Bayesian Inference of a Discrete Fractional SEIRD Model

This paper deals with the Bayesian estimation of the parameters of a discrete fractional epidemic model SEIRD as an extension of the classical SEIR model, describing the dynamics of disease propagation in a population. Equilibrium points are computed and the existence stability nature at these points are discussed. The basic reproduction number R0 is calculated using next generation matrix method. The estimation of the parameters is based on Bayesian inference. The numerical simulations were used to illustrate the stability of the discrete fractional order SEIRD epidemic model and to evaluate the performance of the estimation method. The model introduced is applied to real data concerning pandemic COVID-19 in Morocco. © 2023, The Author(s), under exclusive license to Springer Nature Switzerland AG.

An Epidemiological Model "Covid 19 British Variant”

Everyone is talking about coronavirus from last of months due to its exponential spread throughout the globe. So, in this work we are interested in the study of an epidemiological model "covid 19 british variant”. More precisely, we made the Numerical simulation of our model. © 2023, The Author(s), under exclusive license to Springer Nature Switzerland AG.

An Epidemiological Model “Covid 19 British Variant”

Everyone is talking about coronavirus from last of months due to its exponential spread throughout the globe. So, in this work we are interested in the study of an epidemiological model “covid 19 british variant”. More precisely, we made the Numerical simulation of our model. © 2023, The Author(s), under exclusive license to Springer Nature Switzerland AG.

Bayesian Inference of a Discrete Fractional SEIRD Model

This paper deals with the Bayesian estimation of the parameters of a discrete fractional epidemic model SEIRD as an extension of the classical SEIR model, describing the dynamics of disease propagation in a population. Equilibrium points are computed and the existence stability nature at these points are discussed. The basic reproduction number R0 is calculated using next generation matrix method. The estimation of the parameters is based on Bayesian inference. The numerical simulations were used to illustrate the stability of the discrete fractional order SEIRD epidemic model and to evaluate the performance of the estimation method. The model introduced is applied to real data concerning pandemic COVID-19 in Morocco. © 2023, The Author(s), under exclusive license to Springer Nature Switzerland AG.