Modeling the dynamics of novel coronavirus (2019-nCov) with fractional derivative

Khan, Muhammad Altaf; Atangana, Abdon

doi:10.1016/j.aej.2020.02.033

Cited by 618 publications

(496 citation statements)

References 15 publications

(18 reference statements)

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“…A mathematical model for reproducing the stage-based transmissibility of a novel coronavirus is examined by Chen et.al in [10]. In [11] Khan et al formulated Mathematical model of coronavirus versus people which is given as, 1) where N represents the total population of people. Further, N is segregated into five subclasses such as susceptible people S(t), exposed people E(t), infected (symptomatic), people I(t), asymptotically infected A(t) and and the removed or the recovered people R(t).…”

Section: Mathematical Modelmentioning

confidence: 99%

“…Motivated by the above useful applications of the Caputo-Fabrizio (CF) operator in epidemic mathematical models, in this paper we are studying dynamics of novel coronavirus model suggested by Khan et.al. [11] in the form of the system of the nonlinear differential equations involving the CF fractional derivative operator of order τ such that τ ∈ (0, 1].…”

Section: Mathematical Modelmentioning

confidence: 99%

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A Mathematical Model of COVID-19 Using Fractional Derivative: Outbreak in India with Dynamics of Transmission and Control

Shaikh

Nisar

2020

Preprint

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Since the first case of 2019 novel coronavirus disease (COVID-19) detected on Jan 30, 2020, in India, the number of cases rapidly increased to 3819 cases including 106 deaths as of 5 April 2020. Taking this into account, in the present work, we are studying a Bats-Hosts-Reservoir-People transmission fractional-order COVID-19 model for simulating the potential transmission with the thought of individual social response and control measures by the government. The real data available about infectious cases from $14^{th}$ March to $26^{th}$ March 2020 is analysed and accordingly various parameters of the model are estimated or fitted. The Picard successive approximation technique and Banach's fixed point theory have been used for verification of the existence and stability criteria of the model. Numerical computations are done utilizing the iterative Laplace transform method. In the end, we illustrate the obtained results graphically. The purpose of this study is to estimate the effectiveness of preventive measures, predicting future outbreaks and potential control strategies using the mathematical model.

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Section: Mathematical Modelmentioning

confidence: 99%

Section: Mathematical Modelmentioning

confidence: 99%

A Mathematical Model of COVID-19 Using Fractional Derivative: Outbreak in India with Dynamics of Transmission and Control

Shaikh

Nisar

2020

Preprint

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“…The consideration of these statistics prompted researchers from Turkey and South Africa to undertake research in di¤erent …elds of science, technology and engineering in the last 3 months, since their future is left uncertain. As the virologists are focusing their attention in developing a vaccine that could be used to prevent the spread of the deadly virus; mathematicians rely on modelling techniques to produce multi-scenarios models that could be utilized to foresee the future [1][2][3][4][5][6]. Therefore, as mathematicians our role is to use and apply mathematical tools, particularly mathematical models, on suggested scenarios that could be helpful in predicting the future.…”

Section: Introductionmentioning

confidence: 99%

Mathematical model of COVID-19 spread in Turkey and South Africa: Theory, methods and applications

Atangana

Araz

2020

Preprint

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A comprehensive study about the spread of COVID-19 cases in Turkey and South Africa has been presented in this paper . An exhaustive statistical analysis encompassing arithmetic, geometric, harmonic means, standard deviation, skewness, variance, Pearson and Spearman correlation was derived from the data collected from Turkey and South Africa within the period of 11 . It was observed that in the case of Turkey, a negative Spearman correlation for the number of infected class and a positive Spearman correlation for both the number of deaths and recoveries were obtained. This implied that the daily infections could decrease, while the daily deaths and number of recovered people could increase under current conditions. In the case of South Africa, a negative Spearman correlation for both daily deaths and daily infected people was obtained, indicating that these numbers may decrease if the current conditions are maintained. The utilization of a statistical technique predicted the daily number of infected, recovered and dead people for each country; and three results were obtained for Turkey, namely an upper boundary, a prediction from current situation and lower boundary. The prediction shows that Turkey may register in the near future approximately more than 6000 new infections in a day as worst case scenario; and less than 300 cases in the perfect scenario. However, the country could register in the near future a daily number of 27000 people recovered from COVID-19 in the perfect scenario; and less than 5000 people in a worst scenario. Moreover, Turkey in a worst-case scenario could record a high number of approximately 200 deaths per day; and less than 150 deaths in a perfect scenario. Similarly, in the case of South Africa, the prediction results show that in the near future the country could register about 500 new infected cases daily and more than 25 deaths in the worst scenario; while in a perfect scenario less than 50 new infected and zero death cases could be recorded. The histograms of the daily number of newly infected, recovered and death showed a sign of lognormal and normal distribution, which is presented using the Bell curving method parameters estimation. A new mathematical model COVID-19 comprised of nine classes was suggested; of which a formula of the reproductive number, well-poseness of the solutions and the stability analysis were presented in details. The suggested model was further extended to the scope of nonlocal operators for each case; whereby the Atangana-Seda numerical method was used to provide numerical solutions, and simulations were performed for di¤erent non-integer numbers. Additionally, sections devoted to control optimal and others dedicated to compare cases between Turkey and South Africa with the aim to comprehend why there are less numbers of deaths and infected people in South Africa than Turkey were presented in details.

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“…One way to predict the dynamic spread of the epidemic is by the use of computer simulation following the mathematical model of an epidemic. In the literature, several analytical approaches have been proposed to model the pandemic including Susceptible-Infected-Removed (SIR) model [6][7], Susceptible-Exposed-Infected-Removed (SEIR) model [1], Susceptible-Infected-Recovered-Dead (SIRD) model [8,9], and fractional-derivative SEIR [10], and SEIRD [11]. While some recent studies are addressing this epidemic using the aforementioned models [6][7][8][9][10][11], there is an increasing need to develop an open-source computer program to perform a time-domain simulation of the dynamic spread of the virus.…”

Section: Introductionmentioning

confidence: 99%

SimCOVID: Open-Source Simulation Programs for the COVID-19 Outbreak

Abdulrahman

2020

Preprint

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This paper presents an open-source computer simulation program developed for simulating, tracking and forecasting the COVID-19 outbreak. The program is built in Simulink with a block diagram display. The mathematical model used in this program is the SIR and SEIRD models represented by a set of differential-algebraic equations. It can be easily modified to develop new models for the problem. The program uses the outbreaks of China and Italy as test models. The infection and recovery rate functions are treated as constant, variable, or a combination of the two. In addition, an adaptive neuro-fuzzy inference system is employed and proposed to train the model and predict its output. The program showed good matching between the simulated and the reported cases and it predicts the final size of the Italy outbreak to be in the range 230,000-330,000 cases as of July 2020.

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Modeling the dynamics of novel coronavirus (2019-nCov) with fractional derivative

Cited by 618 publications

References 15 publications

A Mathematical Model of COVID-19 Using Fractional Derivative: Outbreak in India with Dynamics of Transmission and Control

A Mathematical Model of COVID-19 Using Fractional Derivative: Outbreak in India with Dynamics of Transmission and Control

Mathematical model of COVID-19 spread in Turkey and South Africa: Theory, methods and applications

SimCOVID: Open-Source Simulation Programs for the COVID-19 Outbreak

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