• Title of article

    Modelling covid-19 data using double geometric stochastic process

  • Author/Authors

    Jasim, Omar R. College of Administration and Economics - University of Al-Hamdaniya, Iraq , Nauef, Qutaiba N. College of Administration and Economics - University of Bagdad, Bagdad, Iraq

  • Pages
    12
  • From page
    1243
  • To page
    1254
  • Abstract
    Some properties of the geometric stochastic process (GSP) are studied along with those of a related process which we propose to call the Double geometric stochastic process (DGSP), under certain conditions. This process also has the same advantages of tractability as the geometric stochastic process; it exhibits some properties which may make it a useful complement to the multiple Trends geometric stochastic process. Also, it may be fit to observed data as easily as the geometric stochastic process. As a first attempt, the proposed model was applied to model the data and the Coronavirus epidemic in Iraq to reach the best model that represents the data under study. A chicken swarm optimization algorithm is proposed to choose the best model representing the data, in addition to estimating the parameters a, b, μ, and σ2 of the double geometric stochastic process, where μ and σ2 are the mean and variance of X1, respectively.
  • Keywords
    double geometric stochastic process , geometric stochastic process , parameter estimation , chicken swarm optimization algorithm , multiple monotone trends , root mean square criteria
  • Journal title
    International Journal of Nonlinear Analysis and Applications
  • Serial Year
    2021
  • Record number

    2701739