Dynamics and numerical approximations for a fractional-order SIS epidemic model with saturating contact rate

Hoang, Manh Tuan; Zafar, Zain Ul Abadin; Ngo, Thi Kim Quy

doi:10.1007/s40314-020-01326-0

Cited by 8 publications

(3 citation statements)

References 46 publications

(46 reference statements)

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“…We refer the readers to [32][33][34][35][36][37][38][39] and [40][41][42][43][44][45][46][47][48][49][50][51][52][53][54] for good reviews and some recent notable works related to NSFD schemes, respectively. Recently, we have successfully developed the Mickens' methodology to construct NSFD schemes for differential equation models arising in real-world applications [55][56][57][58][59][60]. In the construction of NSFD schemes, one of the most important problem is to formulate NSFD schemes preserving the asymptotic stability of equilibrium points of differential equation models (see, for instance, [43,51,55,[61][62][63][64]).…”

Section: Introductionmentioning

confidence: 99%

A simple method for studying asymptotic stability of discrete dynamical systems and its applications

Hoang

Ngo²,

Truong

2023

Int. J. Optim. Control, Theor. Appl. (IJOCTA)

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In this work, we introduce a simple method for investigating the asymptotic stability of discrete dynamical systems, which can be considered as an extension of the classical Lyapunov's indirect method. This method is constructed based on the classical Lyapunov's indirect method and the idea proposed by Ghaffari and Lasemi in a recent work. The new method can be applicable even when equilibia of dynamical systems are non-hyperbolic. Hence, in many cases, the classical Lyapunov's indirect method fails but the new one can be used simply. In addition, by combining the new stability method with the Mickens' methodology, we formulate some nonstandard finite difference (NSFD) methods which are able to preserve the asymptotic stability of some classes of differential equation models even when they have non-hyperbolic equilibrium points. As an important consequence, some well-known results on stability-preserving NSFD schemes for autonomous dynamical systems are improved and extended. Finally, a set of numerical examples are performed to illustrate and support the theoretical findings.

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Section: Introductionmentioning

confidence: 99%

A simple method for studying asymptotic stability of discrete dynamical systems and its applications

Hoang

Ngo²,

Truong

2023

Int. J. Optim. Control, Theor. Appl. (IJOCTA)

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“…Hoang et al ( 2020 ) proposed a fractional-order SIS deterministic model with a saturated contact rate. The dynamics and numerical approximations of the model have been examined.…”

Section: Introductionmentioning

confidence: 99%

“…Further, Farooq and Bazaz (2020) proposed a real-time learning approach based on artificial neural networks (ANN) and data streams to forecast the parameters of the COVID-19 disease's non-competitive, intelligent, adaptive, and online logical model. Hoang et al (2020) proposed a fractional-order SIS deterministic model with a saturated contact rate. The dynamics and numerical approximations of the model have been examined.…”

Section: Introductionmentioning

confidence: 99%

A novel SEIAHR compartment model for accessing the impact of vaccination, intervention policies, and quarantine on the COVID-19 pandemic: a case study of most affected countries Brazil, India, Italy, and USA

et al. 2022

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In this study, an attempt has been made to formulate a novel SEIAHR deterministic compartmental model for the COVID-19 pandemic by incorporating additionally vaccinated and quarantined compartments. We obtained the basic reproduction number using the next-generation matrix approach. Thereafter, the stability of equilibrium points has been investigated using the basic reproduction number. Furthermore, we have studied the pandemic behaviour in four countries: Brazil, India, Italy, and the USA. We have fitted the proposed model to daily new cases and cumulative cases of the aforementioned countries using the nonlinear least square technique in MATLAB. Moreover, we have also estimated the best-fitted model parameters based on the available data. In addition, a numerical simulation of the model has been added to examine the influence of intervention policies, vaccination rates, vaccine efficacy, and quarantine. It was found that all the control policies had a positive impact on reducing the COVID-19 incidence.

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A Study on Fractional SIS Epidemic Model Using RPS Method

Meena,

Kumar

2023

Lecture Notes in Networks and Systems

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Dynamics and numerical approximations for a fractional-order SIS epidemic model with saturating contact rate

Cited by 8 publications

References 46 publications

A simple method for studying asymptotic stability of discrete dynamical systems and its applications

A simple method for studying asymptotic stability of discrete dynamical systems and its applications

A novel SEIAHR compartment model for accessing the impact of vaccination, intervention policies, and quarantine on the COVID-19 pandemic: a case study of most affected countries Brazil, India, Italy, and USA

A Study on Fractional SIS Epidemic Model Using RPS Method

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