Computational analysis of the Covid-19 model using the continuous Galerkin-Petrov scheme

被引:0
|
作者
Naz, Rahila [1 ]
Jan, Aasim Ullah [1 ]
Attaullah [2 ]
Boulaaras, Salah [3 ]
Guefaifia, Rafik [3 ]
机构
[1] Department of Mathematics & Statistics, Bacha Khan University, KP, Charsadda,24461, Pakistan
[2] Department of Mathematics & Statistics, University of Chitral, KP, Chitral,17200, Pakistan
[3] Department of Mathematics, College of Science, Qassim University, Buraydah,51452, Saudi Arabia
来源
Nonlinear Engineering | 2024年 / 13卷 / 01期
关键词
Epidemiological models feature reliable and valuable insights into the prevention and transmission of lifethreatening illnesses. In this study; a novel SIRmathematical model for COVID-19 is formulated and examined. The newly developed model has been thoroughly explored through theoretical analysis and computational methods; specifically the continuous Galerkin-Petrov (cGP) scheme. The next-generationmatrix approachwas used to calculate the reproduction number (R )0 . Both disease-free equilibrium (DFE) (E0) and the endemic equilibrium(E∗) points are derived for the proposed model. The stability analysis of the equilibrium points reveals that (E0) is locally asymptotically stable when R0 0 > 1. We have examined the model's local stability (LS) and global stability (GS) for endemic equilibrium and DFE based on the number (R0). To ascertain the dominance of the parameters; we examined the sensitivity of the number (R0) to parameters and computed sensitivity indices. Additionally; using the fourth-order Runge-Kutta (RK4) and Runge-Kutta- Fehlberg (RK45) techniques implemented in MATLAB; we determined the numerical solutions. Furthermore; the model was solved using the continuous cGP time discretization technique. We implemented a variety of schemes like cGP(2); RK4; and RK45 for the COVID-19 model and presented the numerical and graphical solutions of the model. Furthermore; we compared the results obtained using the above-mentioned schemes and observed that all results overlap with each other. The significant properties of several physical parameters under consideration were discussed. In the end; the computational analysis shows a clear image of the rise and fall in the spread of this disease over time in a specific location. © 2024 the author(s); published by De Gruyter;
D O I
10.1515/nleng-2024-0028
中图分类号
学科分类号
摘要
引用
收藏
相关论文
共 50 条
  • [1] STABILITY AND COMPUTATIONAL ANALYSIS OF COVID-19 USING A HIGHER ORDER GALERKIN TIME DISCRETIZATION SCHEME
    Jeelani, Mdi Begum
    ADVANCES AND APPLICATIONS IN STATISTICS, 2023, 86 (01) : 167 - 206
  • [2] A local projection stabilization/continuous Galerkin-Petrov method for incompressible flow problems
    Ahmed, Naveed
    John, Volker
    Matthies, Gunar
    Novo, Julia
    APPLIED MATHEMATICS AND COMPUTATION, 2018, 333 : 304 - 324
  • [3] Nonlinear Vibration Analysis of Euler-Bernoulli Beams by Using Continuous Galerkin-Petrov Time-Discretization Method
    Khan, M. Sabeel
    Kaneez, H.
    LATIN AMERICAN JOURNAL OF SOLIDS AND STRUCTURES, 2017, 14 (09): : 1695 - 1709
  • [4] CONSERVATION OF HAMILTONIAN USING CONTINUOUS GALERKIN PETROV TIME DISCRETIZATION SCHEME
    Qureshi, Muhammad Amer
    Hussain, S.
    Shabbir, Ghulam
    MATHEMATICAL REPORTS, 2017, 19 (01): : 127 - 143
  • [5] Numerical computation of heat transfer enhancement through Cosserat hybrid nanofluids using continuous Galerkin-Petrov method
    Khan, Sabeel M.
    Kaneez, H.
    EUROPEAN PHYSICAL JOURNAL PLUS, 2020, 135 (02):
  • [6] A higher order Galerkin time discretization scheme for the novel mathematical model of COVID-19
    Attaullah, Muhammad
    Jawad, Muhammad
    Alyobi, Sultan
    Yassen, Mansour F.
    Weera, Wajaree
    AIMS MATHEMATICS, 2023, 8 (02): : 3763 - 3790
  • [7] Continuous Galerkin Petrov Time Discretization Scheme for the Solutions of the Chen System
    Hussain, S.
    Salleh, Z.
    JOURNAL OF COMPUTATIONAL AND NONLINEAR DYNAMICS, 2015, 10 (06):
  • [8] Analysis of a COVID-19 compartmental model: a mathematical and computational approach
    Abreu, Zita
    Cantin, Guillaume
    Silva, J. Cristiana
    MATHEMATICAL BIOSCIENCES AND ENGINEERING, 2021, 18 (06) : 7979 - 7998
  • [9] Evaluation of COVID-19 pandemic spreading using computational analysis on nonlinear SITR model
    Ghasemi, S. E.
    Gouran, Sina
    MATHEMATICAL METHODS IN THE APPLIED SCIENCES, 2022, 45 (17) : 11104 - 11116
  • [10] Computational Model on COVID-19 Pandemic Using Probabilistic Cellular Automata
    Ghosh S.
    Bhattacharya S.
    SN Computer Science, 2021, 2 (3)
12345