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Common fixed point results of a pair of generalized \((\psi,\varphi )\)contraction mappings in modular spaces
Fixed Point Theory and Applications volume 2016, Article number: 19 (2016)
Abstract
In this paper, we establish the existence of a common fixed point of almost generalized contractions on modular spaces. As an application, we present some fixed and common fixed point results for such mappings on modular spaces endowed with a graph. The existence of fixed and common points of mappings satisfying generalized contractive conditions of integral type is also obtained in such spaces. Some examples are presented to support the results obtained herein. Our results generalize and extend various comparable results in the existing literature.
1 Introduction
Over the past two decades the development of fixed point theory in metric spaces has attracted considerable attention due to numerous applications in areas such as variational and linear inequalities, optimization, and approximation theory. The classical Banach contraction principle is one of the most useful results in nonlinear analysis. It ensures the existence and uniqueness of the fixed point of nonlinear operators satisfying the strict contraction condition. It also shows that the fixed point can be approximated by means of a Picard iteration. Due to its applications in mathematics and other related disciplines, the Banach contraction principle has been generalized in many directions. Extensions of the Banach contraction principle have been obtained either by generalizing the domain of the mapping (see, e.g., [1, 2]) or by extending the contractive condition on the mappings [3, 4]. The existence of fixed points in ordered metric spaces has been studied by Ran and Reurings [5], Theorem 2.1. Subsequently, Nieto and RodríguezLópez [6] extended the results in [5], Theorem 2.1 for nondecreasing mappings and applied them to obtain a unique solution for a first order ordinary differential equation with periodic boundary conditions. Since then, a number of results have been proved in the framework of ordered metric spaces. In 2008, Jachymski [7] investigated a new approach in metric fixed point theory by replacing the order structure with a graph structure on a metric space. In this way, the results proved in ordered metric spaces are generalized (see for details [7] and the references therein). Abbas and Nazir [8] obtained some fixed point results for a power graphic contraction pair endowed with a graph. Beg and Butt [9] proved fixed point theorems for setvalued mappings on a metric space with a graph. In this direction, we refer to [10–12] and the references mentioned therein.
The concept of a modular space was initiated by Nakano [13] and was redefined and generalized by Musielak and Orlicz [14]. In addition to it, the most important development of this theory is due to Mazur and Musielak, Luxemburg and Turpin (see [15–17]). The fixed point theory in modular function spaces has recently got a great deal of attention of researchers, for example, Khamsi [18] (see also [10, 11, 15, 17, 19–26]). Kuaket and Kumam [27] and Mongkolkeha and Kumam [28–30] proved some fixed and common fixed point results for generalized contraction mappings in modular spaces. Also, Kumam [22] obtained some fixed point theorems for nonexpansive mappings in arbitrary modular spaces.
The aim of this paper is to prove common fixed point results of a pair of mappings satisfying an almost generalized \({ ( {\psi,\varphi } ) }\)contraction condition in the setting of modular spaces. We provide an example to show that our results are a substantial generalization of comparable results in the existing literature. As an application of the results obtained herein, we obtain fixed and common fixed point results in the framework of modular space endowed with a directed as well as undirected graph. Some examples are presented to support the results proved herein. The existence of common fixed points of mappings satisfying a contractive condition of integral type is also obtained in such spaces.
2 Preliminaries
In the sequel the letters \({\mathbb{R}}\), \({\mathbb{R}_{+}}\), and \({\mathbb{N}}\) will denote the set of all real numbers, the set of all nonnegative real numbers, and the set of all positive integer numbers, respectively. Let \((X,d) \) be a metric space and \(T:X\rightarrow X\). A point \(x\in X\) is called a fixed point of T iff \(Tx=x\). A mapping \(T:X\rightarrow X\) is called a Picard operator (PO). If

(1)
\(F(T)=\{x\in X:Tx=x\}=\{z\}\),

(2)
for any \(x_{0}\in X\), the Picard iteration \(x_{n}=T^{n}x_{0} \) converges to z.
A sequence as in the above definition is called a sequence of successive approximations of T starting from \(x_{0}\).
The Banach contractive condition forces the mappings to be continuous. It is natural to ask if there do or do not exist weaker contractive conditions that ensure the existence and uniqueness of a fixed point but do not imply the continuity of mappings. Kannan [23], by considering a weaker contractive conditions, proved the existence of a fixed point for a mapping that can have a discontinuity. Following Kannan’s result, a lot of papers were devoted to obtaining fixed point or common fixed point theorems for various classes of contractive type conditions that do not require the continuity of the mappings; see, for example, [24] and [31].
The following definition is more suitable in this context.
Definition 2.1
Let \((X,d)\) be a metric space. A map \(T:X\rightarrow X\) is called an almost contraction or a δweak contraction if there exist a constant \(\delta\in ( {0,1} ) \) and some \(L\geq0\) such that
for any \(x,y\in X\).
This concept was introduced by Berinde as a ‘weak contraction’ in [3]. But in [4], Berinde renamed the ‘weak contraction’ as an ‘almost contraction’, which is more appropriate.
Berinde [3] proved some fixed point results for an almost contraction in the setting of a complete metric space and generalized the results in [23, 24], and [31].
Recently Babu et al. [32] considered the class of mappings that satisfy ‘condition (B)’ as follows.
Let \((X,d)\) be a metric space. A map \(T:X\rightarrow X\) is said to satisfy ‘condition (B)’ if there exist a constant \(\delta\in\, ]0,1[\) and some \(L\geq0\) such that
for all \(x,y\in X\).
They proved the following fixed point theorem.
Theorem 2.2
([32], Theorem 2.3)
Let \((X,d)\) be a complete metric space and \(T:X\rightarrow X\) be a map satisfying condition (B). Then T has a unique fixed point.
Afterwards Berinde [33] introduced the concept of a generalized almost contraction as follows.
Let \((X,d)\) be a metric space. A map \(T:X\rightarrow X\) is called a generalized almost contraction if there exist a constant \(\delta\in\, ]0,1[\) and some \(L\geq0\) such that
where
Theorem 2.3
Let \((X,d)\) be a complete metric space and \(T:X\rightarrow X\) a generalized almost contraction. Then T has a unique fixed point.
A point \(y\in X\) is called a point of coincidence of two selfmappings f and T on X if there exists a point \(x\in X\) such that \(y=Tx=fx\). The point x is called coincidence point of a pair \(( f,T ) \).
Abbas et al. [34] introduced a generalization of ‘condition (B)’ for a pair of selfmaps and obtained a unique point of coincidence. Ciric et al. [35] extended the concept of the generalized almost contraction to two mappings and obtained some common fixed point results in a complete metric space.
Consistent with [14], some basic facts and notations needed in this paper are recalled as follows.
Definition 2.4
Let X be an arbitrary vector space. A functional \(\rho:X\rightarrow{}[0,\infty)\) is called a modular if, for any x, y in X, the following conditions hold:
 (m_{1}):

\(\rho(x)=0\) if and only if \(x=0\);
 (m_{2}):

\(\rho(\alpha x)=\rho(x)\) for every scalar α with \(\alpha=1\);
 (m_{3}):

\(\rho(\alpha x+\beta y)\leq\rho(x)+\rho(y)\), whenever \(\alpha+\beta=1\), and \(\alpha,\beta\geq0\).
If (m_{3}) is replaced with \(\rho(\alpha x+\beta y)\leq \alpha^{s}\rho(x)+\beta^{s}\rho(y)\) where \(\alpha^{s}+\beta^{s}=1\), \(\alpha,\beta\geq0\), and \(s\in ( {0,1} ] \), then ρ is called sconvex modular. If \(s=1\), then we say that ρ is convex modular.
The following are some consequences of condition (m_{3}).
Remark 2.5
[20]
 (r_{1}):

For \(a, b\in \mathbb{R}\) with \(\vert a\vert <\vert b\vert \) we have \(\rho ( {ax} ) <\rho ( {bx} ) \) for all \(x\in X\).
 (r_{2}):

For \({a_{1}},\ldots,{a_{n}}\in \mathbb{R}_{+}\) with \(\sum_{i=1}^{n}{a_{i}}=1\), we have
$$\rho \Biggl( {\sum_{i=1}^{n}{a_{i}} {x_{i}}} \Biggr) \leq \sum_{i=1}^{n}{ \rho ( {x_{i}} ) }\quad \text{for any } {{x_{1}}, \ldots,{x_{n}}\in X}. $$
Proposition 2.6
[30]
Let \(X_{\rho}\) be a modular space. If \(a,b\in{{\mathbb{R}_{+}}}\) with \(b\geq a\), then \(\rho ( {ax} ) \leq\rho ( {bx} ) \).
A mapping \(\rho:{\mathbb{R}}\rightarrow{}[0,\infty]\) defined by \(\rho(x)=\sqrt{\vert x\vert }\) is a trivial example of a modular functional.
The vector space \(X_{\rho}\) given by
is called a modular space. Generally, the modular ρ is not subadditive and therefore does not behave as a norm or a distance. One can associate to a modular an Fnorm. One can associate to a modular an Fnorm.
The modular space \(X_{\rho}\) can be equipped with an Fnorm defined by
When ρ is convex modular, then
defines a norm on the modular space \(X_{\rho}\), and this is called the Luxemburg norm.
Define the ρball, \(B_{\rho}(x,r)\), centered at \(x\in X_{\rho}\) with radius r as
A function modular is said to satisfy:

(a)
the \(\Delta_{2}\)type condition if there exists \(K>0\) such that for any \(x\in X_{\rho}\), we have \(\rho(2x)\leq K\rho(x)\);

(b)
the \({\Delta_{2}}\)condition if \(\rho ( {2{x_{n}}} ) \rightarrow0\) as \(n\rightarrow\infty\), whenever \(\rho ( {x_{n}} ) \rightarrow0\) as \(n\rightarrow\infty\).
Definition 2.7
A sequence \(\{x_{n}\}\) in modular space \(X_{\rho}\) is said to be:
 (t_{1}):

ρconvergent to \(x\in X_{\rho}\) if \(\rho (x_{n}x)\rightarrow0\) as \(n \rightarrow\infty\);
 (t_{2}):

ρCauchy if \(\rho(x_{n}x_{m})\rightarrow0\) as \(n, m\rightarrow\infty\).
\(X_{\rho}\) is called ρcomplete if any ρCauchy sequence is ρconvergent. Note that ρconvergence does not imply ρCauchy since ρ does not satisfy the triangle inequality. In fact, one can show that this will happen if and only if ρ satisfies the \(\Delta_{2}\)condition. We know that [25] the norm and modular convergence are also the same when we deal with the \(\Delta_{2}\)type condition.
In the sequel, suppose the modular function ρ is convex and satisfies the \(\Delta_{2}\)type condition.
Mongkolkeha and Kumam [30] proved the existence of a fixed point generalized weak contractive mapping in modular space as follows.
Theorem 2.8
Let \({X_{\rho}}\) be a ρcomplete modular space and \(T:{X_{\rho}}\rightarrow{X_{\rho}}\). Suppose that there exist continuous and monotone nondecreasing functions \(\psi ,\varphi:{\mathbb{R}_{+}}\rightarrow{\mathbb{R}_{+}}\) such that \(\psi ( t ) =\varphi ( t ) =0\) if and only if \(t=0\). If for any \(x,y\in X_{\rho}\), the following condition holds:
where
then T has a unique fixed point.
Definition 2.9
Let \({X_{\rho}}\) be a modular space and \(T:{X_{\rho}}\rightarrow{X_{\rho}}\) be a selfmap. We say that T is ρcontinuous when if \(\rho ( {x_{n}  x} ) \to0 \), then \(\rho ( {Tx_{n}  Tx} ) \to0 \) as \(n \to\infty\).
3 Common fixed point of almost generalized \((\psi,\varphi )\)contraction
We set Ψ = {\(\psi: [ {0,\infty} ) \rightarrow [ {0,\infty} ) : \psi\) a continuous nondecreasing function and \(\psi ( t ) =0\) if and only if \(t=0\)} and Φ = {\(\varphi : [ {0,\infty} ) \rightarrow [ {0,\infty} ) : \varphi\) a lowersemi continuous function and \(\varphi ( t ) =0\) if and only if \(t=0\)}.
In this section, we obtain common fixed point results for a pair of mappings satisfying the generalized \(( {\psi,\varphi} ) \)contractive condition in the framework of a modular space.
Theorem 3.1
Let \(X_{\rho}\) be a ρcomplete modular space and \(S, T:{X_{\rho}}\rightarrow{X_{\rho}}\). Suppose that there exists \(L\geq0\) such that for any \(x,y\in X_{\rho}\), the following condition holds:
where \(\psi\in\Psi\), \(\varphi\in\Phi\), \(M ( {x,y} ) =\max \{ {\rho ( {xy} ) ,\rho ( {xSx} ) ,\rho ( {yTy} ) ,\frac{{\rho ( {\frac{1}{2} ( {ySx} ) } ) +\rho ( {\frac{1}{2} ( {xTy} ) } ) }}{2}} \} \) and \(N ( {x,y} ) =\min \{ {\rho ( {xSx} ) ,\rho ( {yTy} ) ,\rho ( {ySx} ) ,\rho ( {xTy} ) } \}\). Then S and T have a unique common fixed point provided that one of the mappings S or T is ρcontinuous.
Proof
Let \({x_{0}}\) be a given point in \({X_{\rho}}\). We construct a sequence \(\{ {x_{n}} \} \) for \(n\geq0\) by a two step iterative process thus:
We divide the proof into the following steps.
 Step 1.:

Prove that \(\rho ( {{x_{n}}{x_{n+1}}} ) \rightarrow0\) as \(n\rightarrow\infty\).
From Remark 2.5, the properties of the functions ψ and φ and substituting \(x={x_{2n}}\) and \(y={x_{2n+1}}\) in (2), we have
where
and
Hence we have
We now consider the following case.
If \(\max \{ {\rho ( {{x_{2n}}{x_{2n+1}}} ) ,\rho ( {{x_{2n+1}}{x_{2n+2}}} ) } \} =\rho ( {{x_{2n+1}}{x_{2n+2}}} ) \) for some n, then using the definition of φ, (4) becomes
a contradiction. Consequently
Thus from (4), we have
Continuing this way, we obtain
From (5) and (6), it follows that \(\{ {\rho ( {{x_{n}}{x_{n+1}}} ) } \} \) is monotone decreasing and bounded below. Therefore, there is \(r\geq0\) such that
On taking the limit as \(n\rightarrow\infty\) on both sides of the inequality (5), we have
which implies that \(\varphi ( r ) =0\), that is, \(r=0\). Hence
 Step 2.:

Now we show that \(\{ {x_{n}} \} \) is a ρCauchy sequence.
It is sufficient to show that \(\{ {{x_{2n}}} \} \) is a ρCauchy sequence. Assume the contrary. Then there exists \(\varepsilon >0\) such that we can find two subsequences \(\{ {m_{k}} \} \) and \(\{ {n_{k}} \} \) of positive integers satisfying \({n_{k}}>{m_{k}}\geq k\) such that the following inequalities hold:
From (8) and Remark 2.5, it follows that
On taking the limit as \(k\rightarrow\infty\), we obtain
Using \(x={x_{2{n_{k}}}}\) and \(y={x_{2{m_{k}}1}}\) in (2), we have
where
and
Also from (8) and Remark 2.5, it follows that
Also, from (11) we have
Note that
By Remark 2.5 and Proposition 2.6, we get
From (14), (15), (16), and arranging (11), we obtain
Taking the limit as \(k\rightarrow\infty\) on both sides of (10) and by using (7), (12), (13), (17), and Proposition 2.6, we get
a contradiction. Hence \(\{ {{x_{2n}}} \} \) is a ρCauchy sequence.
 Step 3.:

We prove the existence of a fixed point of one mapping.
As \(X_{\rho}\) is a ρcomplete, there exists a \(z\in X_{\rho}\) such that \(\rho ( {{x_{n}}z} ) \rightarrow0\) as \(n\rightarrow \infty\). Assume that S is ρcontinuous. From \(\rho ( {{x_{2n}}z} ) \rightarrow0\) as \(n\rightarrow\infty\), we have \(\rho ( {S{x_{2n}}Sz} ) \rightarrow0\), that is, \(\rho ( {{x_{2n+1}}Sz} ) \rightarrow0\) as \(n\rightarrow\infty\). By the uniqueness of the limit we obtain \(Sz=z\). Thus z is a fixed point of S.
 Step 4.:

We prove that z is a fixed point of a mapping T.
where
and
on taking the limit \(n \to\infty\) by (18)(20), we get
which implies that \(\varphi ( {\rho ( {z  Tz} )} ) = 0 \) and so \(\rho ( {z  Tz} ) = 0 \). Then we obtain \(Tz=z\). Thus z is a fixed point of T. Hence, z is a common fixed point of S and T.
Similarly, if we suppose that T is ρcontinuous, then we get the same result.
 Step 5.:

To prove the uniqueness of a common fixed point of two mappings.
We assume that w is an another common fixed point, that is, \(w=Sw\), \(w=Tw\), and \(w \ne z\),
where
and
a contradiction. Hence \(z=w\). □
The following results are obtained directly from Theorem 3.1.
Corollary 3.2
Let S, T be selfmappings on a ρcomplete modular space \(X_{\rho}\) such that for any \(x,y\in X_{\rho}\), the following condition holds:
where \(\psi\in\Psi\), \(\varphi\in\Phi\), \(M ( {x,y} ) =\max \{ {\rho ( {xy} ) ,\rho ( {xSx} ) ,\rho ( {yTy} ) ,\frac{{\rho ( {\frac{1}{2} ( {ySx} ) } ) +\rho ( {\frac{1}{2} ( {xTy} ) } ) }}{2}} \} \). Then S and T have a unique common fixed point provided that one of the mappings S or T is ρcontinuous.
Corollary 3.3
Let S, T be selfmappings on a ρcomplete modular space \(X_{\rho}\) such that for any \(x,y\in X_{\rho}\), the following condition holds:
where \(\varphi\in\Phi\), and \(M ( {x,y} ) =\max \{ {\rho ( {xy} ) ,\rho ( {xSx} ) ,\rho ( {yTy} ) ,\frac{{\rho ( {\frac{1}{2} ( {ySx} ) } ) +\rho ( {\frac{1}{2} ( {xTy} ) } ) }}{2}} \} \). Then S and T have a unique common fixed point provided that one of the mappings S or T is ρcontinuous.
Corollary 3.4
Let S, T be selfmappings on a ρcomplete modular space \(X_{\rho}\). Suppose that there exist \(k\in [ {0,1} ) \) and \(L\geq0\) such that for any \(x,y\in X_{\rho}\), the following condition holds:
where \(M ( {x,y} ) =\max \{ {\rho ( {xy} ) ,\rho ( {xSx} ) ,\rho ( {yTy} ) ,\frac{{\rho ( {\frac{1}{2} ( {ySx} ) } ) +\rho ( {\frac{1}{2} ( {xTy} ) } ) }}{2}} \} \) and \(N ( {x,y} ) = \min \{ {\rho ( {xSx} ) ,\rho ( {yTy} ) ,\rho ( {ySx} ) ,\rho ( {xTy} ) } \} \). Then S and T have a unique common fixed point provided that one of the mappings S or T is ρcontinuous.
Define Ϝ = {\(\xi:{\mathbb{R}_{+}}\rightarrow {\mathbb{R}_{+}}:\varphi\) is a Lebesgue integral mapping which is summable, nonnegative and satisfies \(\int _{0}^{\varepsilon}\xi(t)\, dt>0\), for each \(\varepsilon>0\)}.
Corollary 3.5
Let S, T be selfmappings on a ρcomplete modular space \(X_{\rho}\). Suppose that there exist \(k\in [ {0,1} ) \) and \(L\geq0\) such that for any \(x,y\in X_{\rho}\), the following condition holds:
where \(M ( {x,y} ) =\max \{ {\rho ( {xy} ) ,\rho ( {xSx} ) ,\rho ( {yTy} ) ,\frac{{\rho ( {\frac{1}{2} ( {ySx} ) } ) +\rho ( {\frac{1}{2} ( {xTy} ) } ) }}{2}} \} \) and \(N ( {x,y} ) = \min \{ {\rho ( {xSx} ) ,\rho ( {yTy} ) ,\rho ( {ySx} ) ,\rho ( {xTy} ) } \} \). Then S and T have a unique common fixed point provided that one of the mappings S or T is ρcontinuous.
Proof
Take \(\psi ( t ) =\int _{0}^{t}{ \xi ( t ) }\, dt\) and \(\varphi ( t ) = ( {1k} ) t\) for all \(t\in [ {0,\infty} ) \). The result then follows from Theorem 3.1. □
Corollary 3.6
Let T be a selfmapping on a ρcomplete modular space \(X_{\rho}\) which satisfies the following inequality:
for all \(x,y\in X_{\rho}\), where \(\psi\in\Psi\), \(\varphi\in\Phi\),
and \({n} ( {x,y} ) =\min \{ {\rho ( {xTx} ) ,\rho ( {yTy} ) ,\rho ( {yTx} ) ,\rho ( {xTy} ) } \} \). Then T has a unique fixed point.
4 Common fixed points on modular spaces with a directed graph
Let \({X_{\rho}}\) be a ρmodular space and \(\Delta =\{(x,x):x\in X\}\) denote the diagonal of \({X_{\rho}}\times{X_{\rho}}\). Let G be a directed graph such that the set \(V(G)\) of its vertices coincides with X and \(E(G)\) be the set of edges of the graph such that \(\Delta\subseteq E(G)\). Also assume that G has no parallel edges and G is a weighted graph in the sense that each edge \((x,y)\) is assigned the weight \(\rho(xy)\). Since ρ is a modular functional on \(X_{\rho}\), the weight assigned to each vertex x to vertex y does not need to be zero and whenever a zero weight is assigned to some edge \((x,y)\), it reduces to a \((x,x)\) having weight 0. The graph G is identified with the pair \((V(G),E(G))\).
If x and y are vertices of G, then a path in G from x to y of length \(k\in \mathbb{N}\) is a finite sequence \(\{x_{n}\}\) of vertices such that \(x=x_{0},\ldots,x_{k}=y\) and \((x_{i1},x_{i})\in E(G)\) for \(i\in\{ 1,2,\ldots,k\}\).
Recall that a graph G is connected if there is a path between any two vertices and it is weakly connected if G̃ is connected, where G̃ denotes the undirected graph obtained from G by ignoring the direction of edges. Denote by \(G^{1}\) the graph obtained from G by reversing the direction of edges. Thus,
It is more convenient to treat G̃ as a directed graph for which the set of its edges is symmetric, and with this convention we have
Let \(G_{x}\) be the component of G consisting of all the edges and vertices which are contained in some path in G beginning at x. In \(V(G)\), we define the relation R in the following way.
For \(x,y\in V(G)\), we have \(x\mathbin{R}y\) if and only if there is a path in G from x to y. If G is such that \(E(G)\) is symmetric, then for \(x\in V(G)\), the equivalence class \([x]_{G}\) in \(V(G)\) defined by the relation R is \(V(G_{x})\).
Let \(X_{\rho}\) be a modular space endowed with a graph G and \(S,T:{X_{\rho}}\rightarrow{X_{\rho}}\). We set
Theorem 4.1
Let \(X_{\rho}\) be a ρcomplete modular space endowed with a directed graph G, and S, T selfmaps on \(X_{\rho}\). Suppose that the following conditions hold:

(i)
If \(\{ {x_{n} } \} \) is a sequence in \(X_{\rho}\) such that \(\rho ( {x_{n}  x} ) \to0 \) and \(( {{x_{2n}},{x_{2n+1}}} ) \in E ( G ) \) for all \(n\geq0\), then there exists a subsequence \({ \{ {{x_{{2{n_{p}}}}}} \} }\) of \({ \{ {{x_{{2n}}}} \} }\) such that
 (i_{a}):

T is ρcontinuous and \(( {x,{x_{{2{n_{p}}+1}}}} ) \in E ( G ) \) for all \(p\geq0\) or
 (i_{b}):

S is ρcontinuous and \(( { {x_{{2{n_{p}}}}}},x ) \in E ( G ) \) for all \(p\geq0\).

(ii)
There is a sequence \({ \{ {x_{n}} \} }\) in \(X_{\rho}\) such that
$$\begin{aligned}& ( {{x_{2n}},S{x_{2n}}} ) \in E ( G )\quad \textit{implies that} \quad ( {{x_{2n+2}},S{x_{2n+2}}} ) \in E ( G ) \quad \textit{and} \\& ( {{x_{2n+1}},T{x_{2n+1}}} ) \in E ( G ) \quad \textit{implies that}\quad ( {{x_{2n+3}},T{x_{2n+3}}} ) \in E ( G ) . \end{aligned}$$ 
(iii)
For any \((x,y)\in E(G)\), S and T satisfy (2) in Theorem 3.1.

(iv)
\({X_{ST}}\) is nonempty.
Then S and T have a common fixed point.
Proof
Let \({x_{0}}\) be a given point in \({X_{ST}}\), then \(( {{x_{0}},S{x_{0}}} ) \in E ( G ) \) and \(( {S{x_{0}},TS{x_{0}}} ) \in E ( G ) \), that is, \(( {{x_{1}},T{x_{1}}} ) \in E ( G ) \). From (ii), it follows that \(( {{x_{2}},S{x_{2}}} ) \in E ( G ) \) and \(( {{x_{3}},T{x_{3}}} ) \in E ( G ) \). Continuing this way, we can obtain a sequence \(\{x_{n}\}\) in \(X_{\rho}\) such that \(( {{x_{2n}},S{x_{2n}}} ) \in E ( G ) \) and \(( {{x_{2n+1}},T{x_{2n+1}}} ) \in E ( G ) \) for all \(n\in{\mathbb{N}}\). Also, \(( {{x_{2n}},{x_{2n+1}}} ) \in E ( G ) \) and \(( {{x_{2n+1}},{x_{2n+2}}} ) \in E ( G ) \) for all \(n\in{\mathbb{N}}\). Using arguments as in the proof of Theorem 3.1, we obtain
Also, \(\{ {x_{n}} \} \) is a ρCauchy sequence. Since \(X_{\rho}\) is ρcomplete, there exists a \(\rho ( {x_{n}  x^{*} } ) \to 0 \) as \(n\rightarrow\infty\).
Now we show that \({x^{\ast}}\) is a common fixed point of S and T. As \(\rho ( {{x_{n}}{x^{\ast}}} ) \rightarrow0\) and \(( {{x_{2n}},{x_{2n+1}}} ) \in E ( G ) \), there exists a subsequence \(\{ {{x_{2{n_{p}}}}} \} \) of \(\{ {{x_{2n}}} \} \). Assume that (i_{a}) holds. Then T is ρcontinuous and \(( {{ x^{\ast}},{x_{2{n_{p}}+1}}} ) \in E ( G ) \). Thus
This implies that \(T{x^{\ast}}={x^{\ast}}\). From (iii) and Remark 2.5, we have
where
and
On taking the limit as \(p\rightarrow\infty\) (30)(32), we have
a contradiction. Thus \({S{x^{\ast}}={x^{\ast}}}\) and hence \({x^{\ast}}\) is a common fixed point of S and T. Similarly, the result follows if we suppose that S is ρcontinuous and \(( {{x_{2{n_{p}}}},{x^{\ast}}} ) \in E ( G ) \). □
We note that Theorem 4.1 does not guarantee the uniqueness of a common fixed point.
To obtain the uniqueness, an additional assumption as given in the following theorem is required.
Theorem 4.2
In addition to the conditions of Theorem 4.1, assume that for any two common fixed point \({x^{\ast}}\), \({y^{\ast}}\) of S and T, there exists \(z\in X_{p}\) such that \(( {{x^{\ast }},z} ) \in E ( G ) \) and \(( {z,{y^{\ast}}} ) \in E ( G ) \). Then \({x^{\ast}}={y^{\ast}}\).
Proof
Let \({x^{\ast}}\), \({y^{\ast}}\) be common fixed points of S and T, then \(( {{x^{\ast}},z} ) \in E ( G ) \) and \(( {z,{y^{\ast}}} ) \in E ( G ) \). As G is a directed graph, \(( {{x^{\ast}},{y^{\ast}}} ) \in E ( G ) \). From (iii), we obtain
where
and
a contradiction. Hence \({x^{\ast}}={y^{\ast}}\). □
Example 4.3
Let \(X_{\rho}={\mathbb{R}}\), \(\rho ( x ) =\vert x\vert \) for all \(x\in X_{\rho}\) and \(E ( G ) = \{ { ( {x,y} ) : x,y\in [ {0,1} ] } \} \). Define the mappings \(S,T:X\rightarrow X\) as follows:
Take \(\psi ( t ) =\frac{t}{3}\) and \(\varphi ( t ) =\frac{t}{6}\) for all \(t>0\) and \(L\geq\frac{1}{5}\). It is verified that all the conditions of Theorem 3.1 and Theorem 4.2 are satisfied. Moreover, 0 is a common fixed point of S and T.
The following results are obtained directly from Theorem 4.1.
Corollary 4.4
Let \(X_{\rho}\) be a ρcomplete modular space endowed with a directed graph G, and S, T selfmaps on \(X_{\rho}\). Suppose that the following conditions hold:

(i)
If \(\{ {x_{n} } \} \) is a sequence in \(X_{\rho}\) such that \(\rho ( {x_{n}  x} ) \to0 \) and \(( {{x_{2n}},{x_{2n+1}}} ) \in E ( G ) \) for all \(n\geq0\), then there exists a subsequence \({ \{ {{x_{{2{n_{p}}}}}} \} }\) of \({ \{ {{x_{{2n}}}} \} }\) such that
 (i_{a}):

T is ρcontinuous and \(( {x,{x_{{2{n_{p}}+1}}}} ) \in E ( G ) \) for all \(p\geq0\) or
 (i_{b}):

S is ρcontinuous and \(( { {x_{{2{n_{p}}}}}},x ) \in E ( G ) \) for all \(p\geq0\).

(ii)
There is a sequence \({ \{ {x_{n}} \} }\) in \(X_{\rho}\) such that
$$\begin{aligned}& ( {{x_{2n}},S{x_{2n}}} ) \in E ( G )\quad \textit{implies that} \quad ( {{x_{2n+2}},S{x_{2n+2}}} ) \in E ( G )\quad \textit{and} \\& ( {{x_{2n+1}},T{x_{2n+1}}} ) \in E ( G )\quad \textit{implies that}\quad ( {{x_{2n+3}},T{x_{2n+3}}} ) \in E ( G ) . \end{aligned}$$ 
(iii)
\(\psi ( {\rho ( {SxTy} ) } ) \leq\psi ( {M ( {x,y} ) } ) \varphi ( {M ( {x,y} ) } ) \), for any \(( {x,y} ) \in E ( G ) \).

(iv)
\({X_{ST}}\) is nonempty.
Then S and T have a common fixed point.
Corollary 4.5
Let \(X_{\rho}\) be a ρcomplete modular space endowed with a directed graph G, and S, T selfmaps on \(X_{\rho}\). Suppose that the following conditions hold:

(i)
If \(\{ {x_{n} } \} \) is a sequence in \(X_{\rho}\) such that \(\rho ( {x_{n}  x} ) \to0 \) and \(( {{x_{2n}},{x_{2n+1}}} ) \in E ( G ) \) for all \(n\geq0\), then there exists a subsequence \({ \{ {{x_{{2{n_{p}}}}}} \} }\) of \({ \{ {{x_{{2n}}}} \} }\) such that
 (i_{a}):

T is ρcontinuous and \(( {x,{x_{{2{n_{p}}+1}}}} ) \in E ( G ) \) for all \(p\geq0\) or
 (i_{b}):

S is ρcontinuous and \(( { {x_{{2{n_{p}}}}}},x ) \in E ( G ) \) for all \(p\geq0\).

(ii)
There is a sequence \({ \{ {x_{n}} \} }\) in \(X_{\rho}\) such that
$$\begin{aligned}& ( {{x_{2n}},S{x_{2n}}} ) \in E ( G ) \quad \textit{implies that}\quad ( {{x_{2n+2}},S{x_{2n+2}}} ) \in E ( G )\quad \textit{and} \\& ( {{x_{2n+1}},T{x_{2n+1}}} ) \in E ( G )\quad \textit{implies that} \quad ( {{x_{2n+3}},T{x_{2n+3}}} ) \in E ( G ) . \end{aligned}$$ 
(iii)
\(\rho ( {SxTy} ) \leq M ( {x,y} ) \varphi ( {M ( {x,y} ) } ) \) for any \(( {x,y} ) \in E ( G ) \).

(iv)
\({X_{ST}}\) is nonempty.
Then S and T have a common fixed point.
Corollary 4.6
Let \(X_{\rho}\) be a ρcomplete modular space endowed with a directed graph G, and S, T selfmaps on \(X_{\rho}\). Suppose that the following conditions hold:

(i)
If \(\{ {x_{n} } \} \) is a sequence in \(X_{\rho}\) such that \(\rho ( {x_{n}  x} ) \to0 \) and \(( {{x_{2n}},{x_{2n+1}}} ) \in E ( G ) \) for all \(n\geq0\), then there exists a subsequence \({ \{ {{x_{{2{n_{p}}}}}} \} }\) of \({ \{ {{x_{{2n}}}} \} }\) such that
 (i_{a}):

T is ρcontinuous and \(( {x,{x_{{2{n_{p}}+1}}}} ) \in E ( G ) \) for all \(p\geq0\) or
 (i_{b}):

S is ρcontinuous and \(( { {x_{{2{n_{p}}}}}},x ) \in E ( G ) \) for all \(p\geq0\).

(ii)
There is a sequence \({ \{ {x_{n}} \} }\) in \(X_{\rho}\) such that
$$\begin{aligned}& ( {{x_{2n}},S{x_{2n}}} ) \in E ( G ) \quad \textit{implies that}\quad ( {{x_{2n+2}},S{x_{2n+2}}} ) \in E ( G ) \quad \textit{and} \\& ( {{x_{2n+1}},T{x_{2n+1}}} ) \in E ( G ) \quad \textit{implies that}\quad ( {{x_{2n+3}},T{x_{2n+3}}} ) \in E ( G ) . \end{aligned}$$ 
(iii)
There exist \(k\in [ {0,1} ) \) and \(L\geq0\) such that
$$\rho ( {SxTy} ) \leq k M ( {x,y} ) +L N ( {x,y} ) $$for any \(( {x,y} ) \in E ( G ) \).

(iv)
\({X_{ST}}\) is nonempty.
Then S and T have a common fixed point.
Corollary 4.7
Let \(X_{\rho}\) be a ρcomplete modular space endowed with a directed graph G, and S, T selfmaps on \(X_{\rho}\). Suppose that the following conditions hold:

(i)
If \(\{ {x_{n} } \} \) is a sequence in \(X_{\rho}\) such that \(\rho ( {x_{n}  x} ) \to0 \) and \(( {{x_{2n}},{x_{2n+1}}} ) \in E ( G ) \) for all \(n\geq0\), then there exists a subsequence \({ \{ {{x_{{2{n_{p}}}}}} \} }\) of \({ \{ {{x_{{2n}}}} \} }\) such that
 (i_{a}):

T is ρcontinuous and \(( {x,{x_{{2{n_{p}}+1}}}} ) \in E ( G ) \) for all \(p\geq0\) or
 (i_{b}):

S is ρcontinuous and \(( { {x_{{2{n_{p}}}}}},x ) \in E ( G ) \) for all \(p\geq0\).

(ii)
There is a sequence \({ \{ {x_{n}} \} }\) in \(X_{\rho}\) such that
$$\begin{aligned}& ( {{x_{2n}},S{x_{2n}}} ) \in E ( G )\quad \textit{implies that} \quad ( {{x_{2n+2}},S{x_{2n+2}}} ) \in E ( G ) \quad \textit{and} \\& ( {{x_{2n+1}},T{x_{2n+1}}} ) \in E ( G ) \quad \textit{implies that}\quad ( {{x_{2n+3}},T{x_{2n+3}}} ) \in E ( G ) . \end{aligned}$$ 
(iii)
There exists \(k\in [ {0,1} ) \) and \(L\geq0\) such that
$$\int _{0}^{\rho ( {SxTy} ) }{\xi ( t ) \,dt}\leq k \int _{0}^{M ( {x,y} ) }{\xi ( t ) \,dt}+L \int _{0}^{N ( {x,y} ) }{\xi ( t ) \,dt} $$for each \(( {x,y} ) \in E ( G ) \).

(iv)
\({X_{ST}}\) is nonempty.
Then S and T have a common fixed point.
Proof
The proof follows from Theorem 4.1 by taking \(\psi ( t ) =\int _{0}^{t}{\xi ( t ) }\,dt\) and \(\varphi ( t ) = ( {1k} ) t\) for all \(t\in [ {0,\infty} ) \). □
5 Fixed point results on modular spaces involving undirected graph
Recently, Öztürk et al. [10] obtained some fixed point results for mappings satisfying a contractive condition of integral type in modular spaces endowed with a graph using the \(C_{\rho}\)graph and being orbitally \(G_{\rho}\)continuous. To apply this property, we modify for \(C=1\) as follows.
Definition 5.1
Let \(\{ {{T^{n}}x} \} \) be a sequence in \(X_{\rho}\) for some \(x\in X_{\rho}\) such that \(\rho ( {T^{n} x  x^{*} } ) \to0 \) for \({x^{\ast}}\in {X_{\rho}}\) and \(( {{T^{n}}x,{T^{n+1}x}} ) \in E ( G ) \) for all \(n\in{\mathbb{N}}\). Then a graph G is called a modified \(C_{\rho}\)graph if there exists a subsequence \(\{ {{T^{{n_{p}}}}x} \} \) of \(\{ {{T^{n}}x} \} \) such that \(( {{T^{{n_{p}}}}x,{x^{\ast}}} ) \in E ( G ) \) for \(p\in{\mathbb{N}}\).
Definition 5.2
A mapping \(T:X_{\rho}\rightarrow X_{\rho}\) is called orbitally \(G_{\rho}\)continuous if for all \(x,y\in X_{\rho }\) and any sequence \((n_{p})_{p\in{\mathbb{N}}}\) of positive integers, \(\rho ( {{T}^{{n}_{{p}} } x  y} ) \to0 \) and \(\rho ( {T ( {{T}^{{n}_{{p}} } x} )  T ( y )} ) \to0 \) as \(p\rightarrow\infty\).
Next, we define an almost generalized \(( {\psi,\varphi} ) \)G̃contraction mapping.
Definition 5.3
Let \({X_{\rho}}\) be a modular space endowed with undirected graph G. A selfmapping T on \({X_{\rho}}\) is called an almost generalized \(( {\psi,\varphi} ) \)Gcontraction mapping if:

(i)
T preserves edges of G.

(ii)
There exists \(L\geq0\) such that
$$\psi \bigl( {\rho ( {TxTy} ) } \bigr) \leq\psi \bigl( {{m} ( {x,y} ) } \bigr)  \varphi \bigl( {{m} ( {x,y} ) } \bigr) +L \psi \bigl( {{n} ( {x,y} ) } \bigr) $$holds for all \((x,y)\in E(G)\).
Remark 5.4
Let \(X_{\rho}\) be a modular space endowed with a graph G and \(T:X_{\rho}\rightarrow X_{\rho}\) an almost generalized \(( {\psi,\varphi} ) \)Gcontraction mapping. If there exists \(x_{0}\in X_{\rho}\) such that \(Tx_{0}\in [ {x_{0}} ] _{\widetilde {G}}\), then the following statements hold:

(i)
T is both an almost generalized \(( {\psi,\varphi} )\)\(G^{1}\)contraction mapping and an almost generalized \(( {\psi ,\varphi} )\)G̃contraction mapping.

(ii)
\([ {x_{0} } ]_{\widetilde {G}}\) is Tinvariant and \({T_{{ { [ {x_{0}} ]} }_{\widetilde {G}}}}\) is an almost generalized \(( {\psi,\varphi} )\)\({\widetilde {G}_{x_{0} }}\)contraction mapping.
Theorem 5.5
Let \(X_{\rho}\) be ρcomplete modular space endowed with a graph G and \(T:X_{\rho}\rightarrow X_{\rho}\). If the following statements hold:

(i)
G is weakly connected and modified \(C_{\rho}\)graph;

(ii)
T is an almost generalized \(( {\psi,\varphi} )\)G̃contraction;

(iii)
\(X_{T}= \{ {x\in X: ( {x,Tx} ) \in E ( G ) } \}\) is nonempty,
then T is a PO.
In Theorem 5.5, if we replace the condition that G is a modified \({C_{\rho}}\)graph with modified orbitally \(G_{\rho}\)continuity of T, then we have the following theorem.
Theorem 5.6
Let \({X_{\rho}}\) be a ρcomplete modular space endowed with a graph G, and \(T:{X_{\rho}}\rightarrow{X_{\rho }}\) an almost generalized \(( {\psi,\varphi} ) \)G̃contraction mapping and modified orbitally \(G_{\rho}\)continuous. If \({X_{T}}\) is nonempty and the graph G is weakly connected, then T is a PO.
Example 5.7
Let \({X_{\rho}}={\mathbb{R}} \), \(\rho ( x ) =\vert x\vert \) for all \(x\in X_{\rho}\), and
Define \(T:{X_{\rho}}\rightarrow{X_{\rho}}\) by
Clearly, G is weakly connected and a \({C_{\rho}}\)graph, \({X_{T}}\) is nonempty, and T is orbitally \(G_{\rho}\)continuous and an almost generalized \(( {\psi,\varphi} ) \)G̃contraction mapping where \(\psi ( t ) =\frac{t}{3}\), \(\varphi ( t ) =\frac{t}{6}\), and \(L\geq0\). Note that T does not satisfy inequality (25). Indeed, we have
where \(m ( {1,2} ) =1\), \(n ( {1,2} ) =0\), and so \(\frac{1}{3}\leq\frac{1}{6}\) is obtained, an absurd statement. Also, Corollary 3.6 is not applicable in this case, but all the conditions of Theorem 5.5 and Theorem 5.6 are satisfied.
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Öztürk, M., Abbas, M. & Girgin, E. Common fixed point results of a pair of generalized \((\psi,\varphi )\)contraction mappings in modular spaces. Fixed Point Theory Appl 2016, 19 (2016). https://doi.org/10.1186/s136630160503x
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DOI: https://doi.org/10.1186/s136630160503x