Coupled best proximity point theorems for proximally g-Meir-Keeler type mappings in partially ordered metric spaces

Abkar, Ali; Ghods, Samaneh; Azizi, Azizollah

doi:10.1186/s13663-015-0355-9

Research
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Published: 08 July 2015

Coupled best proximity point theorems for proximally g-Meir-Keeler type mappings in partially ordered metric spaces

Ali Abkar¹,
Samaneh Ghods¹ &
Azizollah Azizi¹

Fixed Point Theory and Applications volume 2015, Article number: 107 (2015) Cite this article

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Abstract

In this paper we first introduce the notion of proximally g-Meir-Keeler type mappings, then we study the existence and uniqueness of coupled best proximity points for these mappings. This generalization is in line with Edelstein’s generalization of Meir-Keeler type mappings, as well as in line with the recent one used in (Eshaghi Gordji in Math. Probl. Eng. 2012:150363, 2012).

1 Introduction

The Banach contraction principle [1] is a classical and powerful tool in nonlinear analysis. This principle has been generalized in different directions by many authors (see, for example, [2–6] and the references therein). Afterward, Bhaskar and Lakshmikantham [7] introduced the notion of coupled fixed points of a given two-variable mapping F. They also established the uniqueness of coupled fixed point for the mapping F, and successfully applied their results to the problem of existence and uniqueness of solution for a periodic boundary value problem. Following their lines of research, some authors have extended these results in several directions (see, for instance, [8, 9]).

The well-known best approximation theorem, due to Fan [10], asserts that if A is a nonempty, compact and convex subset of a normed linear space X, and T is a continuous mapping from A to X, then there exists a point $x\in A$ such that the distance of x to Tx is equal to the distance of Tx to A. Such a point x is called a best approximant of T in A. This result was in turn generalized by several authors (see, for example, [11–13], and the references therein).

In the sequel, X is a nonempty set, and $(X,d)$ is a metric space. In [2], Meir and Keeler generalized the well-known Banach contraction principle. In 1969, Meir and Keeler defined weak uniformly strict contraction as follows: given $\epsilon>0$, there exists $\delta>0$ such that

$$\epsilon\le d(x,y)< \epsilon+\delta\quad \implies\quad d(Fx, Fy)< \epsilon $$

for a self-map F on X. They proved that every weakly uniformly strict contraction on a complete metric space $(X,d)$ has a unique fixed point. In this way, they were able to recapture earlier results due to Edelstein, as well as that of Boyd and Wong.

Recently, Eshaghi Gordji et al. [14], defined the generalized g-Meir-Keeler type contractions and proved some coupled fixed point theorems under a generalized g-Meir-Keeler-contractive condition. In this way, they improved results of Bhaskar and Lakshmikantham [7]. We shall recall their definitions here.

Definition 1.1

[14]

Let $(X,\leq) $ be a partially ordered set and d be a metric on X. Let $F: X \times X \rightarrow X $ and $g : X \rightarrow X $ be two given mappings. We say that F is a generalized g-Meir-Keeler type contraction if, for every $\epsilon> 0 $, there exists $\delta(\epsilon) > 0 $ such that, for all $x,y,u,v \in X $ with $g(x) \leq g(u) $ and $g(y) \geq g(v) $,

$$\epsilon\leq\frac{1}{2} \bigl[d\bigl(g(x),g(u)\bigr) + d\bigl(g(y),g(v) \bigr)\bigr] < \epsilon+ \delta(\epsilon)\quad \Longrightarrow\quad d \bigl(F(x,y),F(u,v)\bigr)< \epsilon. $$

They also defined the mixed strict g-monotone property.

Definition 1.2

[14]

Let $(X,\leq)$ be a partially ordered set and $F: X \times X \rightarrow X $ and $g : X \rightarrow X$ be two given mappings. We say that F has the mixed strict g-monotone property if, for any $x,y \in X$,

$$\begin{aligned}& x_{1}, x_{2} \in X , \quad g(x_{1}) < g(x_{2}) \quad \Longrightarrow\quad F(x_{1},y) < F(x_{2},y), \\& y_{1}, y_{2} \in X , \quad g(y_{1}) < g(y_{2}) \quad \Longrightarrow\quad F(x,y_{1}) > F(x,y_{2}). \end{aligned}$$

Since we shall be dealing with coupled best proximity points, the following definitions will be needed.

Definition 1.3

Let A, B be nonempty subsets of a metric space $(X,d)$, and $T: A \rightarrow B$ be a non-self mapping. A point $x^{*} \in A$ is called a best proximity point of T if $d(x^{*},T(x^{*}))=d(A,B)$, where

$$d(A,B):= \inf\bigl\{ d(x,y): x\in A, y \in B\bigr\} . $$

In this paper we shall use the following symbols:

$$\begin{aligned}& A_{0}=\bigl\{ x \in A: d(x,y)=d(A,B) \text{ for some } y\in B\bigr\} , \\& B_{0}=\bigl\{ y \in B: d(x,y)=d(A,B) \text{ for some } x \in A\bigr\} . \end{aligned}$$

It is well known that $A_{0}$ is contained in the boundary of A (see, for instance, [15]). For more information on some recent results in this topic, we refer the interested reader to [16–20]. In [21], the authors defined the notion of a coupled best proximity point, as follows.

Definition 1.4

Let A, B be nonempty subsets of a metric space $(X,d) $ and $F: A \times A \rightarrow B$ be a mapping. A point $(x_{1},x_{2}) \in A \times A$ is called a coupled best proximity point of F if

$$d\bigl(x_{1},F(x_{1},x_{2})\bigr)= d \bigl(x_{2},F(x_{2},x_{1})\bigr)=d(A,B). $$

It is easy to see that if $A=B$ in Definition 1.4, then a coupled best proximity point is a coupled fixed point of F.

Pragadeeswarar et al. [22] defined a proximally coupled contraction as follows.

Definition 1.5

Let $(X,d,\leq)$ be a partially ordered metric space and A, B be nonempty subsets of X. A mapping $F: A \times A \rightarrow B $ is said to be a proximally coupled contraction if there exists $k\in(0,1)$ such that whenever

$$\left \{ \textstyle\begin{array}{l} x_{1}\leq x_{2},\qquad y_{1}\geq y_{2}, \\ d(u_{1},F(x_{1},y_{1}))=d(A,B), \\ d(u_{2},F(x_{2},y_{2}))=d(A,B), \end{array}\displaystyle \right . $$

it follows that

$$d(u_{1},u_{2})\leq\frac{k}{2} \bigl[d(x_{1},x_{2}) + d(y_{1},y_{2})\bigr], $$

where $x_{1},x_{2},y_{1},y_{2},u_{1},u_{2} \in A$.

Motivated by the results of [14] and [22], in this paper we first introduce the notions of proximal mixed strict monotone property and proximally Meir-Keeler type functions and prove the existence and uniqueness of coupled best proximity point theorems for these mappings. This will be implemented in Section 2. In Section 3, we shall discuss some more generalizations of this notions. An example will be provided to illustrate our result.

2 Proximally Meir-Keeler type mappings

In this section we will define proximal mixed strict monotone property and proximally Meir-Keeler type mappings, and prove some theorems in this regard. In the next section we deal with some further generalizations of this topics. Therefore, we shall not provide any proof for the statements made in this section, instead we will comment on how these facts can be inferred from their counterparts in Section 3; indeed, the next section is devoted to proximally g-Meir-Keeler type mappings, as well as to proximal mixed strict g-monotone property, so that if we put $g=\mathrm{identity}$, we get all the results stated in Section 2.

Definition 2.1

Let $(X,d,\leq)$ be a partially ordered metric space, A, B be nonempty subsets of X, and $F: A \times A \rightarrow B$ be a given mapping. We say that F has the proximal mixed strict monotone property if, for all $x,y \in A$,

$$\left \{ \textstyle\begin{array}{l} x_{1}< x_{2}, \\ d(u_{1},F(x_{1},y))=d(A,B), \\ d(u_{2},F(x_{2},y))=d(A,B), \end{array}\displaystyle \displaystyle \right . $$

then $u_{1}< u_{2}$ and if

$$\left \{ \textstyle\begin{array}{l} y_{1}\leq y_{2}, \\ d(u_{3},F(x,y_{1}))=d(A,B), \\ d(u_{4},F(x,y_{2}))=d(A,B), \end{array}\displaystyle \right . $$

then $u_{4}\leq u_{3}$, where $x_{1},x_{2},y_{1},y_{2},u_{1},u_{2}, u_{3},u_{4}\in A$.

Definition 2.2

Let $(X,d,\leq)$ be a partially ordered metric space, A, B be nonempty subsets of X, and $F: A \times A \rightarrow B$ be a given mapping. We say that F is a proximally Meir-Keeler type function if, for every $\epsilon> 0 $, there exist $\delta(\epsilon) >0$ and $k\in(0,1)$ such that whenever

$$\left \{ \textstyle\begin{array}{l} x_{1}\leq x_{2}, \qquad y_{1}\geq y_{2}, \\ d(u_{1},F(x_{1},y_{1}))=d(A,B), \\ d(u_{2},F(x_{2},y_{2}))=d(A,B), \end{array}\displaystyle \right . $$

then

$$\epsilon\leq\frac{k}{2} \bigl[d(x_{1},x_{2}) + d(y_{1},y_{2})\bigr] < \epsilon+ \delta(\epsilon) \quad \Longrightarrow\quad d(u_{1},u_{2})< \epsilon, $$

where $x_{1},x_{2},y_{1},y_{2},u_{1},u_{2} \in A$.

Proposition 2.3

Let $(X,d,\leq)$ be a partially ordered metric space, A, B be nonempty subsets of X, and let $F: A \times A \rightarrow B$ be a given mapping such that the conditions

$$\left \{ \textstyle\begin{array}{l} x_{1}\leq x_{2}, \qquad y_{1}\geq y_{2}, \\ d(u_{1},F(x_{1},y_{1}))=d(A,B), \\ d(u_{2},F(x_{2},y_{2}))=d(A,B), \end{array}\displaystyle \right . $$

imply

$$\exists k \in(0,1);\quad d(u_{1},u_{2}) \leq \frac{k}{2} \bigl[d(x_{1},x_{2}) + d(y_{1},y_{2}) \bigr], $$

where $x_{1},x_{2},y_{1},y_{2},u_{1},u_{2} \in A$. Then F is a proximally Meir-Keeler type function.

From now on, we suppose that $(X,d,\leq)$ is a partially ordered metric space endowed with the following partial ordering: for all $(x,y),(u,v) \in X \times X $,

$$(u,v) \leq(x,y) \quad \Longleftrightarrow \quad u < x, \qquad v \geq y. $$

Lemma 2.4

Let $(X,d,\leq)$ be a partially ordered metric space, A, B be nonempty subsets of X, and let $F: A \times A \rightarrow B$ be a given mapping. If F is a proximally Meir-Keeler type function, and

$$\left \{ \textstyle\begin{array}{l} (x_{1},y_{1}) \leq(x_{2},y_{2}), \\ d(u_{1},F(x_{1},y_{1}))=d(A,B), \\ d(u_{2},F(x_{2},y_{2}))=d(A,B), \end{array}\displaystyle \right . $$

then

$$\exists k \in(0,1); \quad d(u_{1},u_{2}) \leq \frac{k}{2} \bigl[d(x_{1},x_{2}) + d(y_{1},y_{2}) \bigr], $$

where $x_{1}, x_{2},y_{1},y_{2},u_{1},u_{2} \in A$.

Theorem 2.5

Let $(X,d,\leq)$ be a partially ordered complete metric space. Let A, B be nonempty closed subsets of the metric space $(X,d)$ such that $A_{0}\neq\emptyset$. Let $F: A \times A \rightarrow B$ be a given mapping satisfying the following conditions:

(a)
F is continuous;
(b)
F has the proximal mixed strict monotone property on A such that $F(A_{0},A_{0})\subseteq B_{0}$;
(c)
F is a proximally Meir-Keeler type function;
(d)
there exist elements $(x_{0},y_{0}), (x_{1},y_{1})\in A_{0} \times A_{0} $ such that $d(x_{1},F(x_{0},y_{0}))=d(A,B)$ with $x_{0}< x_{1}$, and $d(y_{1},F(y_{0},x_{0}))=d(A,B)$ with $y_{0}\geqslant y_{1}$.

Then there exists $(x,y) \in A \times A$ such that $d(x,F(x,y))=d(A,B)$ and $d(y,F(y,x))=d(A,B)$.

Theorem 2.6

Let $(X,d,\leq)$ be a partially ordered complete metric space. Let A be a nonempty closed subset of the metric space $(X,d)$. Let $F: A \times A \rightarrow A$ be a given mapping satisfying the following conditions:

(a)
F is continuous;
(b)
F has the proximal mixed strict monotone property on A;
(c)
F is a proximally Meir-Keeler type function;
(d)
there exist elements $(x_{0},y_{0}), (x_{1},y_{1})\in A \times A $ such that $x_{1}=F(x_{0},y_{0})$ with $x_{0}< x_{1}$, and $y_{1}=F(y_{0},x_{0})$ with $y_{0}\geqslant y_{1}$.

Then there exists $(x,y) \in A \times A$ such that $d(x,F(x,y))=0$ and $d(y,F(y,x))=0$.

Theorem 2.7

Let $(X,d,\leq)$ be a partially ordered complete metric space. Let A, B be nonempty closed subsets of the metric space $(X,d)$ such that $A_{0}\neq\emptyset$. Let $F: A \times A \rightarrow B$ be a given mapping satisfying the following conditions:

(a)
if $\{x_{n}\}$ is a nondecreasing sequence in A such that such that $x_{n}\rightarrow x$, then $x_{n}< x$ and if $\{y_{n}\}$ is a nonincreasing sequence in A such that $y_{n}\rightarrow y$, then $y_{n}\geqslant y$;
(b)
F has the proximal mixed strict monotone property on A such that $F(A_{0},A_{0})\subseteq B_{0}$;
(c)
F is a proximally Meir-Keeler type function;
(d)
there exist elements $(x_{0},y_{0}), (x_{1},y_{1})\in A_{0} \times A_{0} $ such that $d(x_{1},F(x_{0},y_{0}))=d(A,B)$ with $x_{0}< x_{1}$, and $d(y_{1},F(y_{0},x_{0}))=d(A,B)$ with $y_{0}\geqslant y_{1}$.

Then there exists $(x,y) \in A \times A$ such that $d(x,F(x,y))=d(A,B)$ and $d(y,F(y,x))=d(A,B)$.

Remark 2.8

Theorems 2.5 and 2.6 hold true, if we replace the continuity of F by the following.

If $\{x_{n}\}$ is a nondecreasing sequence in A such that $x_{n}\rightarrow x$, then $x_{n}< x$ and if $\{y_{n}\}$ is a nonincreasing sequence in A such that $y_{n}\rightarrow y$, then $y_{n}\geqslant y$.

Now, we consider the product space $A \times A $ with the following partial ordering: for all $(x,y), (u,v) \in A \times A $,

$$(u,v) \leq(x,y) \quad \Longleftrightarrow \quad u < x,\qquad v \geq y. $$

Theorem 2.9

Suppose that all the hypotheses of Theorem 2.5 hold and, further, for all $(x,y),(x^{\ast},y^{\ast}) \in A_{0} \times A_{0}$, there exists $(u,v) \in A_{0} \times A_{0}$ such that $(u,v) $ is comparable with $(x,y)$, $(x^{\ast},y^{\ast})$. Then there exists a unique $(x,y) \in A \times A$ such that $d(x,F(x,y))=d(A,B)$ and $d(y,F(y,x))=d(A,B)$.

Example 2.10

Let X be the real numbers endowed with usual metric and consider the usual ordering $(x,y)\leq(u,v)\Longleftrightarrow x\leq u$, $y\leq v$. Suppose that $A=[3,+\infty)$ and $B=(-\infty,-3]$. Then A, B are nonempty closed subsets of X. Also, we have $d(A,B)=6$, $A_{0}=\lbrace3 \rbrace$ and $B_{0}= \lbrace-3 \rbrace$. Define a mapping $F: A \times A \rightarrow B$ as follows:

$$F(x,y)=\frac{-x-y}{2}. $$

Then F is continuous and $F(3,3)=-3$, i.e., $F(A_{0},A_{0}) \subseteq B_{0}$.

Note also that the other hypotheses of Theorem 2.9 are satisfied, then there exists a unique point $(3,3) \in A \times A $ such that $d(3,F(3,3))=6=d(A,B)$.

3 Proximally g-Meir-Keeler type mappings

Let X be a nonempty set. We recall that an element $(x,y) \in X \times X$ is called a coupled coincidence point of two mappings $F: X \times X \rightarrow X $ and $g: X \rightarrow X $ provided that $F(x,y)= g(x) $ and $F(y,x)= g(y)$ for all $x,y \in X$. Also, we say that F and g are commutative if $g(F(x,y))= F(g(x),g(y))$ for all $x,y \in X$.

We now present the following definitions.

Definition 3.1

Let $(X,d,\leq)$ be a partially ordered metric space, A, B be nonempty subsets of X, and $F: A \times A \rightarrow B$ and $g : A \rightarrow A$ be two given mappings. We say that F has the proximal mixed strict g-monotone property provided that for all $x,y \in A$, if

$$\left \{ \textstyle\begin{array}{l} g(x_{1})< g(x_{2}), \\ d(g(u_{1}),F(g(x_{1}),g(y)))=d(A,B), \\ d(g(u_{2}),F(g(x_{2}),g(y)))=d(A,B), \end{array}\displaystyle \displaystyle \right . $$

then $g(u_{1})< g(u_{2})$, and if

$$\left \{ \textstyle\begin{array}{l} g(y_{1})\leq g(y_{2}), \\ d(g(u_{3}),F(g(x),g(y_{1})))=d(A,B), \\ d(g(u_{4}),F(g(x),g(y_{2})))=d(A,B), \end{array}\displaystyle \right . $$

then $g(u_{4})\leq g(u_{3})$, where $x_{1},x_{2},y_{1},y_{2},u_{1},u_{2},u_{3},u_{4}\in A$.

Definition 3.2

Let $(X,d,\leq)$ be a partially ordered metric space, A, B be nonempty subsets of X, and $F: A \times A \rightarrow B$ and $g : A \rightarrow A$ be two given mappings. We say that F is a proximally g-Meir-Keeler type function if, for every $\epsilon> 0$, there exist $\delta(\epsilon) > 0 $ and $k\in(0,1)$ such that whenever

$$\left \{ \textstyle\begin{array}{l} g(x_{1})\leq g(x_{2}), \qquad g(y_{1})\geq g(y_{2}), \\ d(g(u_{1}),F(g(x_{1}),g(y_{1})))=d(A,B), \\ d(g(u_{2}),F(g(x_{2}),g(y_{2})))=d(A,B), \end{array}\displaystyle \right . $$

then

$$\epsilon\leq\frac{k}{2} \bigl[d\bigl(g(x_{1}),g(x_{2}) \bigr) + d\bigl(g(y_{1}),g(y_{2})\bigr)\bigr] < \epsilon+ \delta(\epsilon) \quad \Longrightarrow\quad d\bigl(g(u_{1}),g(u_{2}) \bigr)< \epsilon, $$

where $x_{1},x_{2},y_{1},y_{2},u_{1},u_{2} \in A$.

Proposition 3.3

Let $(X,d,\leq)$ be a partially ordered metric space and A, B be nonempty subsets of X, and let $F: A \times A \rightarrow B$ and $g: A \rightarrow A$ be two given mappings such that the conditions

$$\left \{ \textstyle\begin{array}{l} g(x_{1})\leq g(x_{2}), \qquad g(y_{1})\geq g(y_{2}), \\ d(g(u_{1}),F(g(x_{1}),g(y_{1})))=d(A,B), \\ d(g(u_{2}),F(g(x_{2}),g(y_{2})))=d(A,B), \end{array}\displaystyle \right . $$

imply

$$ \exists k \in(0,1); \quad d\bigl(g(u_{1}),g(u_{2})\bigr) \leq\frac{k}{2} \bigl[d\bigl(g(x_{1}),g(x_{2})\bigr) + d \bigl(g(y_{1}),g(y_{2})\bigr)\bigr], $$

(1)

where $x_{1},x_{2},y_{1},y_{2},u_{1},u_{2} \in A$. Then F is a proximally g-Meir-Keeler type function.

Proof

Suppose (1) is satisfied. For every $\epsilon> 0$, we set $\epsilon_{0}=\epsilon/2$ and $\delta(\epsilon_{0})=\epsilon_{0}$. Now, if $\epsilon_{0} \leq\frac{k}{2} [d(g(x_{1}),g(x_{2})) + d(g(y_{1}),g(y_{2}))] < \epsilon+ \delta(\epsilon)$, it follows from (1) that $d(g(u_{1}),g(u_{2})) \leq\frac{k}{2} [d(g(x_{1}),g(x_{2})) + d(g(y_{1}),g(y_{2}))] < \epsilon_{0} + \delta(\epsilon_{0})= \epsilon$, i.e., $d(g(u_{1}),g(u_{2}))<\epsilon$. □

Remark 3.4

If we set $g=I$, the identity map, in Proposition 3.3, then Proposition 2.3 follows.

From now on, we suppose that $(X,d,\leq) $ is a partially ordered metric space endowed with the following partial ordering: for all $(x,y),(u,v) \in X \times X $,

$$(u,v) \leq(x,y) \quad \Longleftrightarrow \quad u < x, \qquad v \geq y. $$

Lemma 3.5

Let $(X,d,\leq)$ be a partially ordered metric space and A, B be nonempty subsets of X and let $F: A \times A \rightarrow B$ and $g : A \rightarrow A$ be two given mappings. If F is a proximally g-Meir-Keeler type function, and

$$\left \{ \textstyle\begin{array}{l} (g(x_{1}),g(y_{1})) \leq (g(x_{2}),g(y_{2})), \\ d(g(u_{1}),F(g(x_{1}),g(y_{1})))=d(A,B), \\ d(g(u_{2}),F(g(x_{2}),g(y_{2})))=d(A,B), \end{array}\displaystyle \right . $$

then

$$\exists k \in(0,1);\quad d\bigl(g(u_{1}),g(u_{2})\bigr) \leq \frac{k}{2} \bigl[d\bigl(g(x_{1}),g(x_{2})\bigr) + d \bigl(g(y_{1}),g(y_{2})\bigr)\bigr], $$

where $x_{1},x_{2},y_{1},y_{2},u_{1},u_{2} \in A$.

Proof

Let $x_{1}, x_{2}, y_{1}, y_{2} \in A$ be such that

$$\left \{ \textstyle\begin{array}{l} (g(x_{1}),g(y_{1})) \leq(g(x_{2}),g(y_{2})), \\ d(g(u_{1}),F(g(x_{1}),g(y_{1})))=d(A,B), \\ d(g(u_{2}),F(g(x_{2}),g(y_{2})))=d(A,B), \end{array}\displaystyle \right . $$

then $d(g(x_{1}),g(x_{2})) + d(g(y_{1}),g(y_{2})) > 0$.

Let $k_{0}\in(0,1)$ be arbitrary. Since F is a proximally g-Meir-Keeler type function, for

$$\epsilon= \frac{k_{0}}{2}\bigl[d\bigl(g(x_{1}),g(x_{2}) \bigr) + d\bigl(g(y_{1}),g(y_{2})\bigr)\bigr], $$

there exist $\delta(\epsilon) > 0$ and $k=k_{0}\in(0,1)$ such that for all $x_{1},x_{2},y_{1},y_{2},u_{1},u_{2} \in A$ for which $(g(x_{1}),g(y_{1})) \leq(g(x_{2}),g(y_{2}))$, and

$$\left \{ \textstyle\begin{array}{l} d(g(u_{1}),F(g(x_{1}),g(y_{1})))=d(A,B), \\ d(g(u_{2}),F(g(x_{2}),g(y_{2})))=d(A,B), \end{array}\displaystyle \right . $$

we have

$$\epsilon\leq\frac{k}{2} \bigl[d\bigl(g(x_{1}),g(x_{2}) \bigr) + d\bigl(g(y_{1}),g(y_{2})\bigr)\bigr]< \epsilon+ \delta(\epsilon) \quad \Longrightarrow \quad d\bigl(g(u_{1}),g(u_{2}) \bigr)< \epsilon, $$

therefore,

$$\begin{aligned} d\bigl(g(u_{1}),g(u_{2})\bigr)&< \frac{k_{0}}{2} \bigl[d \bigl(g(x_{1}),g(x_{2})\bigr) + d\bigl(g(y_{1}),g(y_{2}) \bigr)\bigr] \\ &=\frac{k}{2} \bigl[d\bigl(g(x_{1}),g(x_{2}) \bigr) + d\bigl(g(y_{1}),g(y_{2})\bigr)\bigr]. \end{aligned}$$

This completes the proof. □

Remark 3.6

If in Lemma 3.5, we set $g=I$ the identity map, Lemma 2.4 follows.

Lemma 3.7

Let $(X,d,\leq)$ be a partially ordered metric space and A, B be nonempty subsets of X, $A_{0}\neq\emptyset$ and $F: A \times A \rightarrow B $ and $g : A \rightarrow A $ be two given mappings. If F has the proximal mixed strict g-monotone property, with $g(A_{0}) = A_{0} $, $F(A_{0},A_{0})\subseteq B_{0}$, and if $(g(x_{1}),g(y_{1})) \leq(g(x_{2}),g(y_{2}))$,

$$\begin{aligned}& d\bigl(g(x_{2}),F\bigl(g(x_{1}),g(y_{1})\bigr) \bigr)=d(A,B), \end{aligned}$$

(2)

$$\begin{aligned}& d\bigl(g(u),F\bigl(g(x_{2}),g(y_{2})\bigr)\bigr)=d(A,B), \end{aligned}$$

(3)

where $x_{1},x_{2},y_{1},y_{2},u \in A_{0}$, then $g(x_{2}) < g(u)$.

Proof

Since $g(A_{0}) = A_{0} $, $F(A_{0},A_{0})\subseteq B_{0}$, it follows that $F(g(x_{2}),g(y_{1}))\in B_{0}$. Hence there exists $g(u_{1}^{*}) \in A_{0}$ such that

$$ d\bigl(g\bigl(u_{1}^{*}\bigr),F\bigl(g(x_{2}),g(y_{1}) \bigr)\bigr)=d(A,B). $$

(4)

Using the fact that F has the proximal mixed strict g-monotone property, together with (2) and (4), we have

$$\left \{ \textstyle\begin{array}{l} g(x_{1})< g(x_{2}), \\ d(g(x_{2}),F(g(x_{1}),g(y_{1})))=d(A,B), \\ d(g(u_{1}^{*}),F(g(x_{2}),g(y_{1})))=d(A,B), \end{array}\displaystyle \displaystyle \right . $$

then

$$ g(x_{2})< g\bigl(u_{1}^{*}\bigr). $$

(5)

Also, from the proximal mixed strict g-monotone property of F with (3), (5), we have

$$\left \{ \textstyle\begin{array}{l} g(y_{2})\leq g(y_{1}), \\ d(g(u),F(g(x_{2}),g(y_{2})))=d(A,B), \\ d(g(u_{1}^{*}),F(g(x_{2}),g(y_{1})))=d(A,B), \end{array}\displaystyle \right . $$

then

$$ g\bigl(u_{1}^{*}\bigr)\leq g(u). $$

(6)

Now from (5), (6) we get $g(x_{2}) < g(u)$, hence the proof is complete. □

Lemma 3.8

Let $(X,d,\leq)$ be a partially ordered metric space and A, B be nonempty subsets of X, $A_{0}\neq\emptyset$, and $F: A \times A \rightarrow B$ and $g : A \rightarrow A$ be two given mappings. Let F have the proximal mixed strict g-monotone property, with $g(A_{0}) = A_{0} $, $F(A_{0},A_{0})\subseteq B_{0}$. If

$$\left \{ \textstyle\begin{array}{l} (g(x_{1}),g(y_{1})) \leq(g(x_{2}),g(y_{2})), \\ d(g(y_{2}),F(g(y_{1}),g(x_{1})))=d(A,B), \\ d(g(u),F(g(y_{2}),g(x_{2})))=d(A,B), \end{array}\displaystyle \right . $$

where $x_{1}, x_{2},y_{1},y_{2}, u \in A_{0}$, then $g(y_{2})> g(u)$.

Proof

The proof is similar to that of Lemma 3.7, so we omit the details. □

Theorem 3.9

Let $(X,d,\leq)$ be a partially ordered complete metric space. Let A, B be nonempty closed subsets of the metric space $(X,d)$ such that $A_{0}\neq\emptyset$. Let $F: A \times A \rightarrow B $ and $g : A \rightarrow A $ be two given mappings satisfying the following conditions:

(a)
F and g are continuous;
(b)
F has the proximal mixed strict g-monotone property on A such that $g(A_{0}) = A_{0} $, $F(A_{0},A_{0})\subseteq B_{0} $;
(c)
F is a proximally g-Meir-Keeler type function;
(d)
there exist elements $(x_{0},y_{0}), (x_{1},y_{1})\in A_{0} \times A_{0} $ such that $d(g(x_{1}),F(g(x_{0}),g(y_{0})))=d(A,B)$ with $g(x_{0})< g(x_{1})$, and $d(g(y_{1}),F(g(y_{0}),g(x_{0})))=d(A,B)$ with $g(y_{0})\geq g(y_{1})$.

Then there exists $(x,y) \in A \times A$ such that $d(g(x),F(g(x),g(y)))=d(A,B)$ and $d(g(y),F(g(y), g(x)))=d(A,B)$.

Proof

Let $(x_{0},y_{0}),(x_{1},y_{1}) \in A_{0} \times A_{0} $ be such that $d(g(x_{1}),F(g(x_{0}),g(y_{0})))=d(A,B)$ with $g(x_{0})< g(x_{1})$, and $d(g(y_{1}),F(g(y_{0}),g(x_{0})))=d(A,B)$ with $g(y_{0})\geq g(y_{1})$.

Since $F(A_{0},A_{0})\subseteq B_{0}$, $g(A_{0}) = A_{0}$, there exists an element $(x_{2},y_{2}) \in A_{0} \times A_{0} $ such that $d(g(x_{2}),F(g(x_{1}),g(y_{1})))=d(A,B)$ and $d(g(y_{2}),F(g(y_{1}),g(x_{1})))=d(A,B)$.

Hence from Lemma 3.7 and Lemma 3.8 we obtain $g(x_{1})< g(x_{2})$ and $g(y_{1})> g(y_{2})$.

Continuing this process, we construct the sequences $\{x_{n}\}$ and $\{ y_{n}\}$ in $A_{0}$ such that

$$d\bigl( g(x_{n+1}),F\bigl(g(x_{n}),g(y_{n})\bigr) \bigr)=d(A,B), \quad \forall n \geq0, $$

with

$$ g(x_{0}) < g(x_{1}) < \cdots< g(x_{n}) < g(x_{n+1}) < \cdots $$

(7)

and

$$d\bigl( g(y_{n+1}),F\bigl(g(y_{n}),g(x_{n})\bigr) \bigr)=d(A,B), \quad \forall n \geqslant0, $$

with

$$ g(y_{0}) > g(y_{1}) > \cdots> g(y_{n}) > g(y_{n+1}) > \cdots. $$

(8)

Define

$$ \delta_{n} := d\bigl(g(x_{n}),g(x_{n+1})\bigr) + d \bigl(g(y_{n}),g(y_{n+1})\bigr). $$

(9)

Since F is a proximally g-Meir-Keeler type function, $d( g(x_{n}),F(g(x_{n-1}),g(y_{n-1})))=d(A,B)$, and

$$d\bigl( g(x_{n+1}),F\bigl(g(x_{n}),g(y_{n}) \bigr)\bigr)=d(A,B),\quad g(x_{n-1}) \leq g(x_{n}) ,g(y_{n-1}) \geq g(y_{n}), $$

it follows from Lemma 3.5 that

$$ d\bigl(g(x_{n}),g(x_{n+1})\bigr) \leq\frac{k}{2} \bigl[d\bigl(g(x_{n-1}),g(x_{n})\bigr) + d\bigl( g(y_{n-1}) , g(y_{n})\bigr)\bigr]. $$

(10)

We also have $d( g(y_{n}),F(g(y_{n-1}),g(x_{n-1})))=d(A,B)$, and

$$d\bigl(g(y_{n+1}),F\bigl(g(y_{n}),g(x_{n})\bigr) \bigr)=d(A,B),\quad g(x_{n-1})< g(x_{n}), g(y_{n-1}) > g(y_{n}), $$

hence using the fact that F is a proximally g-Meir-Keeler type function, it follows from Lemma 3.5 that

$$ d\bigl(g(y_{n}),g(y_{n+1})\bigr) \leq\frac{k}{2} \bigl[d\bigl(g(y_{n-1}),g(y_{n})\bigr) + d\bigl( g(x_{n-1}) , g(x_{n})\bigr)\bigr]. $$

(11)

It now follows from (9), (10), and (11) that

$$\delta_{n} \leq k(\delta_{n-1}) \leq k^{2}( \delta_{n-2}) \leq\cdots\leq k^{n}(\delta_{0}) $$

or

$$ \delta_{n} \leq k^{n}(\delta_{0}). $$

(12)

Now, we prove that $\{g(x_{n})\} $ and $\{g(y_{n})\}$ are Cauchy sequences. For $n>m$, it follows from the triangle inequality and (12) that

$$\begin{aligned}& d\bigl(g(x_{n}),g(x_{m})\bigr)+ d\bigl(g(y_{n}),g(y_{m}) \bigr) \\& \quad \leq d\bigl(g(x_{n}),g(x_{n-1})\bigr)+ d \bigl(g(y_{n}),g(y_{n-1})\bigr)+\cdots+ d\bigl(g(x_{m+1}),g(x_{m}) \bigr)+ d\bigl(g(y_{m+1}),g(y_{m})\bigr) \\& \quad \leq\bigl(k^{n-1}+ \cdots+ k^{m}\bigr) ( \delta_{0}) \\& \quad \leq\frac {k^{m}}{1-k}(\delta_{0}). \end{aligned}$$

Let $\epsilon>0$ be given. Choose a natural number N such that $\frac{k^{m}}{1-k}(\delta_{0})<\epsilon$, for $m> N$. Thus,

$$d\bigl(g(x_{n}),g(x_{m})\bigr)+ d\bigl(g(y_{n}),g(y_{m}) \bigr)< \epsilon, \quad n>m. $$

Therefore, $\{g(x_{n})\} $ and $\{g(y_{n})\} $ are Cauchy sequences.

Since A is a closed subset of the complete metric space X, there exist $x^{1},y^{1} \in A $ such that

$$\lim_{n\rightarrow\infty}g(x_{n}) = x^{1},\qquad \lim _{n\rightarrow\infty}g(y_{n}) = y^{1}. $$

Note that $x_{n}, y_{n} \in A_{0}$, $g(A_{0}) = A_{0}$, so that $g(x_{n}), g(y_{n}) \in A_{0}$. Since $A_{0}$ is closed, we conclude that $(x^{1},y^{1})\in A_{0} \times A_{0} $, i.e., there exist $x,y \in A_{0}$ such that $g(x)=x^{1}$, $g(y)=y^{1}$. Therefore

$$ g(x_{n})\rightarrow g(x), \qquad g(y_{n})\rightarrow g(y). $$

(13)

Since $\{g(x_{n})\} $ is monotone increasing and $\{g(y_{n})\}$ is monotone decreasing, we have

$$ g(x_{n})< g(x),\qquad g(y_{n})> g(y). $$

(14)

From (7), (8),

$$ d\bigl(g(x_{n+1}),F\bigl(g(x_{n}),g(y_{n})\bigr) \bigr)=d(A,B) $$

(15)

and

$$ d\bigl(g(y_{n+1}),F\bigl(g(y_{n}),g(x_{n})\bigr) \bigr)=d(A,B). $$

(16)

Since F is continuous, we have, from (13),

$$F\bigl(g(x_{n}),g(y_{n})\bigr)\rightarrow F\bigl(g(x),g(y) \bigr) $$

and

$$F\bigl(g(y_{n}),g(x_{n})\bigr)\rightarrow F\bigl(g(y),g(x) \bigr). $$

Thus, the continuity of the metric d implies that

$$ d\bigl(g(x_{n+1}),F\bigl(g(x_{n}),g(y_{n})\bigr) \bigr)\rightarrow d\bigl(g(x),F\bigl(g(x),g(y)\bigr)\bigr) $$

(17)

and

$$ d\bigl(g(y_{n+1}),F\bigl(g(y_{n}),g(x_{n})\bigr) \bigr)\rightarrow d\bigl(g(y),F\bigl(g(y),g(x)\bigr)\bigr). $$

(18)

Therefore from (15), (16), (17), (18),

$$d\bigl(g(x),F\bigl(g(x),g(y)\bigr)\bigr)=d(A,B), \qquad d\bigl(g(y),F \bigl(g(y),g(x)\bigr)\bigr)=d(A,B). $$

□

Remark 3.10

If we set $g=I$ in Theorem 3.9, Theorem 2.5 follows.

Corollary 3.11

Let $(X,d,\leq)$ be a partially ordered complete metric space. Let A be a nonempty closed subsets of the metric space $(X,d)$. Let $F: A \times A \rightarrow A$ and $g : A \rightarrow A$ be two given mappings satisfying the following conditions:

(a)
F and g are continuous;
(b)
F has the proximal mixed strict g-monotone property on A such that $F(g(A),g(A))\subseteq g(A)$;
(c)
F is a proximally g-Meir-Keeler type function;
(d)
there exist elements $(x_{0},y_{0}), (x_{1},y_{1})\in A \times A$ such that $g(x_{1})=F(g(x_{0}),g(y_{0}))$ with $g(x_{0})< g(x_{1})$, and $g(y_{1})=F(g(y_{0}),g(x_{0}))$ with $g(y_{0})\geqslant g(y_{1})$.

Then there exists $(x,y) \in A \times A$ such that

$$d\bigl(g(x),F\bigl(g(x),g(y)\bigr)\bigr)=0, \qquad d\bigl(g(y),F\bigl(g(y),g(x) \bigr)\bigr)=0. $$

Theorem 3.12

Let $(X,d,\leq)$ be a partially ordered complete metric space. Let A, B be nonempty closed subsets of the metric space $(X,d)$ such that $A_{0}\neq\emptyset$. Let $F: A \times A \rightarrow B $ and $g : A \rightarrow A $ be two given mappings satisfying the following conditions:

(a)
g is continuous;
(b)
F has the proximal mixed strict g-monotone property on A such that $F(A_{0},A_{0})\subseteq B_{0}$, $g(A_{0}) = A_{0}$;
(c)
F is a proximally g-Meir-Keeler type function;
(d)
there exist elements $(x_{0},y_{0}), (x_{1},y_{1})\in A_{0} \times A_{0} $ such that $d(g(x_{1}),F(g(x_{0}),g(y_{0})))=d(A,B)$ with $g(x_{0})< g(x_{1})$, and $d(g(y_{1}),F(g(y_{0}),g(x_{0})))=d(A,B)$ with $g(y_{0})\geqslant g(y_{1})$;
(e)
if $\{x_{n}\}$ is a nondecreasing sequence in A such that $x_{n}\rightarrow x$, then $x_{n}< x$ and if $\{y_{n}\}$ is a nonincreasing sequence in A such that $y_{n}\rightarrow y$, then $y_{n}\geqslant y$.

Then there exists $(x,y)\in A\times A$ such that

$$d\bigl(g(x),F\bigl(g(x),g(y)\bigr)\bigr)=d(A,B),\qquad d\bigl(g(y),F \bigl(g(y),g(x)\bigr)\bigr)=d(A,B). $$

Proof

As in the proof of Theorem 3.9, there exist sequences $\{x_{n}\}$ and $\{y_{n}\}$ in $A_{0}$ such that $d(g(x_{n+1}),F(g(x_{n}),g(y_{n})))=d(A,B)$ with

$$ g(x_{n}) < g(x_{n+1}), \quad \forall n \geqslant0, $$

(19)

and $d( g(y_{n+1}),F(g(y_{n}),g(x_{n})))=d(A,B)$ with

$$ g(y_{n}) > g(y_{n+1}), \quad \forall n \geqslant0. $$

(20)

Also, $g(x_{n})\rightarrow g(x)$ and $g(y_{n})\rightarrow g(y)$.

From (e), we get $g(x_{n})< g(x)$, and $g(y_{n})\geqslant g(y)$. Since $F(A_{0},A_{0})\subseteq B_{0}$, it follows that $F(g(x),g(y))$ and $F(g(y),g(x))$ are in $B_{0}$. Therefore, there exists $(x^{\star}_{1},y^{\star}_{1})\in A_{0} \times A_{0} $ such that $d(x^{\star}_{1},F(g(x),g(y)))=d(A,B)$ and $d(y^{\star }_{1},F(g(y),g(x)))=d(A,B)$.

Since $g(A_{0}) = A_{0}$, there exist $x^{*}, y^{*} \in A_{0}$ such that $g(x^{*})=x_{1}^{*}$, $g(y^{*})=y_{1}^{*}$. Hence,

$$ d\bigl(g\bigl(x^{\star}\bigr),F\bigl(g(x),g(y)\bigr)\bigr)=d(A,B) $$

(21)

and

$$ d\bigl(g\bigl(y^{\star}\bigr),F\bigl(g(y),g(x)\bigr)\bigr)=d(A,B). $$

(22)

Since $g(x_{n})< g(x)$, $g(y_{n})\geqslant g(y)$ and F is a proximally g-Meir-Keeler type function, it follows from Lemma 3.5, (19), and (21) that

$$d\bigl(g(x_{n+1}),g\bigl(x^{\star}\bigr)\bigr) \leq \frac{k}{2} \bigl[d\bigl(g(x_{n}),g(x)\bigr) + d \bigl(g(y_{n}),g(y)\bigr)\bigr]. $$

Similarly, from Lemma 3.5 and (20) and (22) we obtain

$$d\bigl(g(y_{n+1}),g\bigl(y^{\star}\bigr)\bigr) \leq \frac{k}{2} \bigl[d\bigl(g(y_{n}),g(y)\bigr) + d \bigl(g(x_{n}),g(x)\bigr)\bigr]. $$

By taking the limit of the above two inequalities, we get $g(x)=g(x^{\star})$ and $g(y)=g(y^{\star})$. □

Remark 3.13

Corollary 3.11 holds true if we replace the continuity of F by the following statement.

If $\{x_{n}\}$ is a nondecreasing sequence in A such that $x_{n}\rightarrow x$, then $x_{n}< x$ and if $\{y_{n}\}$ is a nonincreasing sequence in A such that $y_{n}\rightarrow y$, then $y_{n}\geqslant y$.

We now consider the product space $A \times A $ with the following partial ordering: for all $(x,y),(u,v) \in A \times A $,

$$(u,v) \leq(x,y) \quad \Longleftrightarrow \quad u < x, \qquad v \geq y. $$

Theorem 3.14

Suppose that all the hypotheses of Theorem 3.9 hold and, further, for all $(x,y),(x^{\ast},y^{\ast}) \in A_{0} \times A_{0} $, there exists $(u,v) \in A_{0} \times A_{0} $ such that $(u,v) $ is comparable to $(x,y)$, $(x^{\ast},y^{\ast})$ (with respect to the ordering in $A \times A$). Then there exists a unique $(x,y) \in A \times A$ such that $d(g(x),F(g(x),g(y)))=d(A,B)$ and $d(g(y),F(g(y),g(x)))=d(A,B)$.

Proof

By Theorem 3.9, there exists an element $(x,y) \in A \times A$ such that

$$ d\bigl(g(x),F\bigl(g(x),g(y)\bigr)\bigr)=d(A,B) $$

(23)

and

$$ d\bigl(g(y),F\bigl(g(y),g(x)\bigr)\bigr)=d(A,B). $$

(24)

Now, suppose that there exists an element $(x^{\ast},y^{\ast}) \in A \times A$ such that $d(g(x^{\ast}),F(g(x^{\ast}),g(y^{\ast})))=d(A,B)$ and $d(g(y^{\ast }),F(g(y^{\ast}),g(x^{\ast})))=d(A,B)$.

First, let $(g(x),g(y))$ be comparable to $(g(x^{\ast}),g(y^{\ast}))$ with respect to the ordering in $A \times A$.

Since $d(g(x),F(g(x),g(y)))=d(A,B)$, and $d(g(x^{\ast}),F(g(x^{\ast}),g(y^{\ast})))=d(A,B)$, it follows from Lemma 3.5 that

$$ \exists k \in(0,1); \quad d\bigl(g(x),g\bigl(x^{\ast}\bigr)\bigr) \leq \frac{k}{2} \bigl[d\bigl(g(x),g\bigl(x^{\ast}\bigr)\bigr) + d \bigl(g(y),g\bigl(y^{\ast}\bigr)\bigr)\bigr]. $$

(25)

Similarly, from $d(g(y),F(g(y),g(x)))=d(A,B)$, $d(g(y^{\ast }),F(g(y^{\ast}),g(x^{\ast})))=d(A,B)$ and Lemma 3.5, we have

$$ d\bigl(g(y),g\bigl(y^{\ast}\bigr)\bigr) \leq\frac{k}{2} \bigl[d \bigl(g(x),g\bigl(x^{\ast}\bigr)\bigr) + d\bigl(g(y),g\bigl(y^{\ast} \bigr)\bigr)\bigr]. $$

(26)

Adding (25) and (26), we get

$$ d\bigl(g(x),g\bigl(x^{\ast}\bigr)\bigr)+ d\bigl(g(y),g \bigl(y^{\ast}\bigr)\bigr) \leq k \bigl[d\bigl(g(x),g\bigl(x^{\ast} \bigr)\bigr) + d\bigl(g(y),g\bigl(y^{\ast}\bigr)\bigr)\bigr]. $$

(27)

It follows that $d(g(x),g(x^{\ast}))+ d(g(y),g(y^{\ast}))=0$ and so $g(x)=g(x^{\ast })$ and $g(y)=g(y^{\ast})$.

Second, let $(g(x),g(y))$ is not comparable to $(g(x^{\ast}),g(y^{\ast}))$, then there exists $(g(u_{1}),g(v_{1})) $ in $A_{0} \times A_{0} $ which is comparable to $(g(x),g(y))$ and $(g(x^{\ast}),g(y^{\ast}))$. Since $F(A_{0},A_{0})\subseteq B_{0}$ and $g(A_{0})=A_{0}$, there exists $(g(u_{2}),g(v_{2}))\in A_{0} \times A_{0}$ such that $d(g(u_{2}),F(g(u_{1}),g(v_{1})))=d(A,B)$ and $d(g(v_{2}),F(g(v_{1}),g(u_{1})))=d(A,B)$.

Without loss of generality assume that $(g(u_{1}),g(v_{1})) \leq(g(x),g(y))$, i.e., $g(u_{1})< g(x)$ and $g(v_{1})\geq g(y)$. Therefore $(g(y),g(x)) \leq(g(v_{1}),g(u_{1}))$. Now, from Lemmas 3.7 and 3.8, we have

$$\left \{ \textstyle\begin{array}{l} (g(u_{1}),g(v_{1})) \leq(g(x),g(y)), \\ d(g(u_{2}),F(g(u_{1}),g(v_{1})))=d(A,B), \\ d(g(x),F(g(x),g(y)))=d(A,B)=d(A,B), \end{array}\displaystyle \right . $$

then $g(u_{2}) < g(x)$ and in the same way

$$\left \{ \textstyle\begin{array}{ll} (g(u_{1}),g(v_{1})) \leq(g(x),g(y)), \\ d(g(v_{2}),F(g(v_{1}),g(u_{1})))=d(A,B), \\ d(g(y),F(g(y),g(x)))=d(A,B)=d(A,B), \end{array}\displaystyle \right . $$

then $g(v_{2})> g(y)$.

Continuing this process, we obtain sequences $\{x_{n}\} $ and $\{y_{n}\} $ such that $g(u_{n})< g(x)$, $g(v_{n})> g(y)$,

$$\begin{aligned}& d\bigl(g(u_{n+1}),F\bigl(g(u_{n}),g(v_{n})\bigr) \bigr)=d(A,B), \end{aligned}$$

(28)

$$\begin{aligned}& d\bigl(g(v_{n+1}),F\bigl(g(v_{n}),g(u_{n})\bigr) \bigr)=d(A,B). \end{aligned}$$

(29)

Since F is a proximally g-Meir-Keeler type function, from Lemma 3.5, (23), (28),

$$ \exists k \in(0,1);\quad d\bigl(g(u_{n+1}),g(x)\bigr) \leq \frac{k}{2} \bigl[d\bigl(g(u_{n}),g(x)\bigr) + d \bigl(g(v_{n}),g(y)\bigr)\bigr],\quad \forall n\geq 0. $$

(30)

Similarly from Lemma 3.5, (24), (29), we have

$$ d\bigl(g(v_{n+1}),g(y)\bigr) \leq\frac{k}{2} \bigl[d \bigl(g(v_{n}),g(y)\bigr) + d\bigl(g(u_{n}),g(x)\bigr)\bigr], \quad \forall n\geq0. $$

(31)

Adding (30) and (31), we have

$$\begin{aligned}& d\bigl(g(u_{n+1}),g(x)\bigr)+ d\bigl(g(v_{n+1}),g(y)\bigr) \\& \quad \leq k \bigl[d\bigl(g(u_{n}),g(x)\bigr) + d\bigl(g(v_{n}),g(y) \bigr)\bigr] \\& \quad \leq k^{2} \bigl[d\bigl(g(u_{n-1}),g(x)\bigr) + d \bigl(g(v_{n-1}),g(y)\bigr)\bigr] \\& \quad \leq\cdots \leq k^{n+1} \bigl[d\bigl(g(u_{0}),g(x) \bigr) + d\bigl(g(v_{0}),g(y)\bigr)\bigr]. \end{aligned}$$

As $n \rightarrow\infty$, we get $d(g(u_{n+1}),g(x))+ d(g(v_{n+1}),g(y))\rightarrow0$, i.e., $g(u_{n}) \rightarrow g(x)$ and $g(v_{n})\rightarrow g(y)$. Similarly, we can prove $g(u_{n}) \rightarrow g(x^{\ast})$ and $g(v_{n})\rightarrow g(y^{\ast})$. Hence, $g(x)=g(x^{\ast})$ and $g(y)=g(y^{\ast})$ and the proof is complete. □

We shall illustrate the above theorem by the following example.

Example 3.15

Let X be the real numbers endowed with usual metric and consider the usual ordering $(x,y)\leq(u,v)\Longleftrightarrow x\leq u $, $y\leq v$. Suppose that $A=[2,+\infty)$ and $B=(-\infty,-2]$. Then A, B are nonempty closed subsets of X. Also, we have $d(A,B)=4$ and $A_{0}=\lbrace2 \rbrace$ and $B_{0}= \lbrace-2 \rbrace$.

Define the mappings $F: A \times A \rightarrow B$ and $g : A \rightarrow A$ as follows:

$$F(x,y)=\frac{-x-y-4}{4} \quad \mbox{and} \quad g(x)=2x-2. $$

Then F and g are continuous and $F(2,2)=-2$ and $g(2)=2$, i.e., $F(A_{0},A_{0}) \subseteq B_{0}$ and $g(A_{0})= A_{0}$.

Note also that the other hypotheses of Theorem 3.14 are satisfied, then there exists a unique point $(2,2) \in A \times A$ such that $d(g(2),F(g(2),g(2)))=4=d(A,B)$.

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Acknowledgements

This research was done while the first author was on a sabbatical leave at State University of New York at Albany (SUNYA); he wishes to thank SUNYA for its hospitality and Imam Khomeini International University for the financial support.

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Department of Mathematics, Imam Khomeini International University, Qazvin, 34149, Iran
Ali Abkar, Samaneh Ghods & Azizollah Azizi

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Ali Abkar
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Samaneh Ghods
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Azizollah Azizi
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Correspondence to Ali Abkar.

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All authors contributed equally and significantly in writing this paper. All authors read and approved the final manuscript.

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Abkar, A., Ghods, S. & Azizi, A. Coupled best proximity point theorems for proximally g-Meir-Keeler type mappings in partially ordered metric spaces. Fixed Point Theory Appl 2015, 107 (2015). https://doi.org/10.1186/s13663-015-0355-9

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Received: 25 March 2015
Accepted: 17 June 2015
Published: 08 July 2015
DOI: https://doi.org/10.1186/s13663-015-0355-9

Coupled best proximity point theorems for proximally g-Meir-Keeler type mappings in partially ordered metric spaces

Abstract

1 Introduction

Definition 1.1

Definition 1.2

Definition 1.3

Definition 1.4

Definition 1.5

2 Proximally Meir-Keeler type mappings

Definition 2.1

Definition 2.2

Proposition 2.3

Lemma 2.4

Theorem 2.5

Theorem 2.6

Theorem 2.7

Remark 2.8

Theorem 2.9

Example 2.10

3 Proximally g-Meir-Keeler type mappings

Definition 3.1

Definition 3.2

Proposition 3.3

Proof

Remark 3.4

Lemma 3.5

Proof

Remark 3.6

Lemma 3.7

Proof

Lemma 3.8

Proof

Theorem 3.9

Proof

Remark 3.10

Corollary 3.11

Theorem 3.12

Proof

Remark 3.13

Theorem 3.14

Proof

Example 3.15

References

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