Therapy through Social Medicine: Cultivating Connections and Inspiring Solutions for Healthy Living

Douglas Wilson; Griffiths Keith; Buttar Harpal; Singh Ram; De Meester Fabien; Wilczynska Agnieszka; Takahashi Toru; Douglas Wilson; Griffiths Keith; Buttar Harpal; Singh Ram; De Meester Fabien; Wilczynska Agnieszka; Takahashi Toru

doi:10.3934/medsci.2017.2.131

AIMS Medical Science

2017, Volume 4, Issue 2: 131-150. doi: 10.3934/medsci.2017.2.131

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Research article Special Issues

Therapy through Social Medicine: Cultivating Connections and Inspiring Solutions for Healthy Living

1.
Honorary Fellow of School Medicine, Pharmacy and Health, Durham University, Centre for Ageing & Dementia Research, Swansea University, UK;
2.
Formerly Director Tenovus Institute for Cancer Research, Cardiff University, Laurel Cottage, Castleton, Gwent, UK;
3.
Department of Pathology & Laboratory Medicine, Faculty of Medicine, University of Ottawa, Ontario, Canada;
4.
TsimTsoum Institute, Ulica Gołębia 2, 31-007 Kraków, Poland;
5.
Halberg Hospital and Research Institute, Moradabad, India;
6.
Graduate School of Human Environment Science, Fukuoka Women's University, Fukuoka, Japan

Received: 18 November 2016 Accepted: 13 March 2017 Published: 24 March 2017

Objective: This paper is to identify key areas where healthy living may be improved in India, and the converse, through cultivating connections at government, community, and at individual levels. Methods and Materials: Key healthy living issues for India were selected and relevant evidence obtained from internet sources together with personal experience over decades of multi- and inter-disciplinary international research activities. Approach: Key activities of connectivity in the development of Indian healthcare arising from “Methods and Materials” were evaluated. These included, the UN Millennium Development Goals, government-private interaction for healthcare benefit, family planning, Modicare 2015, women in society, business and clinical strategies, infrastructure, building “families”, fish stocks preservation, ecological epidemiology, NCDs, and transgenesis. Results: In a nutritional context, “education for all” leading to connectivity and a pragmatic inspirational approach to understanding complex issues of population dynamics is essential. Of importance are scientific endeavours in agriculture and aquaculture, water utilization, food manufacture, complex issues of supply and demand at an economic eco-friendly and sustainable level, chemoprevention and treatment of diseases (where nutritionally applicable) such as with functional foods: all of which are so vital if one is to raise standards for healthy living in this century and beyond. Developing-India could be a test-bed for other countries to follow, having both the problems and professional understanding of issues raised. By 2025, the UK’s Department for International Development programme in India aims to promote secondary school education for young girls, i.e., extending the age of marriage, and interventions that will lead to better health and nutrition, family planning, and developing skills for employment; and supporting India’s “Right to Education Act”. The outcome may result in smaller better-nourished higher-income families. Computer school networks at Nosegay Public School in Moradabad and the municipal authorities, there, aim to reduce the consumption of unhealthy foodstuff dictated by personal convenience, media influence, and urban retail outlets and promotions. The Tsim Tsoum Institute has advocated the adoption of the Mediterranean/Palaeolithic diet with its high omega-3: omega-6 fatty acid ratio aimed at an improvement in global health due to an expected reduction in the epidemic of pre-metabolic disease, type 2 diabetes and cardiovascular disease [1,2]. Tomorrow, low-cost computer apps are advocated as a driving force in the selection of healthy foods, grown/produced under environmentally safe conditions, within retail outlets for use by mothers with limited budgets that may lead to a revolution in retail management and policy. Chemo-preventive prospective strategies such as those involving polyphenols, lignans, (found in fruits, vegetables, and soya) and other natural phytochemical products, and functional foods, which balance benefit and risk of disease, need to be continually developed, especially to reduce breast and prostate cancer. Conclusion: There is an opportunity to make nutrition a central part of the post-2015 sustainable human and agricultural development agenda for the The Expert Panel for the UN 2030 programme to consider. Solutions for cultivating connections and inspiring solutions for healthy living in India have included all the above issues and this swathe of actions, some within the Nagoya protocol, has been presented for the purpose of contributing towards the health of India.

Keywords:

Citation: Douglas Wilson, Griffiths Keith, Buttar Harpal, Singh Ram, De Meester Fabien, Wilczynska Agnieszka, Takahashi Toru. Therapy through Social Medicine: Cultivating Connections and Inspiring Solutions for Healthy Living[J]. AIMS Medical Science, 2017, 4(2): 131-150. doi: 10.3934/medsci.2017.2.131

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Abstract

1. Introduction

Fixed point theory has a vital role in mathematics and applied sciences. Also, this theory has lot of applications in differential equations and integral equations to guarantee the existence and uniqueness of the solutions ^[1,2]. The Banach contraction principle ^[3] has an imperative role in fixed point theory. Since after the appearance of this principle, it has become very popular and there has been a lot of activity in this area. On the other hand, to establish Banach contraction principle in a more general structure, the notion of a metric space was generalized by Bakhtin ^[4] in 1989 by introducing the idea of a $b$ -metric space. Afterwards, the same idea was further investigated by Czerwik ^[5] to establish different results in $b$ -metric spaces. The study of $b$ -metric spaces holds a prominent place in fixed point theory. Banach contraction principle is generalized in many ways by changing the main platform of the metric space ^[6,7,8,9].

Zadeh ^[10] introduced the notion of a fuzzy set theory to deal with the uncertain states in daily life. Motivated by the concept, Kramosil and Michálek ^[11] defined the idea of fuzzy metric spaces. Grabiec ^[12] gave contractive mappings on a fuzzy metric space and extended fixed point theorems of Banach and Edelstein in such spaces. Successively, George and Veeramani ^[13] slightly altered the concept of a fuzzy metric space introduced by Kramosil and Michálek ^[11] and then attained a Hausdorff topology and a first countable topology on it. Numerous fixed point theorems have been constructed in fuzzy metric spaces. For instance, see ^{[14,15,16,17,18,19,20]}.

Nǎdǎban ^[21] studied the notion of a fuzzy $b$ -metric space and proved some results. Rakić et al. ^[22] (see also ^[23]) proved some new fixed point results in $b$ -fuzzy metric spaces. The notion of a Hausdorff fuzzy metric on compact sets is introduced in ^[24] and recently studied by Shahzad et al. ^[25] to establish fixed point theorems for multivalued mappings in complete fuzzy metric spaces. In this paper, we use the idea of a fuzzy $b$ -metric space and establish some fixed point results for multivalued mappings in Hausdorff fuzzy $b$ -metric spaces. Some fixed point theorems are also derived from these results. Finally, we investigate the applicability of the obtained results to integral equations.

Throughout the article, fuzzy metric space and fuzzy $b$ -metric space are denoted by FMS and FBMS, respectively.

2. Preliminaries

Bakhtin ^[4] defined the notion of a $b$ -metric space as follows:

Definition 2.1. ^[4] Let $\Omega$ be a non-empty set. For any real number $b\geq 1$ , a function $d_{b}\colon \Omega \times \Omega \longrightarrow \mathbb{R}$ is called a $b$ -metric if it satisfies the following properties for all $\zeta_{1}, \zeta_{2}, \zeta_{3} \in \Omega$ :

$BM1$ : $d_{b}(\zeta_{1}, \zeta_{2})\geq 0$ ;

$BM2$ : $d_{b}(\zeta_{1}, \zeta_{2}) = 0$ if and only if $\zeta_{1} = \zeta_{2}$ ;

$BM3$ : $d_{b}(\zeta_{1}, \zeta_{2}) = d_{b}(\zeta_{2}, \zeta_{1})$ for all $\zeta_{1}, \zeta_{2} \in \Omega$ ;

$BM4$ : $d_{b}(\zeta_{1}, \zeta_{3}) \leq b\Bigl[d_{b}(\zeta_{1}, \zeta_{2})+d_{b}(\zeta_{2}, \zeta_{3})\Bigr]$ .

The pair $(\Omega, d_{b})$ is called a $b$ -metric space.

Definition 2.2. ^[26] A binary operation $* : [0, 1] \times [0, 1] \rightarrow [0, 1]$ is called a continuous $t$ -norm if it satisfies the following conditions:

(1) $*$ is associative and commutative;

(2) $*$ is continuous;

(3) $\zeta * 1 = \zeta$ for all $\zeta \in [0, 1]$ ;

(4) $\zeta_{1} * \zeta_{2} \leq \zeta_{3}* \zeta_{4} \; \; \rm{wherever}\; \; \zeta_{1} \leq \zeta_{3} \; \; \rm{and}\; \; \zeta_{2} \leq \zeta_{4}$ , for all $\zeta_{1}, \zeta_{2}, \zeta_{3}, \zeta_{4}\in [0, 1]$ .

Example 2.1. Define a mapping $* : [0, 1] \times [0, 1] \rightarrow [0, 1]$ by

$\zeta_{1}* \zeta_{2} = \zeta_{1}\zeta_{2} \quad \rm{for}\; \zeta_{1}, \zeta_{2} \in [0, 1].$

It is then obvious that $*$ is a continuous $t$ -norm, known as the product norm.

George and Veermani ^[13] defined a fuzzy metric space as follows:

Definition 2.3. ^[13] Consider a nonempty set $\Omega,$ then $(\Omega, F, *)$ is a fuzzy metric space if $*$ is a continuous $t$ -norm and $F$ is a fuzzy set on $\Omega \times \Omega \times[0, +\infty)$ satisfying the following for all $\zeta_{1}, \zeta_{2}, \zeta_{3} \in \Omega$ and $\alpha, \beta > 0$ :

$[F1]:$ $F(\zeta_{1}, \zeta_{2}, \alpha) > 0 \; ;$

$[F2]:$ $F(\zeta_{1}, \zeta_{2}, \alpha) = 1$ if and only if $\zeta_{1} = \zeta_{2} \; ;$

$[F3]:$ $F(\zeta_{1}, \zeta_{2}, \alpha) = F(\zeta_{2}, \zeta_{1}, \alpha)\; ;$

$[F4]:$ $F(\zeta_{1}, \zeta_{3}, \alpha+\beta)\geq F(\zeta_{1}, \zeta_{2}, \alpha)*F(\zeta_{2}, \zeta_{3}, \beta)\; ;$

$[F5]:$ $F(\zeta_{1}, \zeta_{2}, .)\colon [0, +\infty) \rightarrow [0, 1]$ is continuous.

In ^[27], the idea of a fuzzy $b$ -metric space is given as:

Definition 2.4. ^[27] Let $\Omega \neq \phi$ be a set, $b\geq 1$ be a real number and $*$ be a continuous $t$ -norm. A fuzzy set $F_{b}$ on $\Omega\times \Omega \times [0, +\infty)$ is called a fuzzy $b$ -metric on $\Omega$ if for all $\zeta_{1}, \zeta_{2}, \zeta_{3} \in \Omega$ , the following conditions hold:

$[Fb1]:$ $F_{b}(\zeta_{1}, \zeta_{2}, \alpha) > 0 \; ;$

$[Fb2]:$ $F_{b}(\zeta_{1}, \zeta_{2}, \alpha) = 1, {\rm{ for \; all}} \; \alpha > 0$ if and only if $\zeta_{1} = \zeta_{2}\; ;$

$[Fb3]:$ $F_{b}(\zeta_{1}, \zeta_{2}, \alpha) = F_{b}(\zeta_{2}, \zeta_{1}, \alpha)\; ;$

$[Fb4]:$ $F_{b}(\zeta_{1}, \zeta_{3}, b(\alpha+\beta))\geq F_{b}(\zeta_{1}, \zeta_{2}, \alpha)* F_{b}(\zeta_{2}, \zeta_{3}, \beta)$ ${\rm{ for \; all}} \; \alpha, \beta \geq 0 \; ;$

$[Fb5]:$ $F_{b}(\zeta_{1}, \zeta_{2}, .)\colon (0, +\infty) \rightarrow [0, 1]$ is left continuous.

Example 2.2. Let $(\Omega, d_ b)$ be a $b$ -metric space. Define a mapping $F_{b} \colon \Omega\times \Omega \times [0, +\infty)\rightarrow [0, 1]$ by

$\begin{equation*} F_{b} (\zeta_{1}, \zeta_{2}, \alpha) = \begin{cases}\dfrac{\alpha}{\alpha+d_{b}(\zeta_{1}, \zeta_{2})} &{\rm {if }}\; \alpha > 0 \\ 0 & {\rm {if }}\; \alpha = 0. \end{cases}\\ \end{equation*}$

Then $(\Omega, F_{b}, \wedge)$ is a fuzzy $b$ -metric space, where

$\zeta_{1} \wedge \zeta_{2} = \min \left\lbrace \zeta_{1}, \zeta_{2}\right\rbrace \quad{\rm{for \; all}}\; \zeta_{1}, \zeta_{2} \in [0, 1].$

$\wedge$ is a $t$ -norm, known as the minimum $t$ -norm.

Following Grabiec ^[12], we extend the idea of a $G$ -Cauchy sequence and the notion of completeness in the FBMS as follows:

Definition 2.5. Let $(\Omega, F_{b}, *)$ be a FBMS.

$1)$ A sequence $\lbrace \zeta_{n}\rbrace$ in $\Omega$ is said to be a $G$ -Cauchy sequence if $\lim\limits_{n\rightarrow +\infty}F_b(\zeta_n, \zeta_{n+q}, \alpha) = 1$ for $\alpha > 0$ and $q > 0$ .

$2)$ A FBMS in which every $G$ -Cauchy sequence is convergent is called a $G$ -complete FBMS.

Similarly, for a FBMS $(\Omega, F_{b}, *)$ , a sequence $\lbrace \zeta_{n}\rbrace$ in $\Omega$ is said to be convergent if there exits $\zeta \in \Omega$ such that for all $\alpha > 0$ ,

$\lim\limits_{n\rightarrow +\infty}F_b(\zeta_n, \zeta, \alpha) = 1.$

Definition 2.6. ^[25] Let $\mho\neq \phi$ be a subset of a FBMS $(\Omega, F, *)$ and $\alpha > 0$ , then the fuzzy distance $\mathcal{F}$ of an element $\varrho_{1} \in \Omega$ and the subset $\mho\subset \Omega$ is

$\begin{equation*} \mathcal{F}(\varrho_{1}, \mho, \alpha) = \sup \lbrace F( \varrho_{1}, \varrho_{2}, \alpha) \colon \varrho_{2}\in \mho\rbrace. \end{equation*}$

Note that $\mathcal{F}(\varrho_{1}, \mho, \alpha) = \mathcal{F}(\mho, \varrho_{1}, \alpha)$ .

Lemma 2.1. ^[28] If $\Lambda \in CB(\Omega)$ , then $\zeta_{1} \in \Lambda$ if and only if $\mathcal{F}(\Lambda, \zeta_{1}, \alpha) = 1$ for all $\alpha > 0$ , where $CB(\Omega)$ is the collection of closed bounded subsets of $\Omega$ .

Definition 2.7. ^[25] Let $(\Omega, F, *)$ be a FMS. Define a function $\Theta_{\mathcal{F}}$ on $\hat{C_{0}} (\Omega)\times \hat{C_{0}} (\Omega)\times (0, +\infty)$ by

$\begin{equation*} \Theta_{\mathcal{F}}(\Lambda, \mho, \alpha) = \min \lbrace \ \inf\limits_{\varrho_{1} \in \Lambda} \mathcal{F}( \varrho_{1}, \mho, \alpha), \inf\limits_{\varrho_{2} \in \mho} \mathcal{F}( \Lambda, \varrho_{2}, \alpha) \rbrace \end{equation*}$

for all $\Lambda, \mho\in \hat{C_{0}} (\Omega)$ and $\alpha > 0$ , where $\hat{C_{0}} (\Omega)$ is the collection of all nonemty compact subsets of $\Omega$ .

Lemma 2.2. ^[29] Let $(\Omega, F, *)$ be a complete FMS and $F(\zeta_{1}, \zeta_{2}, k\alpha)\geq F\left(\zeta_{1}, \zeta_{2}, \alpha\right)$ for all $\zeta_{1}, \zeta_{2} \in \Omega, \; k \in (0, 1)$ and $\alpha > 0$ then $\zeta_{1} = \zeta_{2}$ .

Lemma 2.3. ^[25] Let $(\Omega, F, *)$ be a complete FMS such that $(\hat{C_{0}}, \Theta_{\mathcal{F}}, *)$ is a Hausdorff FMS on $\hat{C_{0}}$ . Then for all $\Lambda, \mho\in\hat{C_{0}}$ , for each $\zeta\in \Lambda$ and for $\alpha > 0$ , there exists $\varrho_{\zeta}\in \mho$ so that $\mathcal{F}(\zeta, \mho, \alpha) = F(\zeta, \varrho_{\zeta}, \alpha)$ then

$\begin{equation*} \label{eq.1} \Theta_{\mathcal{F}}(\Lambda, \mho, \alpha) \leq F( \zeta, \varrho_{\zeta}, \alpha). \end{equation*}$

The notion of a Hausdorff FMS in Definition 2.6 of ^[25] can be extended naturally for a Hausdorff FBMS on $\hat{C_{0}}$ as follows:

Definition 2.8. Let $(\Omega, F_{b}, *)$ be a FBMS. Define a function $\Theta_{\mathcal{F}_{b}}$ on $\hat{C_{0}} (\Omega)\times \hat{C_{0}} (\Omega)\times (0, +\infty)$ by

$\begin{equation*} \Theta_{\mathcal{F}_{b}}(\Lambda, \mho, \alpha) = \min \lbrace \ \inf\limits_{\zeta \in \Lambda} \mathcal{F}_{b}( \zeta, \mho, \alpha), \inf\limits_{\varrho \in\mho} \mathcal{F}_{b}( \Lambda, \varrho, \alpha) \rbrace \end{equation*}$

for all $\Lambda, \mho\in \hat{C_{0}} (\Omega)$ and $\alpha > 0$ .

3. Main results

This section deals with the idea of Hausdorff FBMS and certain new fixed point results in a fuzzy FBMS. Note that, one can easily extend Lemma 2.1 to 2.3 in the setting of fuzzy $b$ -metric spaces.

Lemma 3.1. If $\Lambda \in C\mho(\Omega),$ then $\zeta \in \Lambda$ if and only if $\mathcal{F}_{b}(\Lambda, \zeta, \alpha) = 1 \; {{for \; all}}\; \alpha > 0$ .

Proof. Since

$\mathcal{F}_b(\Lambda, \zeta, \alpha) = \sup \lbrace F_b( \zeta, \varrho, \alpha) \colon \varrho\in \Lambda\rbrace = 1,$

there exists a sequence $\lbrace \varrho_{n}\rbrace\subset \Lambda$ such that $F_b(\zeta, \varrho_{n}, \alpha) > 1-\dfrac{1}{n}.$ Letting $n\rightarrow +\infty,$ we get $\varrho_{n}\rightarrow \zeta.$ From $\Lambda \in C\mho(\Omega),$ it follows that $\zeta \in \Lambda.$ Conversely, if $\zeta \in \Lambda$ , we have

$\mathcal{F}_b(\Lambda, \zeta, \alpha) = \sup \lbrace F_\theta( \zeta, \varrho, \alpha) \colon \varrho\in \Lambda\rbrace > F_b( \zeta, \zeta, \alpha) = 1.$

Again, due to ^[17], the following fact follows from $[Fb5]$ .

Lemma 3.2. Let $(\Omega, F_{b}, *)$ be a $G$ -complete FBMS. If for two elements $\zeta, \varrho\in\Omega$ and for a number $k < 1$

$F_{b}(\zeta, \varrho, k\alpha)\geq F_{b}\left( \zeta, \varrho, \alpha\right),$

then $\zeta = \varrho$ .

Lemma 3.3. Let $(\Omega, F_{b}, *)$ be a $G$ -complete FBMS, such that $(\hat{C_{0}}, \Theta_{\mathcal{F}_{b}}, *)$ is a Hausdorff FBMS on $\hat{C_{0}}$ . Then for all $\Lambda, \mho\in\hat{C_{0}}$ , foreach $\zeta\in \Lambda$ and for $\alpha > 0$ there exists $\varrho_{\zeta}\in \mho$ , satisfying $\mathcal{F}_{b}(\zeta, \mho, \alpha) = F_{b}(\zeta, \varrho_{\zeta}, \alpha)$ also

$\begin{equation*} \Theta_{\mathcal{F}_{b}}(\Lambda, \mho, \alpha) \leq F_{b}( \zeta, \varrho_{\zeta}, \alpha). \end{equation*}$

Proof. If

$\Theta_{\mathcal{F}_{b}}(\Lambda, \mho, \alpha) = \inf\limits_{\zeta \in \Lambda} \mathcal{F}_{b}( \zeta, \mho, \alpha),$

then

$\Theta_{\mathcal{F}_{b}}(\Lambda, \mho, \alpha) \leq \mathcal{F}_{b}( \zeta, \mho, \alpha).$

Since for each $\zeta\in \Lambda$ , there exists $\varrho_{\zeta}\in\mho$ satisfying

${\mathcal{F}_{b}}(\zeta, \mho, \alpha) = F_{b}( \alpha, \varrho_{\zeta}, \alpha).$

Hence,

$\Theta_{\mathcal{F}_{b}}(\Lambda, \mho, \alpha) \leq F_{b}( \zeta, \varrho_{\zeta}, \alpha).$

Now, if

$\begin{align*} \Theta_{\mathcal{F}_{b}}(\Lambda, \mho, \alpha)& = \inf\limits_{\varrho \in \mho} \mathcal{F}_{b}( \Lambda, \varrho, \alpha)\\ &\leq\inf\limits_{\zeta \in \Lambda} \mathcal{F}_{b}( \zeta, \mho, \alpha) \\ & \leq{\mathcal{F}_{b}}(\zeta, \mho, \alpha) = F_{b}( \zeta, \varrho_{\zeta}, \alpha), \end{align*}$

this implies

$\Theta_{\mathcal{F}_{b}}(\Lambda, \mho, \alpha) \leq F_{b}( \zeta, \varrho_{\zeta}, \alpha)$

for some $\varrho_{\zeta}\in \mho.$ Hence, in both cases, the result is proved.

Theorem 3.1. Let $(\Omega, F_{b}, *)$ be a $G$ -complete FBMS with $b\geqslant 1$ and $\Theta_{\mathcal{F}_{b}}$ be aHausdorff FBMS. Let $S \colon \Omega \rightarrow \hat{C_{0}} (\Omega)$ be a multivalued mapping satisfying

$\begin{equation} \Theta_{\mathcal{F}_{b}}(S\zeta, S\varrho, k\alpha) \geq F_{b}( \zeta, \varrho, \alpha) \end{equation}$

(3.1)

for all $\zeta, \varrho \in \Omega$ , where $bk < 1,$ then $S$ has a fixed point.

Proof. For $a_{0} \in\Omega$ , we choose a sequence $\lbrace \zeta_{n}\rbrace$ in $\Omega$ as follows: Let $a_{1} \in \Omega$ such that $a_{1} \in Sa_{0}$ . By using Lemma 6, we can choose $a_{2} \in Sa_{1}$ such that

$\begin{equation*} F_{b}(a_{1}, a_{2}, \alpha)\geqslant \Theta_{\mathcal{F}_{b}}(Sa_{0}, Sa_{1}, \alpha)\; {\rm{ for\; all}}\; \alpha > 0.\\ \end{equation*}$

By induction, we have $a_{n+1} \in Sa_{n}$ satisfying

$\begin{equation*} F_{b}(a_{n}, a_{n+1}, \alpha)\geqslant \Theta_{\mathcal{F}_{b}}(Sa_{n-1}, Sa_{n}, \alpha)\; {\rm{ for \;all}}\; n\; \in\mathbb{N}. \\ \end{equation*}$

Now, by (3.1) together with Lemma 3.3, we have

$\begin{align} F_{b}(a_{n}, a_{n+1}, \alpha) &\geq \Theta_{\mathcal{F}_{b}}(Sa_{n-1}, Sa_{n}, \alpha)\geq F_{b}\left( a_{n-1}, a_{n}, \frac{\alpha}{k}\right) \\ & \geq \Theta_{\mathcal{F}_{b}}\left( Sa_{n-2}, Sa_{n-1}, \frac{\alpha}{k}\right) \geq F_{b}\left( a_{n-2}, a_{n-1}, \frac{\alpha}{k^{2}}\right) \\ & \vdots \\ & \geq \Theta_{\mathcal{F}_{b}}\left( Sa_{0}, Sa_{1}, \frac{\alpha}{k^{n-1}}\right) \geq F_{b}\left( a_{0}, a_{1}, \frac{\alpha}{k^{n}}\right) . \end{align}$

(3.2)

For any $q \in \mathbb{N}$ , writing $\alpha = \frac{\alpha}{qb}+\frac{\alpha(q-1)}{qb}$ and using $[Fb4]$ to get

$\begin{equation*} F_{b}(a_{n}, a_{n+q}, \alpha)\geq F_{b} \left( a_{n}, a_{n+1}, \frac{\alpha}{qb}\right) * F_{b} \left( a_{n+1}, a_{n+q}, \frac{(q-1)\alpha}{qb}\right).\\ \end{equation*}$

Again, writing $\frac{(q-1)\alpha}{qb} = \frac{\alpha}{qb}+\frac{\alpha(q-2)}{qb}$ together with $[Fb4]$ , we have

$\begin{equation*} F_{b}(a_{n}, a_{n+q}, \alpha) \geq F_{b} \left( a_{n}, a_{n+1}, \frac{\alpha}{qb}\right) * F_{b} \left( a_{n+1}, a_{n+2}, \frac{\alpha}{qb^{2}}\right)* F_{b} \left( a_{n+2}, a_{n+q}, \frac{(q-2)\alpha}{qb^{2}}\right).\\ \end{equation*}$

Continuing in the same way and using $[Fb4]$ repeatedly for $(q-2)$ more steps, we obtain

$\begin{align*} F_{b}(a_{n}, a_{n+q}, \alpha)\geq F_{b} \left( a_{n}, a_{n+1}, \frac{\alpha}{qb}\right) * F_{b} \left( a_{n+1}, a_{n+2}, \frac{\alpha}{qb^{2}}\right)*\ldots* F_{b} \left( a_{n+q-1}, a_{n+q}, \frac{\alpha}{qb^{q}}\right). \end{align*}$

Using (3.2) and $[Fb5]$ , we get

$\begin{equation*} \begin{split} F_{b}(a_{n}, a_{n+q}, \alpha) &\geq F_{b} \left( a_{0}, a_{1}, \frac{\alpha}{qbk^{n}}\right) * F_{b} \left( a_{0}, a_{1}, \frac{\alpha}{q(b)^{2}k^{n+1}}\right)* F_{b} \left( a_{0}, a_{1}, \frac{\alpha}{q(b)^{3}k^{n+2}}\right) * \ldots *\\ & F_{b} \left( a_{0}, a_{1}, \frac{\alpha}{q(b)^{q}k^{n+q-1}}\right). \end{split} \end{equation*}$

Consequently,

$\begin{equation*} \begin{split} F_{b}(a_{n}, a_{n+q}, \alpha) &\geq F_{b} \left( a_{0}, a_{1}, \frac{\alpha}{q(bk)k^{n-1}}\right) * F_{b} \left( a_{0}, a_{1}, \frac{\alpha}{q(bk)^{2}k^{n-1}}\right)* F_{b} \left( a_{0}, a_{1}, \frac{\alpha}{q(bk)^{3}k^{n-1}}\right) * \ldots *\\ & F_{b} \left( a_{0}, a_{1}, \frac{\alpha}{q(bk)^{q}k^{n-1}}\right). \end{split} \end{equation*}$

Since for all $n, q\in \mathbb{N}$ , we have $bk < 1$ , taking limit as $n \rightarrow +\infty$ , we get

$\lim\limits_{n\rightarrow +\infty}F_{b}(a_{n}, a_{n+q}, \alpha) = 1*1* \ldots * 1 = 1.$

Hence, $\lbrace a_{n}\rbrace$ is a $G$ -Cauchy sequence. Then, the $G$ -completeness of $\Omega$ implies that there exists $z \in \Omega$ such that

$\begin{align*} F_{b}(z, Sz, \alpha)& \geq F_{b} \left( z, a_{n+1}, \frac{\alpha}{2b}\right)*F_{b} \left( a_{n+1}, Sz, \frac{\alpha}{{2b}}\right)\\ & \geq F_{b} \left( z, a_{n+1}, \frac{\alpha}{{2b}}\right)*\Theta_{\mathcal{F}_{b}}\left( Sa_{n}, Sz, \frac{\alpha}{{2b}}\right)\\ &\geq F_{b} \left( z, a_{n+1}, \frac{\alpha}{{2b}}\right)*F_{b}\left( a_{n}, z, \frac{\alpha}{{2b}k}\right)\\ & \longrightarrow 1 \quad {\rm{as}} \quad n \rightarrow +\infty. \end{align*}$

By Lemma 3.1, we have $z \in Sz$ . Hence, $z$ is a fixed point for $S$ .

Example 3.1. Let $\Omega = \left[0, 1\right]$ and $F_{b}(\zeta, \varrho, \alpha) = \dfrac{\alpha}{\alpha+(\zeta-\varrho)^{2}}$ .

It is easy to verify that $(\Omega, F_{b}, *)$ is a $G$ -complete FBMS with $b\geq1.$

For $k\in(0, 1)$ , define a mapping $S \colon\Omega \rightarrow \hat{C_{0}} (\Omega)$ by

$\begin{equation*} S(\zeta) = \begin{cases}\lbrace0\rbrace &{\rm {if }}\; \zeta = 0 \\ \lbrace 0, \frac{\sqrt{k}\zeta}{2}\rbrace & {\rm {otherwise}}. \end{cases} \\ \end{equation*}$

In the case $\zeta = \varrho$ , we have

$\begin{align*} \Theta_{\mathcal{F}_{b}}(S\zeta, S\varrho, k\alpha) = 1 = & F_b(\zeta, \varrho, \alpha). \end{align*}$

For $\zeta\neq \varrho$ , we have the following cases:

If $\zeta = 0$ and $\varrho\in(0, 1]$ , we have

$\begin{align*} \Theta_{\mathcal{F}_{b}}&(S(0), S(\varrho), k\alpha) \\ & = \min \lbrace \ \inf\limits_{a \in S(0)} \mathcal{F}_{b}( a, S(\varrho), k\alpha), \inf\limits_{b \in S(\varrho)} \mathcal{F}_{b}( S(0), b, k\alpha) \rbrace\\ & = \min \left\lbrace \inf\limits_{a \in S(0)} \mathcal{F}_{b}\left( a, \left\lbrace 0, \frac{\sqrt{k}\varrho}{2}\right\rbrace , k\alpha\right), \inf\limits_{b \in S(\varrho)} \mathcal{F}_{b}\left( \left\lbrace 0\right\rbrace , b, k\alpha\right) \right\rbrace \\ & = \min \Biggl \lbrace \inf \left\lbrace \mathcal{F}_{b}\left( 0, \lbrace0, \frac{\sqrt{k}\varrho}{2} \rbrace , k\alpha\right) \right\rbrace, \inf \left\lbrace \mathcal{F}_{b}\left( \lbrace 0\rbrace , 0, k\alpha\right), \mathcal{F}_{b}\left( \lbrace 0\rbrace , \frac{\sqrt{k}\varrho}{2}, k\alpha\right) \right\rbrace \Biggr \rbrace \\ & = \min \Biggl \lbrace \inf \left\lbrace \sup \left\lbrace \mathcal{F}_{b}( 0, 0, k\alpha), \mathcal{F}_{b}( 0, \frac{\sqrt{k}\varrho}{2}, k\alpha)\right\rbrace \right\rbrace, \inf \left\lbrace \mathcal{F}_{b}( 0, 0, k\alpha), \mathcal{F}_{b}( 0, \frac{\sqrt{k}\varrho}{2}, k\alpha)\right\rbrace \Biggr\rbrace\\ & = \min \Biggl \lbrace \inf \left\lbrace \sup \left\lbrace 1, \dfrac{\alpha}{\alpha+\frac{\varrho^{2}}{4}}\right\rbrace \right\rbrace, \inf \left\lbrace 1, \dfrac{\alpha}{\alpha+\frac{\varrho^{2}}{4}}\right\rbrace \Biggr\rbrace\\ & = \min \Biggl \lbrace \inf \left\lbrace 1 \right\rbrace, \dfrac{\alpha}{\alpha+\frac{\varrho^{2}}{4}} \Biggr\rbrace\\ & = \min \lbrace 1, \dfrac{\alpha}{\alpha+\frac{\varrho^{2}}{4}} \rbrace = \dfrac{\alpha}{\alpha+\frac{\varrho^{2}}{4}}. \end{align*}$

It follows that $\Theta_{\mathcal{F}_{b}}(S(0), S(\varrho), k\alpha) > F_{b}(0, \varrho, \alpha) = \dfrac{\alpha}{\alpha+\varrho^{2}}.$

If $\zeta$ and $\varrho\in(0, 1]$ , an easy calculation with either possibility of supremum and infimum, yield that

$\begin{eqnarray*} & \Theta_{\mathcal{F}_{b}}(S(\zeta), S(\varrho), k\alpha) = \min\left\lbrace \sup\left\lbrace \dfrac{\alpha}{\alpha+\frac{\zeta^{2}}{4}}, \dfrac{\alpha}{\alpha+\frac{(\zeta-\varrho)^{2}}{4}}\right\rbrace , \sup\left\lbrace \dfrac{\alpha}{\alpha+\frac{\varrho^{2}}{4}}, \dfrac{\alpha}{\alpha+\frac{(\zeta-\varrho)^{2}}{4}}\right\rbrace\right\rbrace \\ & \geq\dfrac{\alpha}{\alpha+\frac{(\zeta-\varrho)^{2}}{4}} > \dfrac{\alpha}{\alpha+(\zeta-\varrho)^{2}} = F_{b}(\zeta, \varrho, \alpha). \end{eqnarray*}$

Thus, for all cases, we have

$\Theta_{\mathcal{F}_{b}}(S\zeta, S\varrho, k\alpha) \geq F_b(\zeta, \varrho, \alpha).$

Hence, all the conditions of Theorem 3.1 are satisfied and 0 is a fixed point of $S$ .

Theorem 3.2. Let $(\Omega, F_{b}, *)$ be a $G$ -complete FBMS with $b\geqslant 1$ and $\Theta_{\mathcal{F}_{b}}$ be a Hausdorff FBMS. Let $S \colon \Omega \rightarrow \hat{C_{0}} (\Omega)$ be a multivalued mapping which satisfies

$\begin{equation} \Theta_{\mathcal{F}_{b}}(S\zeta, S\varrho, k\alpha) \geq \min \left\lbrace \dfrac{\mathcal{F}_{b}( \varrho, S\varrho, \alpha) \left[ 1+\mathcal{F}_{b}( \zeta, S\varrho, \alpha) \right] }{1+F_{b}( \zeta, \varrho, \alpha) }, F_{b}( \zeta, \varrho, \alpha) \right\rbrace \end{equation}$

(3.3)

for all $\zeta, \varrho \in \Omega$ , where $bk < 1,$ then $S$ has a fixed point.

Proof. In the same way as in Theorem 3.1 for $a_{0} \in\Omega$ , we choose a sequence $\lbrace a_{n}\rbrace$ in $\Omega$ as follows: Let $a_{1} \in \Omega$ such that $a_{1} \in Sa_{0}.$ By Lemma 2.3, we can choose $a_{2} \in Sa_{1}$ such that

$\begin{equation*} F_{b}(a_{1}, a_{2}, \alpha)\geqslant\Theta_{\mathcal{F}_{b}}(Sa_{0}, Sa_{1}, \alpha)\quad {\rm{ for \;all}}\; \alpha > 0.\\ \end{equation*}$

By induction, we have $a_{n+1} \in Sa_{n}$ satisfying

$\begin{equation*} F_{b}(a_{n}, a_{n+1}, \alpha)\geqslant \Theta_{\mathcal{F}_{b}}(Sa_{n-1}, Sa_{n}, \alpha)\quad {\rm{ for\; all}}\; n\; \in\mathbb{N}. \\ \end{equation*}$

Now, by (3.3) together with Lemma 3.3, we have

$\begin{align} F_{b}(a_{n}, a_{n+1}, \alpha) &\geq \Theta_{\mathcal{F}_{b}}(Sa_{n-1}, Sa_{n}, \alpha) \\ &\geq \min \left\lbrace \dfrac{\mathcal{F}_{b}\left( a_{n}, Sa_{n}, \frac{\alpha}{k}\right) \left[ 1+\mathcal{F}_{b}\left( a_{n-1}, Sa_{n-1}, \frac{\alpha}{k}\right) \right] }{1+F_{b}\left( a_{n-1}, a_{n}, \frac{\alpha}{k}\right)}, F_{b}\left( a_{n-1}, a_{n}, \frac{\alpha}{k}\right) \right\rbrace \\ &\geq \min \left\lbrace \dfrac{F_{b}\left( a_{n}, a_{n+1}, \frac{\alpha}{k}\right) \left[ 1+F_{b}\left( a_{n-1}, a_{n}, \frac{\alpha}{k}\right) \right] }{1+F_{b}\left( a_{n-1}, a_{n}, \frac{\alpha}{k}\right) }, F_{b}\left( a_{n-1}, a_{n}, \frac{\alpha}{k}\right) \right\rbrace \\ &\geq \min \left\lbrace F_{b}\left( a_{n}, a_{n+1}, \frac{\alpha}{k}\right) , F_{b}\left( a_{n-1}, a_{n}, \frac{\alpha}{k}\right) \right\rbrace. \end{align}$

(3.4)

$\begin{equation*} \min \left\lbrace F_{b}\left( a_{n}, a_{n+1}, \frac{\alpha}{k}\right) , F_{b}\left( a_{n-1}, a_{n}, \frac{\alpha}{k}\right) \right\rbrace = F_{b}\left( a_{n}, a_{n+1}, \frac{\alpha}{k}\right), \end{equation*}$

then (3.4) implies

$\begin{equation*} F_{b}(a_{n}, a_{n+1}, \alpha) \geq F_{b}( a_{n}, a_{n+1}, \frac{\alpha}{k}). \end{equation*}$

Then nothing to prove by Lemma 3.2. If

$\begin{equation*} \min \left\lbrace F_{b}( a_{n}, a_{n+1}, \frac{\alpha}{k}) , F_{b}( a_{n-1}, a_{n}, \frac{\alpha}{k}) \right\rbrace = F_{b}( a_{n-1}, a_{n}, \frac{\alpha}{k}), \end{equation*}$

then from (3.4) we have

$\begin{equation*} F_{b}(a_{n}, a_{n+1}, \alpha) \geq F_{b}( a_{n-1}, a_{n}, \frac{\alpha}{k})\geqslant \ldots \geqslant F_{b}( a_{0}, a_{1}, \frac{\alpha}{k^{n}}). \end{equation*}$

By adopting the same procedure as in Theorem 3.1 after inequality (3.2), we can complete the proof.

Remark 3.1. By taking $b = 1$ in Theorem 3.2, Theorem 2.1 of ^[25] can be obtained.

Theorem 3.3. Let $(\Omega, F_{b}, *)$ be a $G$ -complete FBMS (with $b\geqslant 1$ ) and $\Theta_{\mathcal{F}_{b}}$ be a Hausdorff FBMS. Let $S \colon \Omega \rightarrow \hat{C}_{0}(\Omega)$ be a multivalued map which satisfies

$\begin{equation} \Theta_{\mathcal{F}_{b}}(S\zeta, S\varrho, k\alpha) \geq \min \left\lbrace \dfrac{\mathcal{F}_{b}( \varrho, S\varrho, \alpha) \left[ 1+\mathcal{F}_{b}( \zeta, S\zeta, \alpha)+\mathcal{F}_{b}( \varrho, S\zeta, \alpha) \right] }{2+F_{b}( \zeta, \varrho, \alpha) }, F_{b}( \zeta, \varrho, \alpha) \right\rbrace \end{equation}$

(3.5)

for all $\zeta, \varrho \in\Omega$ , where $bk < 1,$ then $S$ has a fixed point.

Proof. Starting same way as in Theorem 3.1, we have

$\begin{equation*} F_{b}(a_{1}, a_{2}, \alpha)\geqslant \Theta_{\mathcal{F}_{b}}(Sa_{0}, Sa_{1}, \alpha)\quad {\rm{ for \;all}}\; \alpha > 0.\\ \end{equation*}$

By induction, we have $a_{n+1} \in Sa_{n}$ satisfying

$\begin{equation*} F_{b}(a_{n}, a_{n+1}, \alpha)\geqslant \Theta_{\mathcal{F}_{b}}(Sa_{n-1}, Sa_{n}, \alpha)\quad {\rm{ for \;all}}\; n\; \in\mathbb{N}. \\ \end{equation*}$

Now, by (3.5) together with Lemma 3.3, we have

$\begin{align} F_{b}(a_{n}, a_{n+1}, \alpha) &\geq \Theta_{\mathcal{F}_{b}}(Sa_{n-1}, Sa_{n}, \alpha)\\ &\geq \min \left\lbrace \dfrac{\mathcal{F}_{b}( a_{n}, Sa_{n}, \frac{\alpha}{k}) \left[ 1+\mathcal{F}_{b}( a_{n-1}, Sa_{n-1}, \frac{\alpha}{k})+\mathcal{F}_{b}( a_{n}, Sa_{n-1}, \frac{\alpha}{k}) \right] }{2+F_{b}( a_{n-1}, a_{n}, \frac{\alpha}{k}) }, F_{b}( a_{n-1}, a_{n}, \frac{\alpha}{k}) \right\rbrace \\ &\geq \min \left\lbrace \dfrac{F_{b}( a_{n}, a_{n+1}, \frac{\alpha}{k}) \left[ 1+F_{b}( a_{n-1}, a_{n}, \frac{\alpha}{k})+F_{b}( a_{n}, a_{n}, \frac{\alpha}{k}) \right] }{2+F_{b}( a_{n-1}, a_{n}, \frac{\alpha}{k}) }, F_{b}( a_{n-1}, a_{n}, \frac{\alpha}{k}) \right\rbrace \\ &\geq \min \left\lbrace \dfrac{F_{b}( a_{n}, a_{n+1}, \frac{\alpha}{k}) \left[ 1+F_{b}( a_{n-1}, a_{n}, \frac{\alpha}{k})+1 \right] }{2+F_{b}( a_{n-1}, a_{n}, \frac{\alpha}{k}) }, F_{b}( a_{n-1}, a_{n}, \frac{\alpha}{k}) \right\rbrace \\ &\geq \min \left\lbrace \dfrac{F_{b}( a_{n}, a_{n+1}, \frac{\alpha}{k}) \left[ 2+F_{b}( a_{n-1}, a_{n}, \frac{\alpha}{k}) \right] }{2+F_{b}( a_{n-1}, a_{n}, \frac{\alpha}{k}) }, F_{b}( a_{n-1}, a_{n}, \frac{\alpha}{k}) \right\rbrace \\ &\geq \min \left\lbrace F_{b}( a_{n}, a_{n+1}, \frac{\alpha}{k}) , F_{b}( a_{n-1}, a_{n}, \frac{\alpha}{k}) \right\rbrace. \end{align}$

(3.6)

$\begin{equation*} \min \left\lbrace F_{b}( a_{n}, a_{n+1}, \frac{\alpha}{k}) , F_{b}( a_{n-1}, a_{n}, \frac{\alpha}{k}) \right\rbrace = F_{b}( a_{n}, a_{n+1}, \frac{\alpha}{k}), \end{equation*}$

then (3.6) implies

$\begin{equation*} F_{b}(a_{n}, a_{n+1}, \alpha) \geq F_{b}( a_{n}, a_{n+1}, \frac{\alpha}{k}). \end{equation*}$

Then nothing to prove by Lemma 3.2.

$\begin{equation*} \min \left\lbrace F_{b}( a_{n}, a_{n+1}, \frac{\alpha}{k}) , F_{b}( a_{n-1}, a_{n}, \frac{\alpha}{k}) \right\rbrace = F_{b}( a_{n-1}, a_{n}, \frac{\alpha}{k}), \end{equation*}$

then from (3.6), we have

$\begin{equation*} F_{b}(a_{n}, a_{n+1}, \alpha) \geq F_{b}( a_{n-1}, a_{n}, \frac{\alpha}{k})\geqslant \ldots \geqslant F_{b}( a_{0}, a_{1}, \frac{\alpha}{k^{n}}). \end{equation*}$

By adopting the same procedure as in Theorem 3.1 after inequality (3.2), we can complete the proof.

Next, a corollary of Theorem 3.3 is given.

Corollary 3.1. Let $(\Omega, F, *)$ be a $G$ -complete FMS and $\Theta_{\mathcal{F}}$ be a Hausdorff FMS. Let $S \colon\Omega \rightarrow \hat{C}_{0}(\Omega)$ be a multivalued mapping satisfying

$\begin{equation*} \Theta_{\mathcal{F}}(S\zeta, S\varrho, k\alpha) \geq \min \left\lbrace \dfrac{\mathcal{F}( \varrho, S\varrho, \alpha) \left[ 1+\mathcal{F}( \zeta, S\zeta, \alpha)+\mathcal{F}( \varrho, S\zeta, \alpha) \right] }{2+F( \zeta, \varrho, \alpha) }, F( \zeta, \varrho, \alpha) \right\rbrace \end{equation*}$

for all $\zeta, \varrho \in\Omega$ , where $0 < k < 1,$ then $S$ has a fixed point.

Proof. Taking $b = 1$ in Theorem 3.3, one can complete the proof.

Theorem 3.4. Let $(\Omega, F_{b}, *)$ be a $G$ -complete FBMS with $b\geqslant 1$ and $\Theta_{\mathcal{F}_{b}}$ be a Hausdorff FBMS. Let $S \colon \Omega \rightarrow \hat{C}_{0}(\Omega)$ be a multivalued map which satisfies

$\begin{align} \Theta_{\mathcal{F}_{b}}(S\zeta, S\varrho, k\alpha) \geq \min \Biggl\lbrace & \dfrac{\mathcal{F}_{b}( \zeta, S\zeta, \alpha) \left[ 1+\mathcal{F}_{b}( \varrho, S\varrho, \alpha) \right] }{1+\mathcal{F}_{b}( S\zeta, S\varrho, \alpha) }, \dfrac{\mathcal{F}_{b}( \zeta, S\varrho, \alpha) \left[ 1+\mathcal{F}_{b}( \zeta, S\zeta, \alpha) \right] }{1+F_{b}( \zeta, \varrho, \alpha) }, \\ & \dfrac{\mathcal{F}_{b}( \zeta, S\zeta, \alpha) \left[ 2+\mathcal{F}_{b}( \zeta, S\varrho, \alpha) \right] }{1+F_{b}( \zeta, S\varrho, \alpha)+\mathcal{F}_{b}( \varrho, S\zeta, \alpha) }, F_{b}( \zeta, \varrho, \alpha) \Biggr \rbrace \end{align}$

(3.7)

for all $\zeta, \varrho \in\Omega$ , where $bk < 1,$ then $S$ has a fixed point.

Proof. For $a_{0} \in \Omega$ , we choose a sequence $\lbrace x_{n}\rbrace$ in $\Omega$ as follows: Let $a_{1} \in \Omega$ such that $a_{1} \in Sa_{0}.$ By using Lemma 2.3, we can choose $a_{2} \in Sa_{1}$ such that

$\begin{equation*} F_{b}(a_{1}, a_{2}, \alpha)\geqslant \Theta_{\mathcal{F}_{b}}(Sa_{0}, Sa_{1}, \alpha)\quad {\rm{ for \;all}}\; \alpha > 0.\\ \end{equation*}$

By induction, we have $a_{n+1} \in Sa_{n}$ satisfying

$\begin{equation*} F_{b}(a_{n}, a_{n+1}, \alpha)\geqslant \Theta_{\mathcal{F}_{b}}(Sa_{n-1}, Sa_{n}, \alpha)\quad {\rm{ for \;all}}\; n\; \in\mathbb{N}. \\ \end{equation*}$

Now, by (3.7) together with 3.3, we have

$\begin{align*} F_{b}&(a_{n}, a_{n+1}, \alpha) \geq \Theta_{\mathcal{F}_{b}}(Sa_{n-1}, Sa_{n}, \alpha) \\ &\geq \min \Biggl\lbrace \dfrac{\mathcal{F}_{b}( a_{n-1}, Sa_{n-1}, \frac{\alpha}{k}) \left[ 1+\mathcal{F}_{b}( a_{n}, S_{a_{n}}, \frac{\alpha}{k}) \right] }{1+\mathcal{F}_{b}( Sa_{n-1}, Sa_{n}, \frac{\alpha}{k}) }, \dfrac{\mathcal{F}_{b}( a_{n}, Sa_{n}, \frac{\alpha}{k}) \left[ 1+\mathcal{F}_{b}( a_{n-1}, Sa_{n-1}, \frac{\alpha}{k}) \right] }{1+F_{b}( a_{n-1}, a_{n}, \frac{\alpha}{k}) }, \\ & \qquad \qquad \dfrac{\mathcal{F}_{b}( a_{n-1}, Sa_{n-1}, \frac{\alpha}{k}) \left[ 2+\mathcal{F}_{b}( a_{n-1}, Sa_{n}, \frac{\alpha}{k}) \right] }{1+\mathcal{F}_{b}( a_{n-1}, Sa_{n}, \frac{\alpha}{k})+\mathcal{F}_{b}( a_{n}, Sa_{n-1}, \frac{\alpha}{k}) }, F_{b}( a_{n-1}, a_{n}, \frac{\alpha}{k}) \Biggr\rbrace \end{align*}$

$\begin{align*} &\geq \min \Biggl\lbrace \dfrac{F_{b}( a_{n-1}, a_{n}, \frac{\alpha}{k}) \left[ 1+F_{b}( a_{n}, a_{n+1}, \frac{\alpha}{k}) \right] }{1+F_{b}( a_{n}, a_{n+1}, \frac{\alpha}{k}) }, \dfrac{F_{b}( a_{n}, a_{n+1}, \frac{\alpha}{k}) \left[ 1+F_{b}( a_{n-1}, a_{n}, \frac{\alpha}{k}) \right] }{1+F_{b}( a_{n-1}, a_{n}, \frac{\alpha}{k}) }, \\ & \qquad \qquad \dfrac{F_{b}( a_{n-1}, a_{n}, \frac{\alpha}{k}) \left[ 2+F_{b}( a_{n-1}, a_{n+1}, \frac{\alpha}{k}) \right] }{1+F_{b}( a_{n-1}, a_{n+1}, \frac{\alpha}{k})+F_{b}( a_{n}, a_{n}, \frac{\alpha}{k}) }, F_{b}( a_{n-1}, a_{n}, \frac{\alpha}{k}) \Biggr\rbrace \end{align*}$

$\begin{equation} F_{b}(a_{n}, a_{n+1}, \alpha)\geq \min \left\lbrace F_{b}( a_{n}, a_{n+1}, \frac{\alpha}{k}) , F_{b}( a_{n-1}, a_{n}, \frac{\alpha}{k}) \right\rbrace. \end{equation}$

(3.8)

$\begin{equation*} \min \left\lbrace F_{b}( a_{n}, a_{n+1}, \frac{\alpha}{k}) , F_{b}( a_{n-1}, a_{n}, \frac{\alpha}{k}) \right\rbrace = F_{b}( a_{n}, a_{n+1}, \frac{\alpha}{k}), \end{equation*}$

so (3.8) implies

$\begin{equation*} F_{b}(a_{n}, a_{n+1}, \alpha) \geq F_{b}( a_{n}, a_{n+1}, \frac{\alpha}{k}). \end{equation*}$

Then nothing to prove by Lemma 3.2. While, if

$\begin{equation*} \min \left\lbrace F_{b}( a_{n}, a_{n+1}, \frac{\alpha}{k}) , F_{b}( a_{n-1}, a_{n}, \frac{\alpha}{k}) \right\rbrace = F_{b}( a_{n-1}, a_{n}, \frac{\alpha}{k}), \end{equation*}$

then from (3.6) we have

$\begin{equation*} F_{b}(a_{n}, a_{n+1}, \alpha) \geq F_{b}( a_{n-1}, a_{n}, \frac{\alpha}{k})\geqslant \ldots \geqslant F_{b}( a_{0}, a_{1}, \frac{\alpha}{k^{n}}). \end{equation*}$

By adopting the same procedure as in Theorem 3.1 after inequality (3.2) we can complete the proof.

The same result in fuzzy metric spaces is stated as follows.

Corollary 3.2. Let $(\Omega, F, *)$ be a $G$ -complete FMS and $\Theta_{\mathcal{F}}$ be a Hausdorff FMS. Let $S \colon \Omega\rightarrow \hat{C_{0}}(\Omega)$ be a multivalued mapping satisfying

$\begin{align*} \Theta_{\mathcal{F}}(S\zeta, S\varrho, k\alpha) \geq \min \Biggl\lbrace & \dfrac{\mathcal{F}( \zeta, S\zeta, \alpha) \left[ 1+\mathcal{F}( \varrho, S\varrho, \alpha) \right] }{1+\mathcal{F}( S\zeta, S\varrho, \alpha) }, \dfrac{\mathcal{F}( \varrho, S\varrho, \alpha) \left[ 1+\mathcal{F}( \zeta, S_{\zeta}, \alpha) \right] }{1+F( \zeta, \varrho, \alpha) }, \notag\\ & \dfrac{\mathcal{F}( \zeta, S\zeta, \alpha) \left[ 2+\mathcal{F}( \zeta, S\varrho, \alpha) \right] }{1+\mathcal{F}( \zeta, S\varrho, \alpha)+\mathcal{F}( \varrho, S\zeta, \alpha) }, F( \zeta, \varrho, \alpha) \Biggr \rbrace \end{align*}$

for all $\zeta, \varrho \in \Omega,$ then $S$ has a fixed point.

Proof. Taking $b = 1$ in Theorem 3.4, one can complete the proof.

4. Consequences

This section is about the construction of some fixed point results involving integral inequalities as consequences of our results. Define a function $\tau \colon [0, +\infty) \rightarrow [0, +\infty)$ by

$\begin{equation} \tau(\alpha) = \int_0^\alpha \psi(\alpha)d\alpha \quad {\rm{ for \;all}} \;\; \alpha > 0, \end{equation}$

(4.1)

where $\tau(\alpha)$ is a non-decreasing and continuous function. Moreover, $\psi(\alpha) > 0$ for $\alpha > 0$ and $\psi(\alpha) = 0$ if and only if $\alpha = 0.$

Theorem 4.1. Let $(\Omega, F_{b}, *)$ be a complete fuzzy $b$ -metric space and $\Theta_{\mathcal{F}_{b}}$ be a Hausdorff fuzzy $b$ -metric space. Let $S \colon \Omega \rightarrow \hat{C}_{0}(\Omega)$ be a multivalued mapping satisfying

$\begin{equation} \int_0^{ \Theta_{\mathcal{F}_{b}}(S\zeta, S\varrho, k\alpha)} \psi(\alpha)d\alpha \geq \int_0^{ F_{b}( \zeta, \varrho, \alpha) } \psi(\alpha)d\alpha \end{equation}$

(4.2)

for all $\zeta, \varrho \in\Omega$ , where $bk < 1,$ then $S$ has a fixed point.

Proof. Taking (4.1) in account, (4.2) implies that

$\tau(\Theta_{\mathcal{F}_{b}}(S\zeta, S\varrho, k\alpha)) \geqslant\tau(F_{b}( \zeta, \varrho, \alpha)).$

Since $\tau$ is continuous and non-decreasing, we have

$\Theta_{\mathcal{F}_{b}}(S\zeta, S\varrho, k\alpha)\geqslant F_{b}( \zeta, \varrho, \alpha).$

The rest of the proof follows immediately from Theorem 3.1.

A more general form of Theorem 4.1 can be stated as an immediate consequence of Theorem 3.2.

Theorem 4.2. Let $(\Omega, F_{b}, *)$ be a complete FBMS and $\Theta_{\mathcal{F}_{b}}$ be a Hausdorff FBMS. Let $S \colon \Omega\rightarrow \hat{C}_{0}(\Omega)$ be a multivalued mapping satisfying

$\begin{equation} \int_0^{ \Theta_{\mathcal{F}_{b}}(S\zeta, S\varrho, k\alpha)} \psi(\alpha)d\alpha \geq \int_0^{ \beta( \zeta, \varrho, \alpha) } \psi(\alpha)d\alpha, \end{equation}$

(4.3)

where

$\beta( \zeta, \varrho, \alpha) = \min \left\lbrace \dfrac{\mathcal{F}_{b}( \varrho, S\varrho, \alpha) \left[ 1+\mathcal{F}_{b}( \zeta, S\varrho, \alpha) \right] }{1+F_{b}( \zeta, \varrho, \alpha) }, F_{b}( \zeta, \varrho, \alpha) \right\rbrace$

for all $\zeta, \varrho \in\Omega$ , where $bk < 1,$ then $S$ has a fixed point.

Proof. Taking (4.1) in account, (4.3) implies that

$\tau(\Theta_{\mathcal{F}_{b}}(S\zeta, S\varrho, k\alpha)) \geqslant\tau(\beta( \zeta, \varrho, \alpha).$

Since $\tau$ is continuous and non-decreasing, we have

$\Theta_{\mathcal{F}_{b}}(S\zeta, S\varrho, k\alpha)\geqslant \beta( \zeta, \varrho, \alpha).$

The rest of the proof follows immediately from Theorem 3.2.

Remark 4.1. By taking $b = 1$ in Theorem 4.2, Theorem 3.1 of ^[25] can be obtained.

Theorem 4.3. Let $(\Omega, F_{b}, *)$ be a complete FBMS and $\Theta_{\mathcal{F}_{b}}$ be a Hausdorff FBMS. Let $S \colon \Omega\rightarrow \hat{C}_{0}(\Omega)$ be a multivalued mapping satisfying

$\begin{equation*} \int_0^{ \Theta_{\mathcal{F}_{b}}(S\zeta, S\varrho, k\alpha)} \psi(\alpha)d\alpha \geq \int_0^{ \beta( \zeta, \varrho, \alpha) } \psi(\alpha)d\alpha, \end{equation*}$

where

$\beta( \zeta, \varrho, \alpha) = \min \left\lbrace \dfrac{\mathcal{F}_{b}( \varrho, S\varrho, \alpha) \left[ 1+\mathcal{F}_{b}( \zeta, S\zeta, \alpha)+\mathcal{F}_{b}( \varrho, S\zeta, \alpha) \right] }{2+F_{b}( \zeta, \varrho, \alpha) }, F_{b}( \zeta, \varrho, \alpha) \right\rbrace$

for all $\zeta, \varrho \in\Omega$ , where $bk < 1,$ then $S$ has a fixed point.

Note that if $\beta(\zeta, \varrho, \alpha) = F_{b}(\zeta, \varrho, \alpha)$ , then the above result follows from Theorem 4.1. Similar results on integral inequalities can be obtained as a consequence of Theorem 3.4.

Theorem 4.4. Let $(\Omega, F_{b}, *)$ be a complete FBMS and $\Theta_{\mathcal{F}_{b}}$ be a Hausdorff FBMS. Let $S \colon \Omega \rightarrow \hat{C}_{0}(\Omega)$ be a multivalued mapping satisfying

$\begin{equation*} \int_0^{ \Theta_{\mathcal{F}_{b}}(S\zeta, S\varrho, k\alpha)} \psi(\alpha)d\alpha \geq \int_0^{ \gamma( \zeta, \varrho, \alpha) } \psi(\alpha)d\alpha, \end{equation*}$

where

$\begin{align*} \gamma( \zeta, \varrho, \alpha) = \min \Biggl\lbrace & \dfrac{\mathcal{F}_{b}( \zeta, S\zeta, \alpha) \left[ 1+\mathcal{F}_{b}( \varrho, S\varrho, \alpha) \right] }{1+\mathcal{F}_{b}( S\zeta, S\varrho, \alpha) }, \dfrac{\mathcal{F}_{b}( \varrho, S\varrho, \alpha) \left[ 1+\mathcal{F}_{b}( \zeta, S\zeta, \alpha) \right] }{1+\mathcal{F}_{b}( \zeta, \varrho, \alpha) }, \notag\\ & \dfrac{\mathcal{F}_{b}( \zeta, S\zeta, \alpha) \left[ 2+\mathcal{F}_{b}( \zeta, S\varrho, \alpha) \right] }{1+\mathcal{F}_{b}( \zeta, S\varrho, \alpha)+\mathcal{F}_{b}( \varrho, S\zeta, \alpha) }, F_{b}( \zeta, \varrho, \alpha) \Biggr \rbrace \end{align*}$

for all $\zeta, \varrho \in \Omega$ , where $bk < 1$ , then $S$ has a fixed point.

5. An application

Nonlinear integral equations arise in a variety of fields of physical science, engineering, biology, and applied mathematics ^[31,32]. This theory in abstract spaces is a rapidly growing field with lot of applications in analysis as well as other branches of mathematics ^[33].

Fixed point theory is a valuable tool for the existence of a solution of different kinds of integral as well as differential inclusions, such as ^[33,34,35]. Many authors provided a solution of different integral inclusions in this context, for instance see ^{[30,36,37,38,39,40]}. In this section, a Volterra-type integral inclusion as an application of Theorem 3.1 is studied.

Consider $\Omega = C([0, 1], \mathbb{R})$ as the space of all continuous functions defined on $[0, 1]$ and define the $G$ -complete fuzzy $b$ -metric on $\Omega$ by

$F_b (\xi, \varrho, \alpha) = e^{-\dfrac{ {\sup\limits_{\varepsilon \in[0, 1]}}\vert \xi(\varepsilon)-\varrho(\varepsilon) \vert^{2}} {\alpha}}$

for all $\alpha > 0$ and $\xi, \varrho \in \Omega.$

Consider the integral inclusion:

$\begin{equation} \xi(\varepsilon)\in \int_0^u G(\varepsilon, \sigma, \xi(\sigma))d\sigma + h(\varepsilon) \quad {\rm{for\; all}} \;\; \varepsilon, \sigma \in[0, 1]\; {\rm{and}}\; h, \xi\in C([0, 1], \end{equation}$

(5.1)

where $G \colon [0, 1]\times[0, 1] \times \mathbb{R}\rightarrow P_{cv}(\mathbb{R})$ is a multivalued continuous function.

For the above integral inclusion, we define a multivalued operator $S: \Omega\rightarrow \hat{C_{0}} (\Omega)$ by

$S(\xi(\varepsilon)) = \Biggl\lbrace w \in \Omega : w \in \int_0^u G(\varepsilon, \sigma, \xi(\sigma))d\sigma + h(\varepsilon), \quad \varepsilon \in [0, 1]\Biggr\rbrace.$

The next result proves the existence of a solution of the integral inclusion (5.1).

Theorem 5.1. Let $S: \Omega \rightarrow \hat{C_{0}} (\Omega)$ be the multivalued integral operator given by

$S(\xi(\varepsilon)) = \Biggl\lbrace w \in \Omega : w \in \int_0^\varepsilon G(\varepsilon, \sigma, \xi(\sigma))d\sigma + h(\varepsilon), \quad \varepsilon \in [0, 1]\Biggr\rbrace.$

Suppose the following conditions are satisfied:

1) $G \colon [0, 1]\times[0, 1] \times \mathbb{R}\rightarrow P_{cv}(\mathbb{R})$ is such that $G(\varepsilon, \sigma, \xi(\sigma))$ is lower semi-continuous in $[0, 1]\times[0, 1]$ ;

2) For all $\varepsilon, \sigma \in[0, 1]$ , $f(\varepsilon, \sigma) \in \Omega$ and for all $\xi, \varrho \in\Omega$ , we have

$\vert G(\varepsilon, \sigma, \xi(\sigma))-G(\varepsilon, \sigma, \varrho(\sigma)) \vert^{2}\leq f^{2}(\varepsilon, \sigma)\vert \xi(\sigma)-\varrho(\sigma)\vert^{2},$

where $f \colon [0, 1]\rightarrow [0, +\infty)$ is continuous;

3) There exists $0 < k < 1$ such that

${ \sup\limits_{\varepsilon \in[0, 1]}}\int_0^\varepsilon f^{2}(\varepsilon, \sigma)d\sigma \leq k .$

Then the integral inclusion (5.1) has the solution in $\Omega.$

Proof. For $G \colon [0, 1]\times[0, 1] \times \mathbb{R}\rightarrow P_{cv}(\mathbb{R})$ , it follows from Michael's selection theorem that there exists a continuous operator

$G_{i} \colon [0, 1]\times[0, 1] \times \mathbb{R}\rightarrow \mathbb{R}$

such that $G_{i}(\varepsilon, \sigma, \xi(\sigma))\in G(\varepsilon, \sigma, \xi(\sigma))$ for all $\varepsilon, \sigma \in[0, 1].$ It follows that

$\xi(\varepsilon)\in \int_0^\varepsilon G_{i}(\varepsilon, \sigma, \xi(\sigma))d\sigma + h(\varepsilon))\in S(\xi(\varepsilon))$

hence $S(\xi(\varepsilon))\neq \emptyset$ and closed. Moreover, since $h(\varepsilon)$ is continuous on $[0, 1]$ , and $G$ is continuous, their ranges are bounded. This means that $S(\xi(\varepsilon))$ is bounded and $S(\xi(\varepsilon))\in\hat{C_{0}} (\Omega)$ . For $q, r \in \Omega$ , there exist $q(\varepsilon)\in S(\xi(\varepsilon))$ and $r(\varepsilon)\in S(\varrho(\varepsilon))$ such that

$q(\xi(\varepsilon)) = \Biggl\lbrace w \in \Omega : w \in \int_0^\varepsilon G_{i}(\varepsilon, \sigma, \xi(\sigma))d\sigma + h(\sigma), \quad \varepsilon \in [0, 1]\Biggr\rbrace$

and

$r(\varrho(u)) = \Biggl\lbrace w \in \Omega : w \in \int_0^\varepsilon G_{i}(\varepsilon, \sigma, \varrho(\sigma))d\sigma + h(\varepsilon), \quad \varepsilon \in [0, 1]\Biggr\rbrace.$

It follows from item 5.1 that

$\vert G_{i}(\varepsilon, \sigma, \xi(\sigma))-G_{i}(\varepsilon, \sigma, \varrho(\sigma)) \vert^{2}\leq f^{2}(\varepsilon, \sigma)\vert \xi(\sigma)-\varrho(\sigma)\vert^{2}.$

Now,

$\begin{align*} e^{-\dfrac{ {\sup\limits_{t \in[0, 1]}}\vert q(\varepsilon)- r(\varepsilon)) \vert^{2}}{k\alpha}}& \geq e^{-\dfrac{ {\sup\limits_{\varepsilon \in[0, 1]}}\int_0^\varepsilon \vert G_{i}(\varepsilon, \sigma, \xi(\sigma))-G_{i}(\varepsilon, \sigma, \varrho(\sigma)) \vert^{2} d\sigma}{k\alpha}}\\ & \geq e^{-\dfrac{ {\sup\limits_{\varepsilon \in[0, 1]}}\int_0^\varepsilon f^{2}(\varepsilon, \sigma) \vert \xi(\sigma)-\varrho(\sigma) \vert^{2} d\sigma}{k\alpha}}\\ & \geq e^{-\dfrac{\vert \xi(\sigma)-\varrho(\sigma) \vert^{2} {\sup\limits_{\varepsilon \in[0, 1]}}\int_0^\varepsilon f^{2}(\varepsilon, \sigma) d\sigma}{k\alpha}}\\ & \geq e^{-\dfrac{k\vert \xi(\sigma)-\varrho(\sigma) \vert^{2}}{k\alpha}}\\ & = e^{-\dfrac{\vert \xi(\sigma)-\varrho(\sigma) \vert^{2}}{\alpha}}\\ & \geq e^{-\dfrac{ {\sup\limits_{\sigma \in[0, 1]}}\vert \xi(\sigma)-\varrho(\sigma) \vert^{2}}{\alpha}}\\ & = F_{b}(\xi, \varrho, \alpha). \end{align*}$

So, we have

$F_{b}(q, r, k\alpha)\geq F_{b}(\xi, \varrho, \alpha).$

By interchanging the roll of $\xi$ and $\varrho$ , we reach to

$\Theta_{\mathcal{F}_{b}}(S\xi, S\varrho, k\alpha) \geq F_{b}( \xi, \varrho, \alpha).$

Hence, $S$ has a fixed point in $\Omega$ , which is a solution of the integral inclusion (5.1).

6. Conclusions

In this article we proved certain fixed point results for Hausdorff fuzzy $b$ -metric spaces. The main results are validated by an example. Theorem 3.2 generalizes the result of ^[25]. These results extend the theory of fixed points for multivalued mappings in a more general class of fuzzy $b$ -metric spaces. For instance, some fixed point results can be obtained by taking $b = 1$ (corresponding to $G$ -complete FMSs). An application for the existence of a solution for a Volterra type integral inclusion is also provided.

Acknowledgments

The author Aiman Mukheimer would like to thank Prince Sultan University for paying APC and for the support through the TAS research LAB.

Conflict of interest

The authors declare no conflict of interest.

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Therapy through Social Medicine: Cultivating Connections and Inspiring Solutions for Healthy Living

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Therapy through Social Medicine: Cultivating Connections and Inspiring Solutions for Healthy Living

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