New results on coupled fixed point theory in metric spaces endowed with a directed graph

The purpose of this paper is to present some existence results for coupled fixed points of contraction type operators in metric spaces endowed with a directed graph. Our results generalize the results obtained by Gnana Bhaskar and Lakshmikantham in (Nonlinear Anal. 65:1379-1393, 2006). As an application, the existence of a continuous solution for a system of Fredholm and Volterra integral equations is obtained.

MSC:47H10, 54H25.

In fixed point theory, the importance of study of coupled fixed points is due to their applications to a wide variety of problems. Bhaskar and Lakshmikantham [1] gave some existence results for coupled fixed point for a mixed monotone type mapping in a metric space endowed with partial order, using a weak contractivity type of assumption.

The purpose of this paper is to generalize these results using the context of metric spaces endowed with a graph. This new research direction in the theory of fixed points was initiated by Jachymski [2] and Gwóźdź-Lukawska, Jachymski [3]. Other results for single-valued and multivalued operators in such metric spaces were given by Beg, Butt, Radojevic in [4], Chifu, Petrusel in [5].

Our results also generalize and extend some coupled fixed points theorems in partially ordered complete metric spaces given by Harjani, Sadarangani [6], Nieto, Rodríguez-López [7] and [8], Nieto, Pouso, Rodríguez-López [9], O’Regan, Petruşel [10], Ran, Reurings [11], Gnana Bhaskar, Lakshmikantham [1], and Chifu, Petrusel [12].

Let $(X,d)$ be a metric space and Δ be the diagonal of $X\times X$. Let G be a directed graph, such that the set $V(G)$ of its vertices coincides with X and $\mathrm{\Delta }\subseteq E(G)$, where $E(G)$ is the set of the edges of the graph. Assume also that G has no parallel edges and, thus, one can identify G with the pair $(V(G),E(G))$.

Throughout the paper we shall say that G with the above-mentioned properties satisfies standard conditions.

Let us denote by $G^{-1}$ the graph obtained from G by reversing the direction of edges. Thus,

Let us consider the function $F:X\times X\to X$.

Definition 1.1 An element $(x,y)\in X\times X$ is called coupled fixed point of the mapping F, if $F(x,y)=x$ and $F(y,x)=y$.

We shall denote by $CFix(F)$ the set of all coupled fixed points of mapping F, i.e.

Definition 1.2 We say that $F:X\times X\to X$ is edge preserving if

Definition 1.3 The operator $F:X\times X\to X$ is called G-continuous if for all $(x,y)\in X\times X$, $(x^{\ast },y^{\ast })\in X\times X$ and for any sequence ${(n_i)}_{i\in \mathbb{N}}$ of positive integers, with $F^{n_i}(x,y)\to x^{\ast }$, $F^{n_i}(y,x)\to y^{\ast }$, as $i\to \mathrm{\infty }$, and $(F^{n_i}(x,y),F^{n_i+1}(x,y))\in E(G)$, $(F^{n_i}(y,x),F^{n_i+1}(y,x))\in E(G^{-1})$, we have that

Definition 1.4 Let $(X,d)$ be a complete metric space and G be a directed graph. We say that the triple $(X,d,G)$ has the property ($A_1$), if for any sequence ${(x_n)}_{n\in \mathbb{N}}\subset X$ with $x_n\to x$, as $n\to \mathrm{\infty }$, and $(x_n,x_{n+1})\in E(G)$, for $n\in \mathbb{N}$, we have $(x_n,x)\in E(G)$.

Definition 1.5 Let $(X,d)$ be a complete metric space and G be a directed graph. We say that the triple $(X,d,G)$ has the property ($A_2$), if for any sequence ${(x_n)}_{n\in \mathbb{N}}\subset X$ with $x_n\to x$, as $n\to \mathrm{\infty }$, and $(x_n,x_{n+1})\in E(G^{-1})$, for $n\in \mathbb{N}$, we have $(x_n,x)\in E(G^{-1})$.

Let $(X,d)$ be a metric space endowed with a directed graph G satisfying the standard conditions.

We consider the set denoted by ${(X\times X)}^F$ and defined as

Proposition 2.1 If $F:X\times X\to X$ is edge preserving, then:

1. (i)

   $(x,u)\in E(G)$ and $(y,v)\in E(G^{-1})$ implies $(F^n(x,y),F^n(u,v))\in E(G)$ and $(F^n(y,x),F^n(v,u))\in E(G^{-1})$;

2. (ii)

   $(x,y)\in {(X\times X)}^F$ implies $(F^n(x,y),F^{n+1}(x,y))\in E(G)$ and $(F^n(y,x),F^{n+1}(y,x))\in E(G^{-1})$, for all $n\in \mathbb{N}$;

3. (iii)

   $(x,y)\in {(X\times X)}^F$ implies $(F^n(x,y),F^n(y,x))\in {(X\times X)}^F$, for all $n\in \mathbb{N}$.

Proof (i) Let $(x,u)\in E(G)$ and $(y,v)\in E(G^{-1})$. Because F is edge preserving we have $(F(x,y),F(u,v))\in E(G)$ and $(F(y,x),F(v,u))\in E(G^{-1})$, which, using the same property, will imply that $(F^2(x,y),F^2(u,v))\in E(G)$ and $(F^2(y,x),F^2(v,u))\in E(G^{-1})$.

By induction we shall obtain $(F^n(x,y),F^n(u,v))\in E(G)$ and $(F^n(y,x),F^n(v,u))\in E(G^{-1})$.

(ii) Let $(x,y)\in {(X\times X)}^F:(x,F(x,y))\in E(G)$ and $(y,F(y,x))\in E(G)$.

Using (i) we have

(iii) From (ii) we have

This is equivalent to $(F^n(x,y),F^n(y,x))\in {(X\times X)}^F$, for all $n\in \mathbb{N}$. □

Definition 2.1 The mapping $F:X\times X\to X$ is called a G-contraction if:

1. (i)

   F is edge preserving;

2. (ii)

   there exists $k\in [0,1)$ such that

   $$d(F(x,y),F(u,v))\le \frac{k}{2}(d(x,u)+d(y,v)),\text{for all }(x,u)\in E(G),(y,v)\in E\left(G^{-1}\right).$$

Lemma 2.1 Let $(X,d)$ be a metric space endowed with a directed graph G and let $F:X\times X\to X$ be a G-contraction with constant k. Then

Proof Let $(x,u),(y,v)\in E(G)$. Because F is edge preserving we have $(F(x,y),F(u,v))\in E(G)$ and $(F(y,x),F(v,u))\in E(G^{-1})$.

From Proposition 2.1(i), it follows that $(F^n(x,y),F^n(u,v))\in E(G)$ and $(F^n(y,x),F^n(v,u))\in E(G^{-1})$.

Since F is a G-contraction, we shall obtain

and

Hence, by induction, we have

 □

Lemma 2.2 Let $(X,d)$ be a metric space endowed with a directed graph G and let $F:X\times X\to X$ be a G-contraction with constant k. Then, given $(x,y)\in {(X\times X)}^F$, there exists $r(x,y)\ge 0$ such that

Proof Let $(x,y)\in {(X\times X)}^F:(x,F(x,y))\in E(G)$ and $(y,F(y,x))\in E(G^{-1})$.

If in Lemma 2.1 we consider $u=F(x,y)$ and $v=F(y,x)$ we shall obtain

which is

If we consider $r(x,y):=d(x,F(x,y))+d(y,F(y,x))$, then

In a similar way we obtain

 □

Lemma 2.3 Let $(X,d)$ be a complete metric space endowed with a directed graph G and let $F:X\times X\to X$ be a G-contraction with the constant k. Then for each $(x,y)\in {(X\times X)}^F$, there exist $x^{\ast }(x)\in X$ and $y^{\ast }(y)\in X$ such that ${(F^n(x,y))}_{n\in \mathbb{N}}$ converges to $x^{\ast }(x)$ and ${(F^n(y,x))}_{n\in \mathbb{N}}$ converges to $y^{\ast }(y)$, as $n\to \mathrm{\infty }$.

Proof Let $(x,y)\in {(X\times X)}^F$. From Lemma 2.2, we have

Let $m>n$. We have

Similarly we shall obtain

Hence ${(F^n(x,y))}_{n\in \mathbb{N}}$ and ${(F^n(y,x))}_{n\in \mathbb{N}}$ are Cauchy sequences. Since $(X,d)$ is a complete metric space we shall obtain the result that there exist $x^{\ast }(x)\in X$ and $y^{\ast }(y)\in X$ such that ${(F^n(x,y))}_{n\in \mathbb{N}}$ converges to $x^{\ast }(x)$ and ${(F^n(y,x))}_{n\in \mathbb{N}}$ converges to $y^{\ast }(y)$, as $n\to \mathrm{\infty }$. □

Now we shall prove the main results of this section.

Theorem 2.1 Let $(X,d)$ be a complete metric space endowed with a directed graph G and let $F:X\times X\to X$ be a G-contraction with the constant k. Suppose that:

1. (i)

   F is G-continuous;

or

1. (ii)

   The triple $(X,d,G)$ has the properties ($A_1$) and ($A_2$).

Under these conditions $CFix(F)\ne \mathrm{\varnothing }$ if and only if ${(X\times X)}^F\ne \mathrm{\varnothing }$.

Proof Suppose that $CFix(F)\ne \mathrm{\varnothing }$.

Let $(x^{\ast },y^{\ast })\in CFix(F)$.

We have $(x^{\ast },F(x^{\ast },y^{\ast }))=(x^{\ast },x^{\ast })\in \mathrm{\Delta }\subset E(G)$ and $(y^{\ast },F(y^{\ast },x^{\ast }))=(y^{\ast },y^{\ast })\in \mathrm{\Delta }\subset E(G^{-1})$.

Hence $(x^{\ast },F(x^{\ast },y^{\ast }))\in E(G)$ and $(y^{\ast },F(y^{\ast },x^{\ast }))\in E(G^{-1})$ which means that $(x^{\ast },y^{\ast })\in {(X\times X)}^F$ and thus ${(X\times X)}_F\ne \mathrm{\varnothing }$.

Suppose now that ${(X\times X)}^F\ne \mathrm{\varnothing }$. Let $(x,y)\in {(X\times X)}^F$: $(x,F(x,y))\in E(G)$ and $(y,F(y,x))\in E(G^{-1})$.

Let ${(n_i)}_{i\in \mathbb{N}}$ be a sequence of positive integers. From Proposition 2.1(ii), we know that

Moreover, from Lemma 2.3, there exist $x^{\ast }(x)\in X$ and $y^{\ast }(y)\in X$ such that

We shall prove that $F(x^{\ast },y^{\ast })=x^{\ast }$ and $F(y^{\ast },x^{\ast })=y^{\ast }$.

Suppose that we have (i). Since F is G-continuous we shall obtain that

Now

Using the G-continuity of F and the convergence of ${(F^n(x,y))}_{n\in \mathbb{N}}$ we obtain $d(F(x^{\ast },y^{\ast }),x^{\ast })=0$, which means that $F(x^{\ast },y^{\ast })=x^{\ast }$.

In a similar way it can be proved that $F(y^{\ast },x^{\ast })=y^{\ast }$.

Thus $(x^{\ast },y^{\ast })$ is a coupled fixed point of the mapping F; therefore, $CFix(F)\ne \mathrm{\varnothing }$.

Suppose now that we have (ii). From (2.1) and (2.2), using properties ($A_1$) and ($A_2$) of the triple $(X,d,G)$, we shall obtain

Hence $d(F(x^{\ast },y^{\ast }),x^{\ast })=0$ and $d(F(y^{\ast },x^{\ast }),y^{\ast })=0$, which means that $F(x^{\ast },y^{\ast })=x^{\ast }$ and $F(y^{\ast },x^{\ast })=y^{\ast }$.

Thus $(x^{\ast },y^{\ast })\in CFix(F)$. □

Let us suppose now that for every $(x_1,y_1),(x_2,y_2)\in X\times X$ there exists $(z_1,z_2)\in X\times X$ such that

Theorem 2.2 Adding condition (2.3) to the hypothesis of Theorem  2.1 we obtain the uniqueness of the coupled fixed point of F.

Proof Let us suppose that there exist $(x_1^{\ast },y_1^{\ast }),(x_2^{\ast },y_2^{\ast })\in X\times X$ two coupled fixed points of F. From (2.3) we find that there exists $(z_1,z_2)\in X\times X$ such that

Using Lemma 2.1, we shall have

Hence $x_1^{\ast }=x_2^{\ast }$.

In a similar way it can be proved that $y_1^{\ast }=y_2^{\ast }$. □

Remark 2.1 It is obvious that if $(x_1^{\ast },x_2^{\ast })\in E(G)$ and $(y_1^{\ast },y_2^{\ast })\in E(G^{-1})$, then $x_1^{\ast }=x_2^{\ast }$ and $y_1^{\ast }=y_2^{\ast }$.

Theorem 2.3 Under the conditions of Theorem  2.1, if $(x^{\ast },y^{\ast })\in CFix(F)$ with $(x^{\ast },y^{\ast })\in E(G)$, then $x^{\ast }=y^{\ast }$.

Proof Since $(x^{\ast },y^{\ast })\in E(G)$, $(y^{\ast },x^{\ast })\in E(G^{-1})$, from the G-contraction condition we have

Hence $d(x^{\ast },y^{\ast })$ and thus $x^{\ast }=y^{\ast }$. □

Theorem 2.4 Under the conditions of Theorem  2.1, if we suppose that for each $(x,y)\in {(X\times X)}^F$, there exists $z\in X$ such that $(x,z)\in E(G)$ and $(y,z)\in E(G)$, then if $(x^{\ast },y^{\ast })\in CFix(F)$ we have $x^{\ast }=y^{\ast }$.

Proof Let $(x^{\ast },y^{\ast })\in CFix(F)$. According to Theorem 2.1, we have that $(x^{\ast },y^{\ast })\in {(X\times X)}^F$. Hence, there exists $z\in X$ such that $(x^{\ast },z)\in E(G)$ and $(y^{\ast },z)\in E(G)$.

Now let $(x^{\ast },z)\in E(G)$ and $(y^{\ast },y^{\ast })\in E(G^{-1})$. Using Proposition 2.1(i) we shall have $(F^n(x^{\ast },y^{\ast }),F^n(z,y^{\ast }))\in E(G)$ and $(F^n(y^{\ast },x^{\ast }),F^n(y^{\ast },z))\in E(G^{-1})$.

If $(x^{\ast },z)\in E(G)$ then $(z,x^{\ast })\in E(G^{-1})$ and using the same property we shall have $(F^n(x^{\ast },z),F^n(z,x^{\ast }))\in E(G)$ and $(F^n(z,x^{\ast }),F^n(x^{\ast },z))\in E(G^{-1})$.

Finally if $(x^{\ast },x^{\ast })\in E(G)$ and $(z,y^{\ast })\in E(G^{-1})$ then $(F^n(x^{\ast },z),F^n(x^{\ast },y^{\ast }))\in E(G)$ and $(F^n(z,x^{\ast }),F^n(y^{\ast },x^{\ast }))\in E(G^{-1})$,

Using Lemma 2.2, we shall obtain

Hence, we have

Thus $x^{\ast }=y^{\ast }$. □

Theorem 2.5 Under the conditions of Theorem  2.1, if we suppose that there exists $(x,y)\in {(X\times X)}^F$, such that $(x,y)\in E(G)$ and the sequence ${(F^n(x,y))}_{n\in \mathbb{N}}$ converges to $x^{\ast }(x)$ and ${(F^n(y,x))}_{n\in \mathbb{N}}$ converges to $y^{\ast }(y)$, as $n\to \mathrm{\infty }$, then $x^{\ast }=y^{\ast }$.

Proof Let $(x,y)\in {(X\times X)}^F$, such that $(x,y)\in E(G)$.

Hence $(F^n(x,y),F^n(y,x))\in E(G)$ and $(F^n(y,x),F^n(x,y))\in E(G^{-1})$

Using the property of G-contraction we shall have

Hence

Hence if $n\to \mathrm{\infty }$, then $d(x^{\ast },y^{\ast })=0$, and thus $x^{\ast }=y^{\ast }$. □

Remark 2.2 Let $(X,d)$ be a partially ordered set and d be a metric on X such that $(X,d)$ is a complete metric space. Let $E(G)=\{(x,y)\in X\times X:x\le y\}$. In this case we obtain all the results from [1].

Remark 2.3 It is obvious that if we consider a function $f:X\to X$, $f(x)=F(x,x)$ all these results concerning the coupled fixed point of the mapping F result in the existence and uniqueness results for the fixed point of f.

Let us consider the following integral systems:

and

The purpose of this section is to give existence and uniqueness results for the solution of the systems (3.1) and (3.2) using Theorem 2.1.

We shall discuss first the system (3.1).

Let us consider $X:=C([a,b],{\mathbb{R}}^n)$ with the usual supremum norm, i.e. $\parallel x\parallel ={max}_{t\in [a,b]}|x(t)|$, for $x\in C([a,b],{\mathbb{R}}^n)$.

Consider also the graph G defined by the partial order relation, i.e.

Hence $(X,\parallel \cdot \parallel )$ is a complete metric space endowed with a directed graph G.

If we consider $E(G)=\{(x,y)\in X\times X:x\le y\}$, then the diagonal Δ of $X\times X$ is included in $E(G)$. On the other hand $E(G^{-1})=\{(x,y)\in X\times X:y\le x\}$.