φ-Contraction in generalized probabilistic metric spaces

Abstract

We use the gauge function introduced by Fang to gain a fixed point result in probabilistic G-metric spaces. Our work extends some existing results. Moreover, our result is supported with an example.

1 Introduction

Probabilistic fixed point theory originated in the work of Sehgal and Bharucha-Reid [1] where they introduced a contraction mapping principle in probabilistic metric spaces. After that this line of research has developed through the works of different authors over the years. A comprehensive description of this development is given in the book of Hadz̆ić and Pap [2]. Some more recent references are noted in [2–9].

Metric spaces are generalized in different ways creating spaces like fuzzy metric spaces, 2-metric spaces, etc. Generalized metric space is one of such spaces in which to every triple of points a nonnegative real number is attached. Such spaces were introduced by Mustafa and Sims [10]. Fixed point theory and related topics have been developed through a good number of works in recent times, some instances of which are in [11–14].

In the same vein probabilistic generalized metric spaces have been introduced by Zhou et al. [15] wherein they also proved certain primary fixed point results in these spaces. An interesting class of problems in probabilistic fixed point theory was addressed in recent times by use of gauge functions. These are control functions which have been used to extend the Sehgal contraction in probabilistic metric spaces. Some examples of these applications are in [3, 4, 7, 9, 16, 17]. One of such gauge functions was introduced by Fang [16]. Here we use the gauge function used by Fang [16] to obtain a fixed point result in probabilistic G-metric spaces. Our result is supported with an example.

It is perceived that the study of fixed points for contractions defined by using control functions is an important category of problems in fixed point theory. One of the causes for this interest is the particularities involved in the proofs. With this motivation we work out the results in this paper.

2 Mathematical preliminaries

In this section we discuss certain definitions and lemmas which will be necessary for establishing the results of the next section.

Definition 2.1

[18]

A mapping \(F : R \to R^{+} \) is called a distribution function if it is nondecreasing and left continuous with \(\inf_{t \in R}F(t) = 0\) and \(\sup_{t\in R}F(t) = 1\), where R is the set of real numbers and \(R^{+}\) denotes the set of all nonnegative real numbers.

Definition 2.2

[2, 18]

A binary operation \(\Delta :[0,1]^{2}\rightarrow {}[ 0,1]\) is called a continuous t-norm if the following properties are satisfied:

1. (i)

   Δ is associative and commutative,

2. (ii)

   \(\Delta (a,1)=a\) for all \(a\in[0,1]\),

3. (iii)

   \(\Delta (a,b)\leq \Delta (c,d)\) whenever \(a\leq c\) and \(b\leq d\) for all \(a,b,c,d\in[0,1]\),

4. (iv)

   Δ is continuous.

Generic examples of continuous t-norm are \(\Delta_{M} (a, b)=\min \{a,b\}\), \(\Delta_{P} (a, b)=ab\), etc.

Definition 2.3

[18]

A Menger space is a triplet \((X,F,\Delta)\), where X is a nonempty set, F is a function defined on \(X \times X \) to the set of distribution functions and Δ is a t-norm such that the following are satisfied:

1. (i)

   \(F_{x,y}(0) = 0\) for all \(x,y \in X\),

2. (ii)

   \(F_{x,y}(s) = 1\) for all \(s>0\) if and only if \(x=y\),

3. (iii)

   \(F_{x,y}(s) = F_{y,x}(s)\) for all \(s >0\), \(x,y \in X\),

4. (iv)

   \(F_{x,y}(u+v)\geq \Delta (F_{x,z}(u), F_{z,y}(v))\) for all \(u,v \geq 0\) and \(x,y,z \in X\).

Definition 2.4

[15]

The 3-tuple \((X,G,\Delta )\) is called a probabilistic G-metric space (shortly PGM-space) if X is a nonempty set, Δ is a continuous t-norm and \(F^{\ast }\) is a function from \(X^{3}\times (0,\infty )\) to the set of distribution functions satisfying the following conditions for each \(x,y,z\in X\) and \(t,s>0\):

1. (i)

   \(F^{*}_{x,y,z}(t)=1\) if and only if \(x=y=z\),

2. (ii)

   \(F^{*}_{x,x,y}(t)\geq F^{*}_{x,y,z}(t)\) with \(y \neq z\),

3. (iii)

   \(F^{*}_{x,y,z}(t)= F^{*}_{p(x,y,z)}(t)\), where p is a permutation function,

4. (iv)

   \(\Delta (F^{*}_{x,a,a}(t), F^{*}_{a,y,z}(s))\leq F^{*}_{x,y,z}(t+s)\).

Example 2.5

[15]

Let \((X,F^{\ast },\Delta )\) be a probabilistic metric space. Define a function \(F^{\ast }:X\times X\times X\rightarrow \mathbb{R^{+}}\) by

$$F_{x,y,z}^{\ast }(t)=\min \bigl\{ F_{x,y}(t),F_{y,z}(t),F_{z,x}(t) \bigr\} \quad \mbox{for all }x,y,z\in X\mbox{ and }t>0. $$

Then \((X,F^{\ast },\Delta )\) is a probabilistic G-metric space.

For more examples of probabilistic G-metric space refer to [15].

Definition 2.6

[15]

Let \((X,F^{\ast },\Delta )\) be a probabilistic G-metric space and \(x_{0}\) be any point in X. For any \(\epsilon >0\) and λ with \(0<\lambda <1\), an \((\epsilon ,\lambda )\)-neighborhood of \(x_{0}\) is the set of all points y in X for which \(F_{x_{0},y,y}^{\ast }(\epsilon )>1-\lambda \) and \(F_{y,x_{0},x_{0}}^{\ast }(\epsilon )>1-\lambda \). We write

$$N_{x_{0}}(\epsilon ,\lambda )=\bigl\{ y\in X:F_{x_{0},y,y}^{\ast }( \epsilon )>1-\lambda ,F_{y,x_{0},x_{0}}^{\ast }(\epsilon )>1-\lambda \bigr\} . $$

This means that \(N_{x_{0}}(\epsilon ,\lambda )\) is the set of all points \(y\in X\) for which the probability of the distance from \(x_{0}\) to y being less than ϵ is greater than \(1-\lambda \).

Lemma 2.7

[15]

If \(\epsilon _{1}\leq \epsilon _{2}\) and \(\lambda _{1}\leq \lambda _{2}\), then \(N_{x_{0}}(\epsilon _{1},\lambda _{1})\subseteq N_{x_{0}}(\epsilon _{2},\lambda _{2})\).

Theorem 2.8

[15]

Let \((X,F^{*},\Delta )\) be a probabilistic G-metric space. Then \((X,F^{*},\Delta )\) is a Hausdorff space in the topology induced by the family \(\{N_{x_{0}}(\epsilon,\lambda)\}\) of \((\epsilon,\lambda)\)-neighborhoods.

Definition 2.9

[15]

Let \((X,F^{\ast },\Delta )\) be a probabilistic G-metric space.

1. (i)

   A sequence \(\{x_{n}\}\subset X\) is said to converge to a point \(x \in X\) if given \(\epsilon > 0\), \(\lambda > 0\) we can find a positive integer \(N_{\epsilon,\lambda}\) such that for all \(n > N_{ \epsilon,\lambda}\),

   $$F_{x,x_{n},x_{n}}(\epsilon) \geq 1- \lambda. $$
2. (ii)

   A sequence \(\{x_{n}\}\) is said to be a Cauchy sequence in X if given \(\epsilon > 0\), \(\lambda > 0 \) there exists a positive integer \(N_{\epsilon, \lambda}\) such that

   $$F_{x_{n},x_{m},x_{l}}(\epsilon) \geq 1-\lambda\quad \mbox{for all } m, n,l > N_{\epsilon, \lambda}. $$
3. (iii)

   A probabilistic G-metric space \((X, F^{*}, \Delta)\) is said to be complete if every Cauchy sequence is convergent in X.

Definition 2.10

[2]

A t-norm Δ is said to be a Hadz̆ić type (shortly H-type) t-norm if the family \(\{\Delta ^{m}\}_{m>0}\) of its iterates defined for each \(t\in {}[ 0,1]\) by

$$\Delta ^{1}(t)=\Delta (t,t) $$

and, in general, for all \(m>1\), \(\Delta ^{m}(t)=\Delta (t,\Delta ^{m-1}(t))\) is equi-continuous at \(t=1 \), that is, given \(\lambda >0\) there exists \(\eta (\lambda )\in (0,1)\) such that

$$\eta (\lambda )< t\leq 1\quad \Rightarrow \quad \Delta ^{(m)}\bigl(\eta( \lambda)\bigr)\geq 1-\lambda \quad \mbox{for all }m>0. $$

Definition 2.11

[16]

Let \(\Phi_{w}\) denote the class of all functions \(\varphi : \mathbb{R^{+}}\rightarrow \mathbb{R^{+}}\) satisfying the following condition:

• for each \(t>0\), there exists \(r\geq t\) such that \(\lim_{n\rightarrow \infty}\varphi^{n}(r) = 0\).

Lemma 2.12

[16]

Let \(\varphi \in \Phi_{w}\), then for each \(t>0\) there exists \(r\geq t\) such that \(\varphi(r)< t\).

3 Main results

Definition 3.1

Let \((X,F^{\ast },\Delta )\) be a PGM-space with a continuous t-norm Δ of H-type. A mapping \(f:X\rightarrow X\) is said to be a probabilistic φ-contraction if there exists a function \(\varphi \in \Phi _{w}\) such that

$$ F_{fx,fy,fz}^{\ast }\bigl(\varphi (t)\bigr)\geq F_{x,y,z}^{\ast }(t) \quad \mbox{for all }x,y,z\in X\mbox{ and }t>0. $$

(3.1)

Lemma 3.2

Let \(\{x_{n}\}\) be a sequence in a Menger PGM-space \((X,F^{\ast },\Delta )\), where Δ is a Hadz̆ić type t-norm. If there exists a function \(\varphi \in \Phi _{w}\) such that

$$\begin{aligned} \begin{aligned}[b] (\mathrm{i})&\quad \varphi (t)>0\quad \textit{for all }t>0, \\ (\mathrm{ii})&\quad F_{x_{n},x_{n+1},x_{n+1}}^{\ast }\bigl(\varphi (t)\bigr)\geq F_{x_{n-1},x_{n},x_{n}}^{\ast }(t) \quad \textit{for all }n\in \mathbb{N}\textit{ and }t>0 \end{aligned} \end{aligned}$$

(3.2)

for all \(t>0\), \(n\geq 1\), then \(\{x_{n}\}\) is a Cauchy sequence in X.

Proof

The condition (i) implies that \(\varphi ^{n}(t)>0\) for all \(t>0\) and \(n\geq 1\), and from the condition (ii), by induction, we have

$$ F_{x_{n},x_{n+1},x_{n+1}}^{\ast }\bigl(\varphi ^{n}(t) \bigr)\geq F_{x_{0},x_{1},x_{1}}^{\ast }(t)\quad \mbox{for all }t>0, n\geq 1. $$

(3.3)

We now prove that

$$ \lim_{n\rightarrow \infty} F_{x_{n},x_{n+1},x_{n+1}}^{\ast }(t)=1 \quad \mbox{for all }t>0. $$

(3.4)

Since \(F_{x_{0},x_{1},x_{1}}^{\ast }(t)\rightarrow 1\) as \(t\rightarrow \infty \), for any \(\epsilon \in (0,1)\), there exists \(t_{1}>0\) such that \(F_{x_{0},x_{1},x_{1}}^{\ast }(t_{1})>1-\epsilon \). Since \(\varphi \in \Phi _{w}\), there exists \(t_{2}\geq t_{1}\) such that \(\lim_{n\rightarrow \infty}\varphi ^{n}(t_{2})=0\). Thus, for all \(t>0\), there exists \(n_{0}\geq 1\) such that \(\varphi ^{n}(t_{2})< t\) for all \(n\geq n_{0}\). By \(t>\varphi ^{n}(t_{2})\), \(t_{2}\geq t_{1}\), (3.3) and the monotonic property of distribution functions, we have

$$F_{x_{n},x_{n+1},x_{n+1}}^{\ast }(t)\geq F_{x_{n},x_{n+1},x_{n+1}}^{\ast }\bigl( \varphi ^{n}(t_{2})\bigr)\geq F_{x_{0},x_{1},x_{1}}^{\ast }(t_{2}) \geq F_{x_{0},x_{1},x_{1}}^{\ast }(t_{1})>1-\epsilon \quad \mbox{for all }n\geq n_{0}. $$

Thus (3.4) holds.

Since \(\varphi \in \Phi _{w}\), by Lemma 2.12, for any \(t>0\), there exists \(r\geq t\) such that \(\varphi (r)< t\). Let \(n\geq 1\) be given. Now we show by induction that, for any \(k\geq 1\),

$$ F_{x_{n},x_{n+k},x_{n+k}}^{\ast }(t)\geq \Delta ^{k} \bigl(F_{x_{n},x_{n+1},x_{n+1}}^{\ast }\bigl(t-\varphi (r)\bigr)\bigr). $$

(3.5)

For \(k=1\), from (3.5) we have

$$\begin{aligned} F_{x_{n},x_{n+1},x_{n+1}}^{\ast }(t) \geq& \Delta \bigl(F_{x_{n},x_{n+1},x_{n+1}}^{\ast } \bigl(t-\varphi (r)\bigr),F_{x_{n},x_{n+1},x_{n+1}}^{\ast }\bigl(t-\varphi (r)\bigr) \bigr) \\ =&\Delta ^{1}\bigl(F_{x_{n},x_{n+1},x_{n+1}}^{\ast }\bigl(t-\varphi (r)\bigr)\bigr). \end{aligned}$$

Thus (3.5) holds for \(k=1\). Assume that (3.5) holds for some \(k\geq 1\). Since Δ is monotone, from (iv) in Definition 2.4, and then by (3.2) and (3.5), it follows that

$$\begin{aligned} F_{x_{n},x_{n+k+1},x_{n+k+1}}^{\ast }(t) =&F_{x_{n},x_{n+k+1},x_{n+k+1}}^{\ast }\bigl(t- \varphi (r)+\varphi (r)\bigr) \\ \geq& \Delta \bigl(F_{x_{n},x_{n+1},x_{n+1}}^{\ast }\bigl(t-\varphi (r) \bigr),F_{x_{n+1},x_{n+k+1},x_{n+k+1}}^{\ast }\bigl(\varphi (r)\bigr)\bigr) \\ \geq& \Delta\bigl(F^{*}_{x_{n},x_{n+1},x_{n+1}}\bigl(t-\varphi(r) \bigr),F^{*}_{x_{n},x_{n+k},x_{n+k}}(r)\bigr)\quad (\mbox{by (3.1)}) \\ \geq& \Delta\bigl(F^{*}_{x_{n},x_{n+1},x_{n+1}}\bigl(t-\varphi(r) \bigr),F^{*}_{x_{n},x_{n+k},x_{n+k}}(t)\bigr)\quad (\mbox{since }r\geq t) \\ \geq& \Delta \bigl(F_{x_{n},x_{n+1},x_{n+1}}^{\ast }\bigl(t-\varphi (r)\bigr), \Delta ^{k}\bigl(F_{x_{n},x_{n+1},x_{n+1}}^{\ast }\bigl(t-\varphi (r) \bigr)\bigr)\bigr) \\ =&\Delta ^{k+1}\bigl(F_{x_{n},x_{n+1},x_{n+1}}^{\ast }\bigl(t-\varphi (r) \bigr)\bigr), \end{aligned}$$

which completes the conclusion.

Next we show that \(\{x_{n}\}\) is a Cauchy sequence in X, that is, \(\lim_{m,n,l\rightarrow \infty }F_{x_{n},x_{m},x_{l}}^{\ast }(t)=1\) for all \(t>0\). Let \(t>0\) and \(0<\epsilon <1\). Since \(\{\Delta ^{n}(t)\}\) is equi-continuous at \(t=1\) and \(\Delta ^{n}(1)=1\), then there exists \(\delta >0 \) such that

$$\Delta ^{n}(s)>1-\epsilon \quad \mbox{for all }s\in (1-\delta ,1] \mbox{ and }n\geq 1. $$

We first prove that \(\lim_{n,m\rightarrow \infty} F_{x_{n},x_{m},x_{m}}^{\ast }(t)\in (1-\delta ,1]\) for all \(n\geq n_{0}\). Since \(t-\varphi (r)>0\), from (3.4) there is \(n_{0}\geq 1\) such that \(F_{x_{n},x_{n+1},x_{n+1}}^{\ast }(t-\varphi (r))>1-\delta \) for all \(n\geq n_{0}\). Hence and by (3.5) we conclude that \(F_{x_{n},x_{n+k+1},x_{n+k+1}}^{\ast }(t)>1-\epsilon \) for all \(k\geq 1\). Thus we proved that

$$ \lim_{n,m\rightarrow \infty} F_{x_{n},x_{m},x_{m}}^{\ast }(t)=1 \quad \mbox{for all }t>0. $$

(3.5a)

By (iv) with \(a=x_{m}\) in Definition 2.4, we have, for all \(t>0\),

$$F_{x_{n},x_{m},x_{l}}^{\ast }(t)\geq \Delta \biggl\{ F_{x_{n},x_{m},x_{m}}^{\ast } \biggl(\frac{t}{2}\biggr),F_{x_{m},x_{m},x_{l}}^{\ast }\biggl(\frac{t}{2}\biggr)\biggr\} =\Delta \biggl\{ F_{x_{n},x_{m},x_{m}}^{\ast } \biggl(\frac{t}{2}\biggr),F_{x_{l},x_{m},x_{m}}^{\ast }\biggl( \frac{t}{2}\biggr)\biggr\} . $$

From (3.5a), it follows that

$$\begin{aligned}& \lim_{n,m\rightarrow \infty} F_{x_{n},x_{m},x_{m}}^{\ast }\biggl( \frac{t}{2}\biggr)=1\quad \mbox{for all }t>0, \\& \lim_{l,m\rightarrow \infty} F_{x_{l},x_{m},x_{m}}^{\ast }\biggl( \frac{t}{2}\biggr)=1\quad \mbox{for all }t>0. \end{aligned}$$

Thus, by using the continuity of Δ, we have

$$\lim_{m,n,l\rightarrow \infty}F_{x_{n},x_{m},x_{l}}^{\ast }(t)\geq \Delta \biggl\{ \lim_{n,m\rightarrow \infty} F_{x_{n},x_{m},x_{m}}^{\ast } \biggl(\frac{t}{2}\biggr), \lim_{l,m\rightarrow \infty}F_{x_{l},x_{m},x_{m}}^{\ast }\biggl(\frac{t}{2}\biggr)\biggr\} =\Delta (1,1)=1. $$

Therefore, we proved that

$$\lim_{m,n,l\rightarrow \infty} F_{x_{n},x_{m},x_{l}}^{\ast }(t)=1\quad \mbox{for all }t>0. $$

This shows that \(\{x_{n}\}\) is a Cauchy sequence in X. □

Corollary 3.3

[16]

Let \(\{x_{n}\}\) be a sequence in a Menger PM-space \((X,F,\Delta )\), where Δ is a Hadz̆ić type t-norm. If there exists a function \(\varphi \in \Phi _{w}\) such that

$$\begin{aligned} (\mathrm{i})&\quad \varphi (t)>0 \quad \textit{for all }t>0, \\ (\mathrm{ii})&\quad F_{x_{n},x_{m}}\bigl(\varphi (t)\bigr)\geq F_{x_{n-1},x_{m-1}}(t) \end{aligned}$$

(3.6)

for all \(t>0\), \(n,m\geq 1\), then \(\{x_{n}\}\) is a Cauchy sequence in X.

Proof

Define \(F_{x,y,z}^{\ast }(t)=\min \{F_{x,y}(t),F_{y,z}(t),F_{x,z}(t)\}\) for all \(x,y,z\in X\) and \(t>0\). Then \((X,F^{\ast },\Delta )\) is a probabilistic G-metric space.

Since \(F_{x_{n},x_{n+1},x_{n+1}}^{\ast }(\varphi (t))=\min \{F_{x_{n},x_{n+1}}(\varphi (t)),F_{x_{n+1},x_{n+1}}(\varphi (t)),F_{x_{n},x_{n+1}}(\varphi (t))\}\), it follows

$$ F_{x_{n},x_{n+1},x_{n+1}}^{\ast }\bigl(\varphi (t) \bigr)=F_{x_{n},x_{n+1}}\bigl(\varphi (t)\bigr). $$

(3.7)

Similarly we have

$$ F_{x_{n-1},x_{n},x_{n}}^{\ast }(t)=F_{x_{n-1},x_{n}}(t). $$

(3.8)

By using (3.7), (3.8) and (3.6), we have, for all \(t>0\),

$$F_{x_{n},x_{n+1},x_{n+1}}^{\ast }\bigl(\varphi (t)\bigr)=F_{x_{n},x_{n+1}}\bigl( \varphi (t)\bigr)\geq F_{x_{n-1},x_{n}}(t)=F_{x_{n-1},x_{n},x_{n}}^{\ast }(t). $$

Hence we conclude that (3.2) holds. By Lemma 3.2, we conclude that \(\{x_{n}\} \) is a Cauchy sequence in the sense of PGM-space \((X,F^{\ast },\Delta )\), that is, given \(\epsilon >0\), \(\lambda >0\) there exists a positive integer \(N_{\epsilon ,\lambda }\) such that

$$ F_{x_{n},x_{m},x_{l}}^{\ast }(\epsilon )\geq 1-\lambda \quad \mbox{for all } m,n,l>N_{\epsilon ,\lambda }. $$

(3.9)

By definition of \(F^{\ast }\) and (3.9), we have, for all \(t>0\),

$$\min \bigl\{ F_{x_{n},x_{m}}(t),F_{x_{m},x_{l}}(t),F_{x_{n},x_{l}}(t)\bigr\} \geq 1-\lambda. $$

This shows that \(\{x_{n}\}\) is a Cauchy sequence in the sense of PM-space \((X,F,\Delta )\). □

Lemma 3.4

Let \((X,F^{\ast },\Delta )\) be a PGM-space. If there exists a function \(\varphi \in \Phi _{w}\) such that

$$ F_{x,y,y}^{\ast }\bigl(\varphi (t)\bigr)\geq F_{x,y,y}^{\ast }(t) $$

(3.10)

for all \(t>0\) and \(x,y\in X\), then \(x=y\).

Proof

Since \(F^{\ast }\) is monotonic, it is obvious that from (3.10) it follows \(\varphi (t)>0\) for all \(t>0\). Therefore we have \(\varphi ^{n}(t)>0\) for all \(t>0\) and \(n\geq 1\). By induction, we have from (3.10) that

$$ F_{x,y,y}^{\ast }\bigl(\varphi ^{n}(t) \bigr)\geq F_{x,y,y}^{\ast }(t) $$

(3.11)

for all \(t>0\) and \(n\geq 1\).

To prove \(x=y\), it is required that \(F_{x,y,y}^{\ast }(t)=1\) for all \(t>0\). Suppose, to the contrary, that there exists some \(t_{0}>0\) such that \(F_{x,y,y}^{\ast }(t_{0})<1\). Since \(\lim_{t\rightarrow \infty} F_{x,y,y}^{\ast }(t)=1\), there exists \(t_{1}>t_{0}\) such that

$$ F_{x,y,y}^{\ast }(t)>F_{x,y,y}^{\ast }(t_{0}) $$

(3.12)

for all \(t\geq t_{1}\).

Since \(\varphi \in \Phi _{w}\), there exists \(t_{2}\geq t_{1}\) such that \(\lim_{n\rightarrow \infty}\varphi ^{n}(t_{2})=0\). Therefore, we can choose large enough \(n_{0}\geq 1\) such that \(\varphi ^{n_{0}}(t_{2})< t_{0}\). By the monotone property of \(F^{\ast }\), using (3.11) and (3.12), we have

$$F_{x,y,y}^{\ast }(t_{0})\geq F_{x,y,y}^{\ast } \bigl(\varphi ^{n_{0}}(t_{2})\bigr)\geq F_{x,y,y}^{\ast }(t_{2})>F_{x,y,y}^{\ast }(t_{0}), $$

which is a contradiction. Therefore \(F_{x,y,y}^{\ast }(t)=1\) for all \(t>0\). Hence \(x=y\). □

Theorem 3.5

Let \((X,F^{\ast },\Delta )\) be a PGM-space with a continuous t-norm Δ of H-type. If the mapping f is a probabilistic φ-contraction, then f has a unique fixed point in X.

Proof

Let \(x_{0}\in X\) be an arbitrary point X and the sequence \(\{x_{n}\}\) be defined as follows: \(x_{n+1}=f^{n}x_{0}\) for all \(n\geq 0\). Since f is a probabilistic φ-contraction, by (3.1) for all \(t>0\) we have

$$\begin{aligned} F_{x_{n},x_{n+1},x_{n+1}}^{\ast }\bigl(\varphi (t)\bigr) =&F_{fx_{n-1},fx_{n},fx_{n}}^{\ast } \bigl(\varphi (t)\bigr) \\ \geq& F_{x_{n-1},x_{n},x_{n}}^{\ast }(t). \end{aligned}$$

By Lemma 3.2 we conclude that the sequence \(\{x_{n}\}\) is a Cauchy sequence in X. Since X is complete, there exists \(x\in X\) such that \(\lim_{n\rightarrow \infty }x_{n}=x\), that is, for all \(t>0\),

$$ \lim_{n\rightarrow \infty} F_{x,x_{n},x_{n}}^{\ast }(t)=1. $$

(3.13)

Now we prove that x is a fixed point of f.

By (iv) with \(a=fx_{n}\) in Definition 2.4, we have

$$F_{fx,x,x}^{\ast }(t)\geq \Delta \bigl(F_{fx,fx_{n},fx_{n}}^{\ast } \bigl(\varphi (t)\bigr),F_{fx_{n},x,x}^{\ast }\bigl(t-\varphi (t)\bigr) \bigr)=\Delta \bigl(F_{fx,fx_{n},fx_{n}}^{\ast }\bigl(\varphi (t) \bigr),F_{x_{n+1},x,x}^{\ast }\bigl(t-\varphi (t)\bigr)\bigr). $$

Hence, by (3.1), we get

$$ F_{fx,x,x}^{\ast }(t)\geq \Delta \bigl(F_{x,x_{n},x_{n}}^{\ast }(t),F_{x_{n+1},x,x}^{\ast } \bigl(t-\varphi (t)\bigr)\bigr). $$

(3.14)

Again by (iii) and (iv) with \(a=x_{n+1}\) in Definition 2.4,

$$F_{x_{n+1},x,x}^{\ast }\bigl(t-\varphi (t)\bigr)=F_{x,x,x_{n+1}}^{\ast } \bigl(t-\varphi (t)\bigr)\geq \Delta \biggl(F_{x,x_{n+1},x_{n+1}}^{\ast }\biggl( \frac{t-\varphi (t)}{2}\biggr),F_{x_{n+1},x,x_{n+1}}^{\ast }\biggl(\frac{t-\varphi (t)}{2} \biggr)\biggr). $$

Hence, by (iii) in Definition 2.4, we have

$$F_{x_{n+1},x,x}^{\ast }\bigl(t-\varphi (t)\bigr)\geq \Delta \biggl(F_{x,x_{n+1},x_{n+1}}^{\ast }\biggl(\frac{t-\varphi (t)}{2}\biggr),F_{x,x_{n+1},x_{n+1}}^{\ast }\biggl(\frac{t-\varphi (t)}{2}\biggr)\biggr). $$

Now from (3.14) we get

$$ F_{fx,x,x}^{\ast }(t)\geq \Delta \biggl(F_{x,x_{n},x_{n}}^{\ast }(t), \Delta \biggl(F_{x,x_{n+1},x_{n+1}}^{\ast }\biggl(\frac{t-\varphi (t)}{2}\biggr),F_{x,x_{n+1},x_{n+1}}^{\ast }\biggl(\frac{t-\varphi (t)}{2}\biggr)\biggr) \biggr). $$

(3.15)

Since \(\lim_{n\rightarrow \infty}x_{n}=\lim_{n\rightarrow \infty}x_{n+1}=x\) and Δ is continuous, taking \(n\rightarrow \infty \) in (3.15) we get, for all \(t>0\),

$$F_{fx,x,x}^{\ast }(t)\geq \Delta \bigl(1,\Delta (1,1)\bigr)=\Delta (1,1)=1. $$

Hence

$$fx=x, $$

that is, x is a fixed point of f.

Next suppose that \(y\neq x\) is another fixed point of f. Then, for all \(t>0\), we have

$$\begin{aligned} F_{x,y,y}^{\ast }\bigl(\varphi (t)\bigr) =&F_{fx,fy,fy}^{\ast } \bigl(\varphi (t)\bigr) \\ \geq& F_{x,y,y}^{\ast }(t), \end{aligned}$$

which implies, by Lemma 3.4, that \(x=y\). Therefore, f has a unique fixed point in X. This completes the proof of the theorem. □

Example 3.6

Let \(X=[0,\infty )\) and \(\Delta (a,b)=\min \{a,b\}\) for all \(a,b\in X\). Define a function \(F^{\ast }:X^{3}\times {}[ 0,\infty )\rightarrow {}[ 0,\infty )\) by

$$F_{x,y,z}^{\ast }(t)=\frac{t}{t+G(x,y,z)} $$

for all \(x,y,z\in X\) and \(G(x,y,z)=|x-y|+|y-z|+|z-x|\). Then \((X,F^{\ast },\Delta )\) is a probabilistic G-metric space (see [15]).

Let \(f:X\rightarrow X\) be a mapping defined by \(fx=\frac{x}{2}\) and \(\varphi :R^{+}\rightarrow R^{+}\) be defined by

$$\varphi (t)=\left \{ \textstyle\begin{array}{l@{\quad}l} \frac{t}{2} & \mbox{if } 0\leq t< 1, \\ -\frac{t}{3}+\frac{4}{3}& \mbox{if } 1\leq t\leq \frac{3}{2}, \\ t-\frac{2}{3}& \mbox{if } \frac{3}{2}< t< \infty . \end{array}\displaystyle \displaystyle \displaystyle \displaystyle \right . $$

It is easy to verify that \(\varphi \in \Phi _{w}\) and \(\varphi (t)\geq \frac{ t}{2}\) for all \(t\geq 0\).

Now we show that f satisfies (3.1).

We have

$$\begin{aligned} F_{fx,fy,fz}^{\ast }\bigl(\varphi (t)\bigr) =&\frac{\varphi (t)}{\varphi (t)+[|fx-fy|+|fy-fz|+|fz-fx|]} \\ =&\frac{\varphi (t)}{\varphi (t)+[|\frac{x}{2}-\frac{y}{2}|+|\frac{y}{2}-\frac{z}{2}|+|\frac{z}{2}-\frac{x}{2}|]} \\ \geq& \frac{\frac{t}{2}}{\frac{t}{2}+[|\frac{x}{2}-\frac{y}{2}|+|\frac{y}{2}-\frac{z}{2}|+|\frac{z}{2}-\frac{x}{2}|]} \\ \geq& \frac{t}{t+[|x-y|+|y-z|+|z-x|]} \\ =&F_{x,y,z}^{\ast }(t). \end{aligned}$$

This shows that (3.1) holds and f has a fixed point in X. The fixed point is 0.