of z follows as in Theorem 2. □

Corollary 8 Let (X,d,) be a complete partially ordered metric space. Suppose that a self-mapping T is non-decreasing and a Jaggi contraction. Suppose there exists x 0 X with x 0 T x 0 . If the operator T p is continuous for some positive integer p, then T has a unique fixed point.

Proof Set L=0 in Theorem 7. □

The following theorem generalizes Theorem 2.

Theorem 9 Let (X,d,) be a complete partially ordered metric space and let T be a non-decreasing self-mapping defined on X. Suppose that for some positive integer m, self-mapping T satisfies the following condition:

d ( T m x , T m y ) α d ( x , T m x ) d ( y , T m y ) d ( x , y ) +βd(x,y)+Lmin { d ( x , T y ) , d ( y , T x ) }
(5)

for any distinct x,yX with xy and for some α,β[0,1) with α+β<1 and L0. Suppose there exists x 0 X with x 0 T m x 0 . If T m is continuous, then T has a unique fixed point.

Proof Due to Theorem 2, we conclude that T m has a unique fixed point, say zX. Consider now

Tz=T ( T m z ) = T m (Tz).

Thus, Tz is also a fixed point of T m . But, by Theorem 2, we know that T m has a unique fixed point z. It follows that z=Tz. Hence, z is the unique fixed point of T. □

Corollary 10 Let (X,d,) be a complete partially ordered metric space and let T be a non-decreasing self-mapping defined on X. Suppose that for some positive integer m, the self-mapping T satisfies the following condition:

d ( T m x , T m y ) α d ( x , T m x ) d ( y , T m y ) d ( x , y ) +βd(x,y)
(6)

for all distinct x,yX and for some α,β[0,1) with α+β<1. Suppose there exists x 0 X with x 0 T m x 0 . If T m is continuous, then T has a unique fixed point.

Proof Set L=0 in Theorem 9. □

Now, we give the following example.

Example 11 Let X=[0,1] with the usual metric and usual order ≤. We define an operator T:XX as follows:

Tx={ 0 , x [ 0 , 1 3 ] , 1 3 , x ( 1 3 , 1 ] .

It can be easily seen that T is discontinuous and does not satisfy (1) for any α,β[0,1) with α+β1 when x= 1 3 , y=1. Now T 2 (x)=0 for all x[0,1]. It can be verified that T 2 satisfies the conditions of Theorem 9 and 0 is a unique fixed point of T 2 .

Theorem 12 Let (X,d,) be a complete partially ordered metric space and let T be a non-decreasing self-mapping defined on X. Suppose that a self-mapping T on X satisfies the condition

d(Tx,Ty) α d ( T y , y ) [ 1 + d ( x , T x ) ] 1 + d ( x , y ) +βd(x,y)+Lmin { d ( x , T x ) , d ( x , T y ) , d ( y , T x ) }
(7)

for any points x,yX with xy, and for some α,β[0,1) with α+β<1 and L0. Suppose there exists x 0 X with x 0 T x 0 . Then T has a fixed point.

Proof Define sequences x n as in Theorem 2. If x n 0 = x n 0 + 1 for some n 0 N then T has a fixed point. In particular, x n 0 is a fixed point of T. Therefore, we assume that

x n x n + 1 for all nN.
(8)

Due to (7), we have

d ( x n , x n + 1 ) = d ( T x n 1 , T x n ) α d ( x n , T x n ) [ 1 + d ( x n 1 , T x n 1 ) ] 1 + d ( x n 1 , x n ) + β d ( x n 1 , x n ) + L min { d ( T x n 1 , x n 1 ) , d ( x n 1 , T x n ) , d ( x n , T x n 1 ) } = α d ( x n + 1 , x n ) [ 1 + d ( x n , x n 1 ) ] 1 + d ( x n 1 , x n ) + β d ( x n 1 , x n ) , + L min { d ( x n 1 , x n ) , d ( x n 1 , x n + 1 ) , d ( x n , x n ) } ,

which implies that

d( x n + 1 , x n ) ( β 1 α ) d( x n , x n 1 ).

Recursively, we obtain that

d( x n + 1 , x n ) ( β 1 α ) n d( x 1 , x 0 ).

As in Theorem 2, we prove that { x n } is a Cauchy sequence. Indeed, by the triangle inequality, we have for mn,

d ( x n , x m ) d ( x n , x n + 1 ) + d ( x n + 1 , y n + 2 ) + + d ( x m 1 , x m ) ( k n + k n + 1 + + k m 1 ) d ( x 0 , T x 0 ) k n 1 k d ( x 0 , x 1 ) ,
(9)

where k= β 1 α <1. Letting n, then the right-hand side of the inequality (9) tends to 0. Thus, the sequence { x n } is Cauchy.

Since X is complete, there exists a zX such that

lim n x n = lim n T x n =z.
(10)

Consider (7)

d ( T z , x n + 1 ) = d ( T z , T x n ) α d ( z , T z ) [ 1 + d ( x n , T x n ) ] 1 + d ( z , x n ) + β d ( z , T x n ) + L min { d ( z , T z ) , d ( z , T x n ) , d ( x n , T z ) } .
(11)

Letting n in (11), we get

d ( T z , z ) α d ( z , T z ) [ 1 + d ( z , z ) ] 1 + d ( z , z ) + β d ( z , z ) = α d ( T z , z ) ,

which is possible only if d(Tz,z)=0. Thus, Tz=z.

Now, we show that z is the unique fixed point of T. Assume, on the contrary, that the operator T has another fixed point uz. Keeping (7) in mind, we obtain that

d ( z , u ) = d ( T z , T u ) α d ( T u , u ) [ 1 + d ( z , T z ) ] 1 + d ( z , u ) + β d ( z , u ) + L min { d ( z , T z ) , d ( z , T u ) , d ( u , T z ) } = α d ( u , u ) . [ 1 + d ( z , z ) ] d ( z , u ) + β d ( z , u ) = β d ( z , u ) ,

a contradiction. Hence z is a unique fixed point of T in X. □

Corollary 13 Let (X,d,) be a complete partially ordered metric space and let T be a non-decreasing self-mapping defined on X. Suppose that a self-mapping T on X satisfies the condition

d(Tx,Ty) α d ( T y , y ) [ 1 + d ( x , T x ) ] 1 + d ( x , y ) +βd(x,y)
(12)

for any points x,yX with xy, and for some α,β[0,1) with α+β<1. Then T has a fixed point.

Proof Set L=0 in Theorem 12. □

Example 14 Let X=[0,1], d:X×X R + be defined by

d(x,y)=|xy|.

Then (X,d) is a complete metric space. Let T:XX be defined by

Tx= 1 6 x 3 .

Also, xy iff xy. Suppose that β= 1 3 and α[0,1) such that α+β<1. Clearly, T is an injective, continuous and sequentially convergent mapping on X. We shall prove that conditions of Corollary 8 hold and T has a fixed point.

Proof For the proof of this example, we have the following cases.

Let x,y[0,1]. Then

d(Tx,Ty)= 1 6 | x 3 y 3 | = 1 6 | ( x y ) ( x 2 + x y + y 2 ) | 1 3 |xy|= 1 3 d(x,y).

That is,

d(Tx,Ty)α d ( y , T y ) [ 1 + d ( x , T x ) ] 1 + d ( x , y ) +βd(x,y).

Hence, conditions of Corollary 8 hold and T has a fixed point (here x=0 is a fixed point of T). □

3 Further results

Theorem 15 Let (X,d,) be a complete partially ordered metric space and let T be a non-decreasing, continuous self-mapping defined on X. Suppose that a self-mapping T satisfies the following condition:

d(Tx,Ty){ λ d ( x , y ) + μ d ( x , T x ) d ( x , T y ) + d ( y , T x ) d ( y , T y ) d ( y , T x ) + d ( x , T y ) if A 0 , 0 if A = 0 ,
(13)

for all x,yX with yx, where A=d(y,Tx)+d(x,Ty) and λ, μ are non-negative reals such that λ+μ<1. If there exists x 0 X with x 0 T x 0 , then T has a fixed point.

Proof By assumption, there exists x 0 X with x 0 T x 0 . If x 0 =T x 0 , then the proof is finished. So, we suppose that x 0 T x 0 . Since T is a non-decreasing mapping, we get

x 0 T x 0 T 2 x 0 T n x 0 T n + 1 x 0
(14)

by iteration. Put x n + 1 =T x n . If there exists n 0 N such that x n 0 = x n 0 + 1 , then from x n 0 = x n 0 + 1 =T x n 0 , we get x n 0 is a fixed point, and the proof is finished. Suppose that x n x n + 1 for nN. Since the points x n and x n 1 are comparable for all nN due to (14), we have the following two cases.

Case 1. If A=d( x n 1 ,T x n )+d( x n ,T x n 1 )0, then using the contractive condition (13), we get

d ( x n + 1 , x n ) = d ( T x n , T x n 1 ) λ d ( x n , x n 1 ) + μ d ( x n , T x n ) d ( x n , T x n 1 ) + d ( x n 1 , T x n ) d ( x n 1 , T x n 1 ) d ( x n 1 , T x n ) + d ( x n , T x n 1 ) λ d ( x n , x n 1 ) + μ d ( x n , x n + 1 ) d ( x n , x n ) + d ( x n 1 , x n + 1 ) d ( x n 1 , x n ) d ( x n 1 , x n + 1 ) + d ( x n , x n ) λ d ( x n , x n 1 ) + μ d ( x n 1 , x n + 1 ) d ( x n 1 , x n ) d ( x n 1 , x n + 1 ) ( λ + μ ) d ( x n , x n 1 ) .

Hence, we derive that

d( x n + 1 , x n ) h n d( x 1 , x 0 ),

where h=(λ+μ)<1. Moreover, by the triangular inequality, we have, for mn,

d ( x m , x n ) d ( x m , x m 1 ) + d ( x m 1 , x m 2 ) + + d ( x n + 1 , x n ) ( h m 1 + h m 2 + + h n ) d ( x 1 , x 0 ) h n 1 h d ( x 1 , x 0 ) ,

and this proves that d( x m , x n )0 as m,n.

So, { x n } is a Cauchy sequence and, since X is a complete metric space, there exists zX such that lim n x n =z. Further, the continuity of T implies

Tz=T ( lim n x n ) = lim n T x n = lim n x n + 1 =z.

Thus z is a fixed point.

Case 2. If A=d( x n 1 ,T x n )+d( x n ,T x n 1 )=0, then d( x n + 1 , x n )=0. This implies that x n = x n + 1 , a contradiction. Thus there exists a fixed point z of T. □

Example 16 Let X=[0,1] with the usual metric and usual order ≤. We define an operator T:XX in the following way:

Tx= 2 x + 3 4 ( x 2 + x + 5 4 ) .
(15)

It is clear that T is continuous on [0,1]. Now, for λ= 16 25 and any μ[0,1) such that λ+μ<1. Without loss of generality, we assume that xy. So, we have

d ( T x , T y ) = 1 4 | 2 x + 3 x 2 + x + 5 4 2 y + 3 y 2 + y + 5 4 | = | 2 x y ( y x ) + 3 ( y x ) ( x + y ) + 3 ( y x ) 5 2 ( y x ) 4 ( x 2 + x + 5 4 ) ( y 2 + y + 5 4 ) | = | 2 x y + 3 ( x + y ) + 1 2 4 ( x 2 + x + 5 4 ) ( y 2 + y + 5 4 ) | | x y | 16 25 | y x | = 16 25 d ( x , y )

for all x,yX. Also, there exists x 0 =0X such that

x 0 =0T x 0

is satisfied. This shows that conditions of Theorem 15 hold and T has a fixed point 1 2 [0,1].

We may remove the continuity criteria on T in Theorem 15 as follows.

Theorem 17 Let (X,d,) be a complete partially ordered metric space and let T be a non-decreasing self-mapping defined on X. Suppose that a self-mapping T satisfies the following condition:

d(Tx,Ty){ λ d ( x , y ) + μ d ( x , T x ) d ( x , T y ) + d ( y , T x ) d ( y , T y ) d ( y , T x ) + d ( x , T y ) if A 0 , 0 if A = 0 ,
(16)

for all x,yX with yx, where A=d(x,Tx)+d(y,Ty) and λ, μ are non-negative reals with λ+μ<1. And also suppose that X has the (OC) property. If there exists x 0 X with x 0 T x 0 , then T has a fixed point.

Proof We only have to check that z=Tz. As { x n }X is a non-decreasing sequence and x n zX, then z=sup{ x n } for all nN. Since T is a non-decreasing mapping, then T x n Tz for all nN or, equivalently, x n + 1 Tz for all nN. Moreover, as x 0 x 1 Tz and z=sup{ x n }, we get zTz. Suppose that zTz. Using a similar argument as that in the proof of Theorem 15 for x 0 T x 0 , we obtain that { T n z} is a non-decreasing sequence and lim n T n z=y for certain yX. Again, using (OC), we have that y=sup{ T n z}. Moreover, from x 0 z, we get x n = T n x 0 T n z for n1 and x n T n z for n1 because x n zTz T n z for n1 as x n and T n z are comparable and distinct for n1.

Case 1. If d( T n z,T x n )+d( x n , T n + 1 z)0, then applying the contractive condition (16), we get

d ( x n + 1 , T n + 1 z ) = d ( T x n , T ( T n z ) ) λ d ( x n , y ) + μ d ( x n , T x n ) d ( x n , T n z ) + d ( T n z , T x n ) d ( T n z , T n + 1 z ) d ( T n z , T x n ) + d ( x n , T n + 1 z ) λ d ( x n , T n z ) + μ d ( x n , x n + 1 ) d ( x n , T n z ) + d ( T n z , x n + 1 ) d ( T n z , T n + 1 z ) d ( T n z , x n + 1 ) + d ( x n , T n + 1 z ) .

Making n in the above inequality, we obtain

d(z,y)λd(z,y).

As λ<1, d(x,z)=0, thus z=y. Particularly, z=y=sup{ T n z} and consequently, Tzz which is a contradiction. Hence, we conclude that Tz=z.

Case 2. If A=d( T n z,T x n )+d( x n , T n + 1 z)=0, then d( x n + 1 , T n + 1 z)=0. Taking the limit as n, we get d(z,y)=0. Then z=y=sup{ T n z}, which implies that Tzz, a contradiction. Thus Tz=z. □

Now we prove the sufficient condition for the uniqueness of the fixed point in Theorem 15 and Theorem 17, that is,

U: for any y,zX, there exists xX which is comparable to y and z.

Theorem 18 Adding the above mentioned condition to the hypothesis of Theorem  15 (or Theorem  17), one obtains the uniqueness of the fixed point of T.

Proof We distinguish two cases.

Case 1. If y and z are comparable and yz. Now we have two subcases that are as follows:

  1. (i)

    If d(z,Ty)+d(y,Tz)0, then using the contractive condition, we have

    d ( y , z ) = d ( T y , T z ) λ d ( y , z ) + μ d ( y , T y ) d ( y , T z ) + d ( z , T y ) d ( z , T z ) d ( z , T y ) + d ( y , T z ) λ d ( y , z ) + μ d ( y , y ) d ( y , z ) + d ( z , y ) d ( z , z ) d ( z , y ) + d ( y , z ) = λ d ( y , z ) .

As λ<1, so by the last inequality, we have a contradiction. Thus y=z.

  1. (ii)

    If d(z,Ty)+d(y,Tz)=0, then d(y,z)=0, a contradiction. Thus y=z.

Case 2. If y and z are not comparable, then by a given condition there exists xX comparable to y and z. Monotonicity implies that T n x is comparable to T n y=y and T n z=z for n=0,1,2, .

If there exists n 0 1 such that T n 0 x=y, then as y is a fixed point, the sequence { T n x:n n 0 } is constant, and consequently lim n T n x=y. On the other hand, if T n xy for n1. Now we have two subcases as follows:

  1. (i)

    If d( T n 1 y, T n x)+d( T n 1 x, T n y)0, then using the contractive condition, we obtain, for n2,

    d ( T n x , y ) = d ( T n x , T n y ) λ d ( T n 1 x , T n 1 y ) + μ d ( T n 1 x , T n x ) d ( T n 1 x , T n y ) + d ( T n 1 y , T n x ) d ( T n 1 y , T n y ) d ( T n 1 y , T n x ) + d ( T n 1 x , T n y ) λ d ( T n 1 x , y ) + μ d ( T n 1 x , T n x ) d ( T n 1 x , y ) + d ( T y , T n x ) d ( y , y ) d ( y , T n x ) + d ( T n 1 x , y ) λ d ( T n 1 x , y ) + μ d ( T n 1 x , T n x ) d ( T n 1 x , y ) d ( y , T n x ) + d ( T n 1 x , y ) .

This implies that

d ( T n x , y ) λ d ( T n 1 x , y ) + μ d ( T n 1 x , y ) = λ d ( T n 1 x , T n 1 y ) + μ d ( T n 1 x , T n 1 y ) λ ( λ d ( T n 2 x , y ) + μ d ( T n 2 x , y ) ) + μ ( λ d ( T n 2 x , y ) + μ d ( T n 2 x , y ) ) = λ 2 d ( T n 2 x , y ) + 2 λ μ d ( T n 2 x , y ) + μ 2 d ( T n 2 x , y ) = ( λ + μ ) 2 d ( x , y ) .

By induction we get

d ( T n x , y ) ( λ + μ ) n d(x,y).

Taking limit as n in the above inequality, we get

lim n T n x=y

as λ+μ<1. Using a similar argument, we can prove that

lim n T n x=z.

Now, the uniqueness of the limit gives that y=z.

  1. (ii)

    If d( T n 1 y, T n x)+d( T n 1 x, T n y)=0, then d( T n x,y)=0. Then

    lim n T n x=y.

Using a similar argument, we can prove that

lim n T n x=z.

Now, the uniqueness of the limit gives that y=z. This completes the proof. □

Remark 19 If in Theorem 15-Theorem 18 μ=0, then we obtain Theorem 2.1-Theorem 2.3 of [10].

We get the following fixed point theorem in partially ordered metric spaces if we take λ=0 in the theorems of Section 3.

Theorem 20 Let (X,d,) be a complete partially ordered metric space and let T be a non-decreasing self-mapping defined on X. Suppose that a self-mapping T satisfies the following condition:

d(Tx,Ty){ μ d ( x , T x ) d ( x , T y ) + d ( y , T x ) d ( y , T y ) d ( y , T x ) + d ( x , T y ) if A 0 , 0 if A = 0 ,
(17)

for all x,yX with yx, where A=d(y,Tx)+d(x,Ty) and μ is a non-negative real with 0μ<1. Suppose also that either T is continuous or X satisfies the condition (OC). If there exists x 0 X with x 0 T x 0 , then T has a fixed point.

If (X,) satisfies the condition used in Theorem 18, then the uniqueness of a fixed point can be proved.

4 Applications

In this section we state some applications of the main results. The first result is the consequence of Theorem 2.

Corollary 21 Let (X,d,) be a T-orbitally complete partially ordered metric space and let T be a non-decreasing self-mapping defined on X. Suppose that a self-mapping T satisfies the following condition:

0 d ( T x , T y ) dsα 0 d ( x , T x ) d ( y , T y ) d ( x , y ) ds+β 0 d ( x , y ) ds+L 0 min { d ( x , T x ) , d ( y , T x ) } ds
(18)

for all distinct x,yX with xy and for α,β[0,1) with α+β<1, where L0. If there exists x 0 X with x 0 T x 0 then T has at least one fixed point.

Similarly, the following result is the consequence of Corollary 5.

Corollary 22 Let T be a continuous, non-decreasing self-map defined on a complete partially ordered metric space (X,d,). Suppose that T satisfies the following condition:

0 d ( T x , T y ) dsα 0 d ( x , T x ) d ( y , T y ) d ( x , y ) ds+β 0 d ( x , y ) ds
(19)

for any distinct x,yX with xy, where α,β[0,1) with α+β<1. Suppose there exists x 0 X with x 0 T x 0 . Then T has a fixed point.

The following result is the consequence of Theorem 12.

Corollary 23 Let (X,d,) be a partially ordered metric space. Let T:XX be a non-decreasing, continuous mapping. Suppose that a self-mapping T satisfies

0 d ( T x , T y ) dsα 0 α d ( T y , y ) [ 1 + d ( x , T x ) ] 1 + d ( x , y ) ds+β 0 d ( x , y ) ds+L 0 min { d ( x , T x ) , d ( x , T y ) , d ( y , T x ) } ds
(20)

for any x,yX with xy, and for some α,β[0,1) with α+β<1 and L0. Suppose that there exists x 0 X with x 0 T x 0 . Then T has a fixed point.