Abstract

In this article, a qualitative analysis of the mathematical model of novel corona virus named COVID-19 under nonsingular derivative of fractional order is considered. The concerned model is composed of two compartments, namely, healthy and infected. Under the new nonsingular derivative, we, first of all, establish some sufficient conditions for existence and uniqueness of solution to the model under consideration. Because of the dynamics of the phenomenon when described by a mathematical model, its existence must be guaranteed. Therefore, via using the classical fixed point theory, we establish the required results. Also, we present the results of stability of Ulam’s type by using the tools of nonlinear analysis. For the semianalytical results, we extend the usual Laplace transform coupled with Adomian decomposition method to obtain the approximate solutions for the corresponding compartments of the considered model. Finally, in order to support our study, graphical interpretations are provided to illustrate the results by using some numerical values for the corresponding parameters of the model.

1. Introduction

Mathematical models are powerful tools to study various physical phenomena of real world problems. The respective idea was initiated by Bernouli in 1776. After that, the first mathematical model of infectious disease was formulated in 1927 by Mckendrick and Karmark. Following that, this area got considerable attention and lots of models, which describe numerous physical or biological processes, were formed; the reader may refer to [1–5] for more information about some models. By using mathematical models for the description of infectious diseases, we can get information about the transmission of a disease in a community, its mortality rates, and how to control it. Therefore, this area has been established in the last few decades very well, (see [6–9]). Several outbreaks in the form of pandemics have been come out like in 1920 and 1967 in which more than 100 million people died. During the start of this century, there also occurred some outbreaks in Saudi Arabia, China, and Mexico. In these outbreaks, thousands of people lost their lives. But due to the rapid advancement in medical science, vaccines were prepared and made those diseases curable. In the end of 2019, a serious outbreak has occurred in Hubei Province of China due to a virus known as corona which has been named the novel COVID-19. This outbreak is in progress and more than three million people have been infected in almost every country of the globe. Nearly 0.22 million people have died due this disease. Three months have gone but, up to date, neither proper cure nor some suitable vaccine have been prepared yet [10]. The World Health Organization (WHO) reported the presence of a novel coronavirus (2019-nCoV) in Wuhan City, Hubei Province of China, on 31 December 2019. The virus which caused this infection belongs to the previous family of SARS. Investigating the present literature, there are many theories behind the origin of the virus. Some researchers have investigated that it originated from bats to human due unlawful full transmissions of animals in a market of seafood in Wuhan. The concerned virus has been identified in pangolin and also in dogs. Therefore, it has been considered that many infected cases claimed that they had been working in a local fish and wild animal market in Wuhan from where they caught infection of coronavirus-19. After that, researchers confirmed that the widespread of the disease is due to person-to-person contact. Also, the mentioned city of the Republic of China is a great trade center from where the infection was transferred to many countries of the world through immigration; for details, we refer to [11, 12].

Keeping in mind what we have mentioned above, numerous researchers started to model the disease to figure out the properties in different ways. Recently, some researchers in [13] have constructed the following mathematical models under ordinary derivative, as a modification to some previously studied prey-predator models [14–16], as follows:

In the above model, stands for healthy individual, for infected individuals, and for the infection rate, where the rate of immigration of healthy individuals from one place to another place is denoted by . Further, the rate at which infection take immigration is , while death rate is denoted by and cure rate by . Since immigration of people is also a big cause of spreading of this disease, it is evident to check the impact of the immigration of individuals on the transmission dynamics of the current disease. On the other hand, such a study may help in forming some precautionary measures to protect more people from this infection.

The study of the mathematical models under fractional derivatives instead of usual ordinary derivatives produces more significant results which are more helpful in understanding. In fact, numerous fractional order derivatives have been introduced and used in literature including “Caputo and Riemann-Liouville” derivatives which are the most popular differential operators. There are large number of applications in real world problems due to fractional calculus; see [17–23]. Recently, some authors replaced the singular kernel in classical nonlocal fractional derivatives by a nonsingular kernel of “Mittag-Leffler” type; for details, see [24, 25] and the references therein. It is remarkable that fractional derivatives in fact are defined by means of convolutions which contain ordinary derivatives as a special case. Further, the geometry of fractional derivatives tells us about the accumulation of the whole function. Actually, fractional operators, either of singular or without singular kernels, are nonlocal with memory effect unlike ordinary differential operators which are local in nature. Fractional order operators involving “Mittag-Leffler” kernels have been proved more practical and efficient like the classical nonlocal fractional operators; see [25–29]. Further investigating dynamics problems under fractional derivatives instead of integer order derivative produces global dynamics of the concerned problems which include the integer order derivative as a special case [30–36].

Inspired from the aforesaid discussion, in this paper, we investigate the COVID-19 model (1) under the new type derivatives as where, in the above model, stands for Atangana-Baleanu-Caputo (ABC) derivative of order . We shall analyze the above model from various aspects including existence theory and series type solution. We shall also investigate some stability results of Ulam’s type for the considered model. For the existence theory, we use the classical fixed point theorems of Krasnoselskii’s and Banach. In addition to the series type solutions, we shall use the integral transforms given by Laplace and decomposition technique of Adomian. Numerical interpretations are given via graphs to demonstrate the obtained results. Also, it is necessary that the right hand side of the above COVID-19 ABC-model must vanish at 0 (see Theorem 3.1 in [30]).

1.1. Organization of the Paper

Section 1 is devoted to introduction of the paper. In Section 2, some fundamental results are given. Also, in Section 3, we establish the existence results while in Section 4, the required analytical results are constructed. Section 5 is related to the graphical presentations of the results and their discussion. In Section 6, we provide a brief conclusion and some future directions.

2. Background Results

Here, we provide some necessary results that may be found in [29] and the references therein such as [24, 25].

Definition 2.1. Ifand, then the ABC derivative is defined byWe remark that if we replaceby, then we get the so-called Caputo-Fabrizo differential operator. Further, it is to be noted thatHere,is known as the normalization function which is defined as. Also,stands for famous special function called Mittag-Leffler which is a generalization to the exponential function [17–19].

Definition 2.2. Let, then the corresponding integral in ABC sense is given by

Lemma 2.3. (See Proposition 3 in [28]). The solution of the given problem for, is provided by

Definition 2.4. The Laplace transform of ABC derivative of a functionis defined by

Note: for the qualitative analysis, we define Banach space as , where under the norm . The following fixed point theorem will be used to proceed to our main results.

Theorem 2.5. [36]. Letbe a convex subset ofand assume thatare two operators with(1)for every(2)F is contraction(3)G is continuous and compactThen, the operator equationhas at least one solution.

3. Qualitative Analysis of Model (2)

Here, we are going to discuss existence and uniqueness of solution for our main model. Let us write model (2) as where if we apply the fractional integral of order on both sides of (9) and make use of Lemma 2.3 together with the use of the initial conditions, we get

To derive the existence and uniqueness, we imposed some growth conditions on the nonlinear functions .

(A1). There exists constants such that for each such that

(A2). There exists constants and such that

Theorem 3.1. Under the continuity oftogether with assumption(A2), system (5) has at least one solution if, where.

Proof. By the help of Krasnoselskii’s fixed point theorem, we shall prove the existence result. We define the operators by using (6) as follows: Now, we show that is a contraction and is a completely continuous operator. For any we have which implies that and similarly, one has From (8) and (9), one has which implies that is a contraction. Let us define a closed subset of as For to be compact and continuous, let any , we have From (10) and (10), we have Hence, is bounded. Next, we show that is equicontinuous. Let then consider Similarly, Now, from (12) and (14), we see as then the right sides tend to zero. Hence, we see that Consequently, we claim that

Hence, is a equicontinuous operator. By using Arzelà–Ascoli theorem, the operator is a completely continuous operator and also uniformly bounded proved already. Hence, is relatively compact. By Krasnoselskii’s fixed point theorem, the given system has at least one solution.

Next, we establish results about uniqueness of solution as follows:

Theorem 3.2. Under the assumption(A1), our COVID-19 system under ABC derivative has a unique solution ifwith.

Proof. Define the operator using (6) as Now, we take and ∈ Z and using (15), we have and in same fashion, one has From (16) and (17), we have Hence, is a contraction. By Banach contraction theorem, the considered system has unique solution.

Next, we give a results about Ulam-Hyers stability.

Theorem 3.3. The solution of the considered model (2) is Ulam-Hyers stable if the spectral radius of the following matrixgiven by, where

Proof. be any solution of the model (2) and is unique solution of the same model; then, we have where and are given as in (19). Hence, the solution of the given system is Ulam-Hyers stable. Since the eigenvalues of square matrix are and spectral radius of the matrix is given by

4. Analytical Study of Model (2)

In this section, we apply the proposed novel analytical method to find the series type solution of the suggested model (2). To this end, we take the Laplace transform of both sides of (2) and use the initial conditions to get

After rearranging the terms in (34), one has