Application of mathematical modeling in prediction of COVID-19 transmission dynamics
The entire world has been affected by the outbreak of COVID-19 since early 2020. Human
carriers are largely the spreaders of this new disease, and it spreads much faster compared …
carriers are largely the spreaders of this new disease, and it spreads much faster compared …
[HTML][HTML] A fractional order SITR mathematical model for forecasting of transmission of COVID-19 of India with lockdown effect
SS Askar, D Ghosh, PK Santra, AA Elsadany… - Results in Physics, 2021 - Elsevier
In this paper, we consider a mathematical model to explain, understanding, and to forecast
the outbreaks of COVID-19 in India. The model has four components leading to a system of …
the outbreaks of COVID-19 in India. The model has four components leading to a system of …
Some novel mathematical analysis on the fractional‐order 2019‐nCoV dynamical model
Since December 2019, the whole world has been facing the big challenge of Covid‐19 or
2019‐nCoV. Some nations have controlled or are controlling the spread of this virus …
2019‐nCoV. Some nations have controlled or are controlling the spread of this virus …
[HTML][HTML] COVID-19 SIR model: Bifurcation analysis and optimal control
This paper proposes a SIR epidemic model with vital dynamics to control or eliminate the
spread of the COVID-19 epidemic considering the constant population, saturated treatment …
spread of the COVID-19 epidemic considering the constant population, saturated treatment …
Fractional order SIR epidemic model with Beddington–De Angelis incidence and Holling type II treatment rate for COVID-19
Swati, Nilam - Journal of Applied Mathematics and Computing, 2022 - Springer
In this paper, an attempt has been made to study and investigate a non-linear, non-integer
SIR epidemic model for COVID-19 by incorporating Beddington–De Angelis incidence rate …
SIR epidemic model for COVID-19 by incorporating Beddington–De Angelis incidence rate …
New Perturbation–Iteration Algorithm for Nonlinear Heat Transfer of Fractional Order
M Abdel Aal - Fractal and Fractional, 2024 - mdpi.com
Ordinary differential equations have recently been extended to fractional equations that are
transformed using fractional differential equations. These fractional equations are believed …
transformed using fractional differential equations. These fractional equations are believed …
Stability and Hopf bifurcation analysis of a biotic resource enrichment on a prey predator population in fractional-order system
AE Owoyemi, IM Sulaiman, SS Muhammad… - AIP Conference …, 2021 - pubs.aip.org
In this paper, we work on predator-prey Model of fractional order. The system of the model in
[1] is extending in the sense of Caputo fractional derivatives. More specifically, the study …
[1] is extending in the sense of Caputo fractional derivatives. More specifically, the study …
Stability and Bifurcation Analysis of Rössler System in Fractional Order
Rössler systems are introduced as prototype equations with the minimum ingredients for
continuous time chaos. These systems are made up of three nonlinear ordinary differential …
continuous time chaos. These systems are made up of three nonlinear ordinary differential …
[PDF][PDF] Results in Control and Optimization
M Ahmed, MHOR Khan, MMA Sarker - academia.edu
This paper proposes a SIR epidemic model with vital dynamics to control or eliminate the
spread of the COVID-19 epidemic considering the constant population, saturated treatment …
spread of the COVID-19 epidemic considering the constant population, saturated treatment …