A fixed point problem under two constraint inequalities

Abstract

Let \((X,d)\) be a metric space. Suppose that the set X is equipped with two partial orders ⪯₁ and ⪯₂. Let \(T,A,B,C,D: X\to X\) be given operators. We provide sufficient conditions for the existence of a fixed point of T satisfying the two constraint inequalities: \(Ax\preceq_{1} Bx\) and \(Cx\preceq_{2} Dx\).

1 Introduction and basic definitions

Recently there have been many developments concerning the existence of fixed points for operators defined in a metric space equipped with a partial order. This trend was initiated by Turinici [1]. Next, Ran and Reurings [2] extended the Banach contraction principle to continuous monotone operators defined in a partially ordered metric space. They also presented some applications to the existence of positive solutions to certain classes of nonlinear matrix equations. The result obtained in [2] was extended and generalized by many authors in different directions (see [3–11] and the references therein).

Let \((X,d)\) be a metric space. Suppose that the set X is endowed with two partial orders ⪯₁ and ⪯₂. Let us consider five self-operators \(T,A,B,C,D: X\to X\). In this paper, we are concerned with the following problem: Find \(x\in X\) such that

$$ \left \{ \textstyle\begin{array}{l} x = Tx, \\ Ax \preceq_{1} Bx, \\ Cx \preceq_{2} Dx. \end{array}\displaystyle \right . $$

(1.1)

We obtain sufficient conditions for the existence of at least one solution to (1.1).

The following definitions will be used throughout the paper.

Definition 1.1

Let X be a nonempty set. Let ⪯ be a binary relation on X. We say that ⪯ is a partial order on X if the following conditions are satisfied:

1. (i)

   For every \(x\in X\), we have \(x\preceq x\).

2. (ii)

   For every \(x,y,z\in X\), we have

   $$x\preceq y, \quad y\preceq z\quad \Longrightarrow\quad x\preceq z. $$
3. (iii)

   For every \(x,y\in X\), we have

   $$x\preceq y,\quad y\preceq x\quad \Longrightarrow \quad x=y. $$

Definition 1.2

Let \((X,d)\) be a metric space and ⪯ be a partial order on X. We say that the partial order ⪯ is d-regular if the following condition is satisfied: For every sequences \(\{a_{n}\},\{b_{n}\}\subset X\), we have

$$\lim_{n\to\infty}d(a_{n},a)=\lim_{n\to\infty}d(b_{n},b)=0, \quad a_{n}\preceq b_{n} \mbox{ for all }n \quad \Longrightarrow\quad a\preceq b, $$

where \((a,b)\in X\times X\).

Example 1.3

Let \((X,\|\cdot\|)\) be a Banach space and P be a cone on X. Let us consider the partial order on X defined by

$$(x,y)\in X\times X, \quad x\preceq_{P} y\quad \Longleftrightarrow\quad y-x\in P. $$

Consider the metric d on X defined by

$$d(x,y)=\|x-y\|, \quad (x,y)\in X\times X. $$

Then \(\preceq_{P}\) is d-regular. In fact, suppose that \(\{a_{n}\}\) and \(\{b_{n}\}\) are two sequences in X such that

$$a_{n}\preceq_{P} b_{n}\quad \mbox{for all } n $$

and

$$\lim_{n\to\infty}d(a_{n},a)=\lim_{n\to\infty}d(b_{n},b)=0 $$

for some \((a,b)\in X\times X\). Since \(b_{n}-a_{n}\in P\) for all n and the sequence \(\{b_{n}-a_{n}\}\) converges to \(b-a\), the closure of the cone P yields \(b-a\in P\), that is, \(a\preceq_{P} b\).

Definition 1.4

Let X be a nonempty set endowed with two partial orders ⪯₁ and ⪯₂. Let \(T,A,B,C,D: X\to X\) be given operators. We say that the operator T is \((A,B,C,D,\preceq_{1},\preceq_{2})\)-stable, if the following condition is satisfied:

$$x\in X, \quad Ax\preceq_{1} Bx \quad \Longrightarrow\quad CTx \preceq_{2} DTx. $$

Example 1.5

Let \(X=\mathbb{R}\) and consider the standard order ≤ on X. Let \(A,B,C,D: X\to X\) be the operators defined by

$$\begin{aligned}& Ax=x,\qquad Bx=x^{2}, \qquad Cx=\exp(x), \\& Dx=\exp\bigl(x^{2}-2x+2\bigr),\qquad Tx=x+1, \quad x\in\mathbb{R}. \end{aligned}$$

Then the operator T is \((A,B,C,D,\leq,\leq)\)-stable. In fact, let \(x\in X\) be such that

$$Ax=x\leq Bx=x^{2}. $$

Then

$$x+1\leq x^{2}+1, $$

which yields

$$\exp(x+1)\leq\exp\bigl(x^{2}+1\bigr), $$

that is,

$$CTx\leq DTx. $$

Example 1.6

Let \(X=\mathbb{R}^{2}\). We consider the two partial orders ⪯₁ and ⪯₂ on X defined by

$$(a,b),(c,d)\in X, \quad (a,b)\preceq_{1} (c,d)\quad \Longleftrightarrow \quad a\leq c,\quad b\leq d $$

and

$$(a,b),(c,d)\in X, \quad (a,b)\preceq_{2} (c,d)\quad \Longleftrightarrow \quad a\leq c,\quad b\geq d. $$

Let us consider the operators \(T,A,B,C,D: X\to X\) defined by

$$\begin{aligned}& T(a,b) = (b,a+1), \\& A(a,b) = (a,2b), \\& B(a,b) = (a,3b), \\& C(a,b) = \bigl(\vert a\vert ,b\bigr), \\& D(a,b) = \biggl(\frac{(a+1)|a|}{|a|+1},b-1 \biggr) \end{aligned}$$

for all \((a,b)\in X\). We claim that T is \((A,B,C,D,\preceq_{1},\preceq _{2})\)-stable. In order to prove this claim, we take \(x=(a,b)\in X\) such that

$$Ax\preceq_{1} Bx, $$

which is equivalent (from the definition of ⪯₁) to

$$b\geq0. $$

On the other hand, under the above inequality, we have

$$CTx=C(b,a+1)=\bigl(\vert b\vert ,a+1\bigr)=(b,a+1) $$

and

$$DTx=D(b,a+1)= \biggl(\frac{(b+1)|b|}{|b|+1},a \biggr)=(b,a-1). $$

Clearly (from the definition of ⪯₂), we have

$$CTx\preceq_{2} DTx. $$

Then our claim is proved.

Now, we are ready to state and prove our main result.

2 Main result

Let us denote by Φ the set of functions \(\varphi: [0,\infty)\to [0,\infty)\) satisfying the following conditions:

(\(\Phi_{1}\)):

φ is a lower semi-continuous function.

(\(\Phi_{2}\)):

\(\varphi^{-1}(\{0\})=\{0\}\).

Our main result in this paper is giving by the following theorem.

Theorem 2.1

Let \((X,d)\) be a complete metric space endowed with two partial orders ⪯₁ and ⪯₂. Let \(T,A,B,C,D: X\to X\) be given operators. Suppose that the following conditions are satisfied:

1. (i)

   \(\preceq_{i}\) is d-regular, \(i=1,2\).

2. (ii)

   A, B, C, and D are continuous.

3. (iii)

   There exists \(x_{0}\in X\) such that

   $$Ax_{0}\preceq_{1} Bx_{0}. $$
4. (iv)

   T is \((A,B,C,D,\preceq_{1},\preceq_{2})\)-stable.

5. (v)

   T is \((C,D,A,B,\preceq_{2},\preceq_{1})\)-stable.

6. (vi)

   There exists \(\varphi\in\Phi\) such that

   $$Ax\preceq_{1} Bx,\quad Cy\preceq_{2} Dy\quad \Longrightarrow \quad d(Tx,Ty)\leq d(x,y)-\varphi\bigl(d(x,y)\bigr). $$

Then:

1. (I)

   The sequence \(\{T^{n}x_{0}\}\) converges to some \(x^{*}\in X\) satisfying

   $$Ax^{*}\preceq_{1} Bx^{*} \quad \textit{and} \quad Cx^{*} \preceq_{2} Dx^{*}. $$
2. (II)

   The point \(x^{*}\in X\) is a solution to (1.1).

Proof

Let us prove (I). Let \(x_{0}\in X\) be such that

$$Ax_{0}\preceq_{1} Bx_{0}. $$

Such a point exists from (iii). Let us consider the sequence \(\{x_{n}\} \subset X\) defined by

$$x_{n}=T^{n}x_{0}, \quad n=0,1,2,\ldots. $$

Since T is \((A,B,C,D,\preceq_{1},\preceq_{2})\)-stable (see (iv)), we have

$$Ax_{0}\preceq_{1} Bx_{0} \quad \Longrightarrow \quad CTx_{0}\preceq_{2} DTx_{0}, $$

that is,

$$Cx_{1}\preceq_{2} Dx_{1}. $$

Then we have

$$Ax_{0}\preceq_{1} Bx_{0} \quad \mbox{and} \quad Cx_{1}\preceq_{2} Dx_{1}. $$

Since T is \((C,D,A,B,\preceq_{2},\preceq_{1})\)-stable (see (v)),

$$Cx_{1}\preceq_{2} Dx_{1} \quad \Longrightarrow \quad ATx_{1}\preceq_{1}BTx_{1}, $$

that is,

$$Ax_{2}\preceq_{1} Bx_{2}. $$

Again, T is \((A,B,C,D,\preceq_{1},\preceq_{2})\)-stable; this yields

$$Ax_{2}\preceq_{1} Bx_{2} \quad \Longrightarrow \quad CTx_{2}\preceq_{2} DTx_{2}, $$

that is,

$$Cx_{3}\preceq_{2} Dx_{3}. $$

Thus we have

$$Ax_{2}\preceq_{1} Bx_{2}\quad \mbox{and} \quad Cx_{3}\preceq_{2} Dx_{3}. $$

By induction, we get

$$ Ax_{2n}\preceq_{1} Bx_{2n} \quad \mbox{and}\quad Cx_{2n+1}\preceq_{2} Dx_{2n+1}, \quad n=0,1,2,\ldots. $$

(2.1)

Using (2.1) and (vi), by symmetry, we have

$$ d(x_{n+1},x_{n})=d(Tx_{n},Tx_{n-1}) \leq d(x_{n-1},x_{n})-\varphi \bigl(d(x_{n-1},x_{n}) \bigr), \quad n=1,2,3,\ldots, $$

(2.2)

which yields

$$d(x_{n+1},x_{n})\leq d(x_{n},x_{n-1}), \quad n=1,2,3,\ldots. $$

Then \(\{d(x_{n+1},x_{n})\}\) is a decreasing sequence of positive numbers. Therefore, there exists some \(r\geq0\) such that

$$ \lim_{n\to\infty}d(x_{n+1},x_{n})=r. $$

(2.3)

From (2.2), we have

$$d(x_{n+1},x_{n})+\varphi\bigl(d(x_{n-1},x_{n}) \bigr)\leq d(x_{n-1},x_{n}),\quad n=1,2,3,\ldots, $$

which yields

$$\liminf_{n\to\infty}\bigl(d(x_{n+1},x_{n})+\varphi \bigl(d(x_{n-1},x_{n})\bigr)\bigr)\leq \liminf _{n\to\infty} d(x_{n-1},x_{n}). $$

Using (2.3) and the lower semi-continuity of φ, we obtain

$$r+\varphi(r)\leq r, $$

which implies that

$$r\in\varphi^{-1}\bigl(\{0\}\bigr). $$

Since \(\varphi^{-1}(\{0\})=\{0\}\), we get \(r=0\), i.e.,

$$ \lim_{n\to\infty}d(x_{n+1},x_{n})=0. $$

(2.4)

Now, we show that \(\{x_{n}\}\) is a Cauchy sequence in \((X,d)\). Suppose that \(\{x_{n}\}\) is not a Cauchy sequence. Then there exists some \(\varepsilon>0\) for which we find two sequences of positive integers \(\{ m(k)\}\) and \(\{n(k)\}\) such that, for all positive integers k,

$$ n(k)>m(k)>k,\qquad d(x_{m(k)}, x_{n(k)}) \geq \varepsilon,\qquad d(x_{m(k)}, x_{n(k)-1}) < \varepsilon. $$

(2.5)

From (2.5), we have

$$\begin{aligned} \varepsilon \leq& d(x_{m(k)}, x_{n(k)}) \\ \leq& d(x_{m(k)}, x_{n(k)-1})+d(x_{n(k)-1},x_{n(k)}) \\ < & \varepsilon+d(x_{n(k)-1},x_{n(k)}). \end{aligned}$$

Then, for all k, we have

$$\varepsilon\leq d(x_{m(k)}, x_{n(k)})< \varepsilon+d(x_{n(k)-1},x_{n(k)}). $$

Passing to the limit as \(k\to\infty\) and using (2.4), we get

$$ \lim_{k\to\infty}d(x_{m(k)}, x_{n(k)})= \varepsilon. $$

(2.6)

On the other hand, we have

$$\bigl\vert d(x_{n(k)+1}, x_{m(k)})-d(x_{m(k)},x_{n(k)}) \bigr\vert \leq d( x_{n(k)+1},x_{n(k)})\to0 \quad \mbox{as } k\to \infty\mbox{ (from (2.4))}. $$

Then from (2.6), we have

$$ \lim_{k\to\infty}d(x_{n(k)+1}, x_{m(k)})= \varepsilon. $$

(2.7)

We have also

$$\bigl\vert d(x_{m(k)}, x_{n(k)})-d(x_{n(k)},x_{m(k)-1}) \bigr\vert \leq d( x_{m(k)-1},x_{m(k)})\to0 \quad \mbox{as } k\to \infty\mbox{ (from (2.4))}. $$

Then from (2.6), we have

$$ \lim_{k\to\infty}d(x_{n(k)}, x_{m(k)-1})= \varepsilon. $$

(2.8)

Similarly,

$$\bigl\vert d(x_{n(k)+1}, x_{m(k)})-d(x_{n(k)+1}, x_{m(k)+1})\bigr\vert \leq d(x_{m(k)},x_{m(k)+1})\to0\quad \mbox{as } k\to\infty\mbox{ (from (2.4))}. $$

Then from (2.7), we have

$$ \lim_{k\to\infty}d(x_{n(k)+1}, x_{m(k)+1})= \varepsilon. $$

(2.9)

Observe that, for all k, there exists a positive integer \(0\leq i(k)\leq1\) such that

$$n(k)-m(k)+i(k)\equiv1(2). $$

From (2.1), for all \(k>1\), we have

$$Ax_{n(k)}\preceq_{1} Bx_{n(k)}\quad \mbox{and}\quad Cx_{m(k)-i(k)}\preceq_{2} Dx_{m(k)-i(k)} $$

or

$$Ax_{m(k)-i(k)}\preceq_{1} Bx_{m(k)-i(k)}\quad \mbox{and}\quad Cx_{n(k)}\preceq_{2} Dx_{n(k)}. $$

Then from (vi), by symmetry, we have

$$d(Tx_{n(k)},Tx_{m(k)-i(k)})\leq d(x_{n(k)},x_{m(k)-i(k)})- \varphi \bigl(d(x_{n(k)},x_{m(k)-i(k)})\bigr),\quad k>1, $$

that is,

$$ d(x_{n(k)+1},x_{m(k)-i(k)+1})\leq d(x_{n(k)},x_{m(k)-i(k)})- \varphi \bigl(d(x_{n(k)},x_{m(k)-i(k)})\bigr),\quad k>1. $$

(2.10)

Set

$$\Lambda=\bigl\{ k>1: i(k)=0\bigr\} \quad \mbox{and}\quad \Delta=\bigl\{ k>1: i(k)=1 \bigr\} . $$

We consider two cases.

• Case 1. \(|\Lambda|=\infty\).

From (2.10), we get

$$d(x_{n(k)+1},x_{m(k)+1})+\varphi\bigl(d(x_{n(k)},x_{m(k)}) \bigr)\leq d(x_{n(k)},x_{m(k)}), \quad k\in\Lambda, $$

which gives us

$$\liminf_{k\to\infty} \bigl(d(x_{n(k)+1},x_{m(k)+1})+ \varphi \bigl(d(x_{n(k)},x_{m(k)})\bigr) \bigr)\leq\liminf _{k\to\infty} d(x_{n(k)},x_{m(k)}). $$

Using (2.9), (2.6), and the lower semi-continuity of φ, we obtain

$$\varepsilon+\varphi(\varepsilon)\leq\varepsilon, $$

which yields

$$\varepsilon\in\varphi^{-1}\bigl(\{0\}\bigr). $$

Since \(\varphi^{-1}(\{0\})=\{0\}\), we get \(\varepsilon=0\), which is a contradiction with \(\varepsilon>0\).

• Case 2. \(|\Lambda|<\infty\).

In this case, we have \(|\Delta|=\infty\). Moreover, from (2.10), we have

$$d(x_{n(k)+1},x_{m(k)})+\varphi\bigl(d(x_{n(k)},x_{m(k)-1}) \bigr)\leq d(x_{n(k)},x_{m(k)-1}), \quad k\in\Delta, $$

which gives us

$$\liminf_{k\to\infty} \bigl(d(x_{n(k)+1},x_{m(k)})+ \varphi \bigl(d(x_{n(k)},x_{m(k)-1})\bigr) \bigr)\leq\liminf _{k\to\infty} d(x_{n(k)},x_{m(k)-1}). $$

Using (2.7), (2.8), and the lower semi-continuity of φ, we obtain

$$\varepsilon+\varphi(\varepsilon)\leq\varepsilon, $$

which yields \(\varepsilon\in\varphi^{-1}(\{0\})=\{0\}\), that is, a contradiction with \(\varepsilon>0\).

Therefore, we deduce that \(\{x_{n}\}\) is a Cauchy sequence in \((X,d)\). Since \((X,d)\) is complete, there exists some \(x^{*}\in X\) such that

$$ \lim_{n\to\infty}d\bigl(x_{n},x^{*}\bigr)=0. $$

(2.11)

On the other hand, from (2.1), we have

$$Ax_{2n}\preceq_{1} Bx_{2n}, \quad n=0,1,2,\ldots. $$

Using the continuity of A and B, it follows from (2.11) that

$$\lim_{n\to\infty}d\bigl(Ax_{2n},Ax^{*}\bigr)= \lim _{n\to\infty}d\bigl(Bx_{2n},Bx^{*}\bigr)=0. $$

Since ⪯₁ is d-regular, we get

$$ Ax^{*}\preceq_{1} Bx^{*}. $$

(2.12)

Similarly, from (2.1), we have

$$Cx_{2n+1}\preceq_{2} Dx_{2n+1},\quad n=0,1,2,\ldots. $$

Using the continuity of C and D, it follows from (2.11) that

$$\lim_{n\to\infty}d\bigl(Cx_{2n+1},Cx^{*}\bigr)= \lim _{n\to\infty}d\bigl(Dx_{2n+1},Dx^{*}\bigr)=0. $$

Since ⪯₂ is d-regular, we get

$$ Cx^{*}\preceq_{2} Dx^{*}. $$

(2.13)

Thus we proved (I).

Now, let us prove (II). Using (2.12), (2.13), (2.1), and (vi), we have

$$\begin{aligned} d\bigl(Tx^{*},x^{*}\bigr) \leq& d\bigl(Tx^{*},Tx_{2n}\bigr)+d \bigl(x_{2n+1},x^{*}\bigr) \\ \leq& d\bigl(x^{*},x_{2n}\bigr)-\varphi\bigl(d\bigl(x^{*},x_{2n} \bigr)\bigr)+d\bigl(x_{2n+1},x^{*}\bigr),\quad n=0,1,2,\ldots, \end{aligned}$$

that is,

$$d\bigl(Tx^{*},x^{*}\bigr)+\varphi\bigl(d\bigl(x^{*},x_{2n}\bigr)\bigr)\leq d \bigl(x^{*},x_{2n}\bigr)+d\bigl(x_{2n+1},x^{*}\bigr),\quad n=0,1,2, \ldots. $$

Then

$$\liminf_{n\to\infty} \bigl(d\bigl(Tx^{*},x^{*}\bigr)+\varphi\bigl(d \bigl(x^{*},x_{2n}\bigr)\bigr) \bigr)\leq\liminf_{n\to\infty} \bigl(d\bigl(x^{*},x_{2n}\bigr)+d\bigl(x_{2n+1},x^{*}\bigr) \bigr). $$

Using the lower semi-continuity of φ, the fact that \(\varphi (0)=0\), and (2.11), we obtain

$$d\bigl(x^{*},Tx^{*}\bigr)=0, $$

which yields

$$ Tx^{*}=x^{*}. $$

(2.14)

Therefore, from (2.12), (2.13), and (2.14), we deduce that \(x^{*}\in X\) is a solution to (1.1). This ends the proof. □

In the next section, we present some consequences following from Theorem 2.1.

3 Some consequences

3.1 A fixed point problem under one constraint equality

Here, we are concerned with the following problem: Find \(x\in X\) such that

$$ \left \{ \textstyle\begin{array}{l} x = Tx, \\ Ax = Bx, \end{array}\displaystyle \right . $$

(3.1)

where \(T,A,B: X\to X\) are given operators and \((X,d)\) is a metric space endowed with a certain partial order ⪯. Observe that (3.1) is equivalent to (1.1) with

$$\preceq_{1}\, =\, \preceq_{2}\, =\, \preceq,\qquad C=B \quad \mbox{and} \quad D=A. $$

Then from Theorem 2.1, we obtain the following result.

Corollary 3.1

Let \((X,d)\) be a complete metric space endowed with a certain partial order ⪯. Let \(T,A,B: X\to X\) be three given operators. Suppose that the following conditions are satisfied:

1. (i)

   ⪯ is d-regular.

2. (ii)

   A and B are continuous.

3. (iii)

   There exists \(x_{0}\in X\) such that

   $$Ax_{0}\preceq Bx_{0}. $$
4. (iv)

   For all \(x\in X\), we have

   $$Ax\preceq Bx\quad \Longrightarrow \quad BTx\preceq ATx. $$
5. (v)

   For all \(x\in X\), we have

   $$Bx\preceq Ax\quad \Longrightarrow \quad ATx\preceq BTx. $$
6. (vi)

   There exists \(\varphi\in\Phi\) such that

   $$Ax\preceq Bx, \quad By\preceq Ay \quad \Longrightarrow \quad d(Tx,Ty)\leq d(x,y)-\varphi \bigl(d(x,y)\bigr). $$

Then:

1. (I)

   The sequence \(\{T^{n}x_{0}\}\) converges to some \(x^{*}\in X\) satisfying \(Ax^{*}=Bx^{*}\).

2. (II)

   The point \(x^{*}\in X\) is a solution to (3.1).

3.2 A common fixed point problem

Let us consider the following problem: Find \(x\in X\) such that

$$ \left \{ \textstyle\begin{array}{l} x = Tx, \\ x = Bx, \end{array}\displaystyle \right . $$

(3.2)

where \(T,B: X\to X\) are given operators and \((X,d)\) is a metric space endowed with a certain partial order ⪯. Observe that (3.2) is equivalent to (3.1) with \(A=I_{X}\), the identity mapping on X. So, take \(A=I_{X}\) in Corollary 3.1, We obtain the following result.

Corollary 3.2

Let \((X,d)\) be a complete metric space endowed with a certain partial order ⪯. Let \(T,B: X\to X\) be two given operators. Suppose that the following conditions are satisfied:

1. (i)

   ⪯ is d-regular.

2. (ii)

   B is continuous.

3. (iii)

   There exists \(x_{0}\in X\) such that

   $$x_{0}\preceq Bx_{0}. $$
4. (iv)

   For all \(x\in X\), we have

   $$x\preceq Bx \quad \Longrightarrow \quad BTx\preceq Tx. $$
5. (v)

   For all \(x\in X\), we have

   $$Bx\preceq x\quad \Longrightarrow \quad Tx\preceq BTx. $$
6. (vi)

   There exists \(\varphi\in\Phi\) such that

   $$x\preceq Bx, \quad By\preceq y \quad \Longrightarrow \quad d(Tx,Ty)\leq d(x,y)- \varphi\bigl(d(x,y)\bigr). $$

Then:

1. (I)

   The sequence \(\{T^{n}x_{0}\}\) converges to some \(x^{*}\in X\) satisfying \(x^{*}=Bx^{*}\).

2. (II)

   The point \(x^{*}\in X\) is a solution to (3.2).

Next, we present an example that illustrates the above result.

Example 3.3

Let \(X\subset\mathbb{R}^{2}\) be the set defined by

$$X=\bigl\{ (4,0),(0,0),(6,0),(3,0),(3,1)\bigr\} . $$

Let ⪯ be the partial order on X defined by

$$(x,y),(z,w)\in X, \quad (x,y)\preceq(z,w)\quad \Longleftrightarrow\quad x\leq z,\quad y\leq w. $$

We endow X with the metric d defined by

$$d\bigl((x,y),(z,w)\bigr)=\sqrt{(x-z)^{2}+(y-w)^{2}},\quad (x,y),(z,w)\in X. $$

Let \(T,B: X\to X\) be the mappings defined by

$$ \left \{ \textstyle\begin{array}{l} T(4,0) = (4,0), \\ T(0,0) = (6,0), \\ T(6,0) = (3,0), \\ T(3,0) = (4,0), \\ T(3,1) = (0,0) \end{array}\displaystyle \right . \quad \mbox{and}\quad \left \{ \textstyle\begin{array}{l} B(4,0) = (4,0), \\ B(0,0) = (3,0), \\ B(6,0) = (0,0), \\ B(3,0) = (6,0), \\ B(3,1) = (4,0). \end{array}\displaystyle \right . $$

Observe that

$$u\in X, \quad u\preceq Bu \quad \Longleftrightarrow\quad u\in\bigl\{ (4,0),(0,0),(3,0)\bigr\} . $$

However,

$$v\in X,\quad Bv\preceq v \quad \Longleftrightarrow \quad v\in\bigl\{ (4,0),(6,0) \bigr\} . $$

Let \(u\in X\) be such that \(u\preceq Bu\).

For \(u=(4,0)\), we have

$$BTu=B(4,0)=(4,0)=Tu. $$

For \(u=(0,0)\), we have

$$BTu=B(6,0)=(0,0)\preceq(6,0)=Tu. $$

For \(u=(3,0)\), we have

$$BTu=B(4,0)=(4,0)=Tu. $$

Then we have

$$u\in X, \quad u\preceq Bu \quad \Longrightarrow\quad BTu\preceq Tu. $$

Let \(v\in X\) be such that \(Bv\preceq v\).

For \(v=(4,0)\), we have

$$Tv=T(4,0)=(4,0)=BTv. $$

For \(v=(6,0)\), we have

$$Tv=T(6,0)=(3,0)=(6,0)=BTv. $$

Then we have

$$v\in X, \quad Bv\preceq v \quad \Longrightarrow \quad Tv\preceq BTv. $$

Now, let \((u,v)\in X\times X\) be such that

$$u\preceq Bu\quad \mbox{and}\quad Bv\preceq v. $$

We have

$$\begin{aligned} (u,v) \in&\bigl\{ \bigl((4,0),(4,0)\bigr),\bigl((4,0),(6,0)\bigr), \bigl((0,0),(4,0)\bigr), \\ &\bigl((0,0),(6,0)\bigr),\bigl((3,0),(4,0)\bigr), \bigl((3,0),(6,0)\bigr)\bigr\} . \end{aligned}$$

For \((u,v)=((4,0),(4,0))\), we have

$$d(Tu,Tv)=d\bigl((4,0),(4,0)\bigr)=0. $$

For \((u,v)=((4,0),(6,0))\), we have

$$d(Tu,Tv)=d\bigl((4,0),(3,0)\bigr)=1= \frac{d(u,v)}{2}. $$

For \((u,v)=((0,0),(4,0))\), we have

$$d(Tu,Tv)=d\bigl((6,0),(4,0)\bigr)=2= \frac{d(u,v)}{2}. $$

For \((u,v)=((0,0),(6,0))\), we have

$$d(Tu,Tv)=d\bigl((6,0),(3,0)\bigr)=3= \frac{d(u,v)}{2}. $$

For \((u,v)=((3,0),(4,0))\), we have

$$d(Tu,Tv)=d\bigl((4,0),(4,0)\bigr)=0. $$

For \((u,v)=((3,0),(6,0))\), we have

$$d(Tu,Tv)=d\bigl((4,0),(3,0)\bigr)=1< \frac{3}{2}=\frac{d(u,v)}{2}. $$

Then we have

$$u\preceq Bu,\quad Bv\preceq v \quad \Longrightarrow \quad d(Tu,Tv)\leq d(u,v)- \varphi\bigl(d(u,v)\bigr), $$

where \(\varphi(t)=\frac{t}{2}\), \(t\geq0\). So, all the required conditions of Corollary 3.2 are satisfied. Observe that \(x^{*}=(4,0)\) is a common fixed point of T and B. Observe also that

$$d\bigl(T(4,0),T(3,1)\bigr)=d\bigl((4,0),(0,0)\bigr)=4>\sqrt{2}=d \bigl((4,0),(3,1)\bigr), $$

which shows that T is not a contraction on X.

Taking \(B=T\) in Corollary 3.2, we obtain the following fixed point result.

Corollary 3.4

Let \((X,d)\) be a complete metric space endowed with a certain partial order ⪯. Let \(T: X\to X\) be a given operator. Suppose that the following conditions are satisfied:

1. (i)

   ⪯ is d-regular.

2. (ii)

   T is continuous.

3. (iii)

   There exists \(x_{0}\in X\) such that

   $$x_{0}\preceq Tx_{0}. $$
4. (iv)

   For all \(x\in X\), we have

   $$x\preceq Tx \quad \Longrightarrow \quad T^{2}x\preceq Tx. $$
5. (v)

   For all \(x\in X\), we have

   $$Tx\preceq x\quad \Longrightarrow \quad Tx\preceq T^{2}x. $$
6. (vi)

   There exists \(\varphi\in\Phi\) such that

   $$x\preceq Tx,\quad Ty\preceq y \quad \Longrightarrow \quad d(Tx,Ty)\leq d(x,y)- \varphi\bigl(d(x,y)\bigr). $$

Then the sequence \(\{T^{n}x_{0}\}\) converges to a fixed point of T.

4 Conclusion

In this paper, we obtained sufficient conditions for the existence of a fixed point of a certain operator under two constraint inequalities with respect to two partial orders. The used technique can also be adapted for any finite number of constraint inequalities and other contractive conditions. An interesting question is the existence of a best proximity point of a certain operator under constraint inequalities. Such a question will be studied in a future work.