Abstract

In this paper, a nonlinear fractional-order chikungunya disease model that incorporates asymptomatic infectious individuals is proposed and analyzed. The main interest of this work is to investigate the role of memory effects on the dynamics of chikungunya. Qualitative analysis of the model’s equilibria showed that there exists a threshold quantity which governs persistence and extinction of the disease. Model parameters were estimated based on the 2015 weekly reported cases in Colombia. The Adams-Bashforth-Moulton method was used to numerically solve the proposed model. We investigated the role of asymptomatic infectious patients on short- and long-term dynamics of the diseases. We also determined threshold levels for the efficacy of preventative strategies that results in effective management of the disease. We believe that our model can provide invaluable insights for public health authorities to predict the effect of chikungunya transmission and analyze its underlying factors and to guide new control efforts.

1. Introduction

Emerging and reemerging diseases of vector-borne infections such as Zika virus and chikungunya pose a considerable public health problem worldwide [1]. Previous studies reported that vector-borne diseases are emerging at a growing rate and bearing a disproportionate segment of all new infectious diseases, the vast majority of them being viruses [1, 2]. These diseases are currently associated with high mortality and morbidity, which triggers immeasurable loss in many societies. For this reason, there is growing interest among researchers to utilize different techniques to study the dynamics of vector-borne infections with a goal to provide useful means for policymakers to evaluate potential ways of effectively managing these diseases [3, 4].

Although various techniques can be used to understand the short- and long-term dynamics of vector-borne infections, mathematical modeling is now regarded as a standard and indispensable tool for understanding the mechanisms of interaction between host and vectors [5, 6]. Models are used to approach questions which are too complex, inaccessible, numerous, diverse, mutable, unique, dangerous, expensive, big, small, slow, or fast to approach by other means [7]. In this study, we seek to develop and analyze a mathematical framework for understanding the dynamics of chikungunya virus.

Chikungunya is a viral infection whose causative agent is an alphavirus that infects humans through bites of Aedes mosquitoes [8]. The initial chikungunya cases were in Tanzania in the mid-1900s [9]. The clinical indications of chikungunya infections resemble those of dengue fever and include rashes and high fever [9, 10]. The onset of the disease in humans is often rapid and takes 5-7 days, and several case fatalities have been reported [11, 12]. Over the past 50 years, numerous cases of chikungunya reemergence have occurred in different parts of Africa and Asia [13, 14]. The infection has presently been established in nearly 40 countries but is endemic in Africa where its transmission is maintained between mosquitoes, primates, and humans [15]. The most notable outbreak occurred in India in 2005-2006 when the WHO approximated 1.3 million cases [16, 17].

In the last two decades, a plethora of mathematical models have been proposed to explain and predict as well as quantify the effectiveness ways of managing chikungunya virus (see, for example, [8, 18–26] and references therein). Yakob and Clements [8] constructed and analyzed a deterministic mathematical model for chikungunya virus that incorporated two infected human subpopulations designated as symptomatic and asymptomatic. Among several outcomes, their study demonstrated the strong influence that both the latent period of infection in humans and the prepatent period have on the dynamics of the disease. In [20], a spatial stochastic model was utilized to show that perifocal vector control is capable of limiting the spread of chikungunya. In [23], a stochastic model that incorporated climate-based mosquito population was proposed to identify temporal windows that have epidemic risk in the United States (US). Among several outcomes, their work strongly suggested that, in the event of an introduction and establishment of chikungunya in the US, endemic and epidemic regions would emerge initially, primarily defined by environmental factors controlling annual mosquito population cycles. In [24], a system of ordinary differential equations was employed to investigate and understand the importance of different model parameters on the dynamics of chikungunya. In [26], a mathematical framework was proposed to model and analyze virus mutation dynamics of chikungunya outbreaks. Results from their study suggested that the virus mutation dynamics could play an important role in the transmission of chikungunya. Hence, there is a need to better understand the mutation mechanism.

Despite these efforts, however, not much has been done to investigate the role of memory effects on chikungunya virus dynamics. Previous studies suggest that memory effects are inherent in many biological phenomena and models based on integer-order differentiation do not adequately capture the memory effects [27, 28]. Based on this assertion, fractional-order calculus has been widely and extensively used by several researchers recently, to investigate the role of memory effects in different diseases [29–33]. The fractional derivative has several definitions such as those derived from Riemann-Liouville, Caputo, Liouville, Weyl, Riesz, Grünwald-Litnikov, Marchaud and Hifler, Caputo-Fabrizio-Caputo, Atanga-Baleanu, Atanga-beta derivative, -fractional derivative, conformable derivative, Atangana-Koca, Atanga-Gomez, and variable-order and fractal-fractional idea [34, 35].

Motivated by the above-mentioned works, we derive a fractional-order model for chikungunya virus based on the Caputo derivative. The choice of using the Caputo derivative is also aided by the fact that the Caputo derivative for a given function which is constant is zero. Thus, the Caputo operator computes an ordinary differential equation, followed by a fractional integral to obtain the desired order of fractional derivative [36]. Most importantly, the Caputo fractional derivative allows the use of local initial conditions to be included in the derivation of the model [33, 36].

The remaining part of this paper is organized as follows: Section 2 contains some few basic definitions on fractional calculus. These definitions will be utilized to establish several important results. In Section 3, we propose and qualitatively analyze a fractional-order chikungunya virus model. In particular, we computed the reproduction number and demonstrated that it is an important threshold quantity for disease persistence and extinction. Section 4 contains numerical illustrations and discussions. The paper is concluded in Section 5

2. Preliminaries on Fractional Calculus

Throughout the paper, we use the Caputo fractional-order derivatives because the initial conditions of fractional differential equations with Caputo derivative take on the same form as that of the integer-order ones, which have received more attention in modeling and analysis of many real-world phenomena despite their inability to capture memory effects, which are inherent in these phenomena. In this section, we will present some essential definitions and lemmas that will be utilized to determine the dynamical behavior of the proposed model.

Definition 1 (see [37]). The Riemann-Liouville fractional integral operator of orderof a continuous functionis defined aswhere is the gamma function and is defined by and

Definition 2 (see [37]). The Caputo fractional derivative of orderfor a functionis defined bywhere and is a positive integer such that In particular, if , then the Caputo fractional derivative takes the form

Lemma 3 (see [38]). The solution to the Cauchy problemwith and has the form while the solution to the problem is given by where is the Mittag-Leffler function and defined by

Lemma 4 (see [39]). Letbe a continuous function onand satisfyingwith , , and , and is the initial time. Then,

Lemma 5 (see [40]). Letbe a continuous and differentiable function with. Then, for any time instant, one has

3. Model Formulation and Analytical Results

3.1. Model Formulation

Owing to the merits of fractional derivatives (discussed in Introduction) in modeling real-world problems in comparison to integer ordinary differential equations, in this section, we propose a fractional-order model for chikungunya infection. The proposed model (12) is based on the Caputo fractional operator which is known to be the most suitable for modeling biological and physical phenomena [36]. The proposed model is governed by the following assumptions: (i)The total populations of humans are subdivided into classes of susceptible , exposed , asymptomatic infectious individuals , symptomatic infectious individuals , and humans who have recovered from infection . The total vector population is subdivided into compartments of susceptible , exposed , and infectious Once infected, vectors are assumed to remain infectious for their entire life span. Throughout this paper, we will use the subscripts and to represent the human and vector population, respectively(ii)Disease transmission is assumed to occur solely when there is interaction between the host and vector. Thus, all new recruits in the both the host and vector are assumed to be susceptible to infection. In most cases, chikungunya disease does not lead to death, but its symptoms can be severe and disabling [41]. Based on this assertion, we assumed a constant size population in both the host and vector with a recruitment and non-disease-related mortality rate modeled by with Further, new recruits are assumed susceptible and their recruitment rate is proportional to the population and is given by Meanwhile, we assume that whenever there is effective contact between a susceptible individual and an infectious vector, disease transmission will occur at rate Similarly, let be the transmission rate of the disease from a infectious human to a susceptible vector whenever there is effective contact. Asymptomatic infectious individuals are assumed to have less parasite load compared to symptomatic infectious individuals. To account for this aspect, in our model formulation, we introduce a factor to model the reduction of infectivity of the asymptomatic individuals(iii)Although there is no vaccine to prevent chikungunya virus infection, humans can minimize chances of contracting the infections through a number of strategies such as the use of insect repellent, wearing of long-sleeved shirts and pants, and treating clothing and gear. Let model the effects of preventative strategies utilized by humans to minimize chances of contracting the infection (naturally or through treatment)(iv)Exposed humans are assumed to incubate the infection for days after which a proportion become asymptomatic infectious patients and the remainder, , become symptomatic infectious patients. The average infectious period of asymptomatic infectious individuals is modeled by , and symptomatic infectious individuals are assumed to be infectious for an average period of days(v)Exposed vectors incubate the disease for days after which they become infectious. Once infected, vectors are assumed to remain infectious for their entire life span

Based on the above assumptions, the proposed model (12) is summarized in Figure 1 and akes the following form: where is the order of the fractional derivative. Model (12) is subject to the initial conditions: for . By adding all the equations that govern the dynamics of the disease in the host, one can observed that the human population is assumed to be constant. Similarly, by adding all the equations for the vector population, one can also observe that the vector population is assumed to be constant. Based on this, we can consider normalized populations for both the vector and host. Let

Using the definitions in (18), the chikungunya model with normalized populations is given as follows: with subject to the initial conditions for . Since the variable does not appear in any other equations of system (12), it suffices to analyze the dynamics of chikungunya virus infection from the following reduced system:

3.2. Positivity and Boundedness of Model Solutions

Theorem 6. The fractional order (18) has a unique solution, which remains inand the closed setis a positive invariant set of system (18).

Proof. We begin by demonstrating that the solution of system (18) is always nonnegative for all . Based on system (18), we have (for Results in equation (20) demonstrate that the vector field given by the right-hand side of (18) on each coordinate plane either is tangent to the coordinate plane or points to the interior of . Hence, the domain is a positively invariant region. Moreover, if the initial conditions of system (18) are nonnegative, then it follows that the corresponding solutions of model (18) are nonnegative. Let By adding all the equations for the host population in (6), one gets It follows from Lemma 3 that (38) has a solution of the form Since , so that when , we have . Similarly, by adding all the equations for the vector population (with, ), one gets Again, by Lemma 3, we have By similar arguments as before, we have . This completes the proof.☐

3.3. Model Equilibria, Their Existence, and Global Stability

Direct calculations of system (18) show that the proposed model admits two equilibrium points, namely, the disease-free equilibrium (DFE) point (denoted by ) and the endemic equilibrium (EE) point (denoted by ) point, which are, respectively, given by . The endemic equilibrium (EE) point with with

In equation (25), we can note that the disease persists in the community if . Precisely, the threshold quantity demonstrates the power of the disease to persist or become extinct in the host population. Thus, the expression defines the basic reproduction number of the proposed fractional-order model.

Theorem 7. If, then the DFE of system ((18)) is globally asymptotically stable in, otherwise it is unstable.

Proof. By considering only the infected compartments from (18), we can write where , with and defined as follows: One can verify by direct calculations that is a nonnegative and irreducible matrix and . It follows from the Perron-Frobenius theorem [42] that has positive left eigenvector associated with , i.e., Since is a positive vector, we propose the following Lyapunov function to study the global stability of DFE: Differentiating along solutions of (12) leads to It can be easily verified that the largest invariant subset of where is the singleton . Therefore, by LaSalle’s invariance principle [43], is globally asymptotically stable in when .☐

Theorem 8. Ifthen the endemic equilibriumof system ((18)) is globally asymptotically stable in

Proof. To prove Theorem 8, we consider the following Lyapunov functional: Let . At the endemic equilibrium, we have the following identities: Let After some algebraic manipulations, one gets Since the arithmetic mean is greater than or equal to the geometric mean, it follows that terms in the brackets are Hence, we conclude that for all since , and are nonnegative whenever . Therefore, by Lasalle’s invariance principle [43], the endemic equilibrium point is globally asymptotically stable whenever .☐