• Title of article

    New Fractional Operators Theory and Applications

  • Author/Authors

    Hussain, Khudair O Department of Mathematics - College of Science - AL-Mustansiriyah University - Baghdad, Iraq , Al-Jawari, Naseif J Department of Mathematics - College of Science - AL-Mustansiriyah University - Baghdad, Iraq , Mazeel, Abdul Khaleq O Department of Mathematics - College of Science - AL-Mustansiriyah University - Baghdad, Iraq

  • Pages
    21
  • From page
    825
  • To page
    845
  • Abstract
    In this article, we present a new fractional integral with a non-singular kernel and by using Laplace transform, we derived the corresponding fractional derivative. By composition between our fractional integration operator with classical Caputo and Riemann-Liouville fractional operators, we establish a new fractional derivative which is interpolated between the generalized fractional derivatives in a sense Riemann-Liouville and Caputo-Fabrizio with non-singular kernels. Additionally, we introduce the fundamental properties of these fractional operators with applications and simulations. Finally, a model of Coronavirus (COVID-19) transmission is presented as an application.
  • Keywords
    non-singular kernels , Fractional integral , fractional derivative , Coronavirus (COVID-19)
  • Journal title
    International Journal of Nonlinear Analysis and Applications
  • Serial Year
    2021
  • Record number

    2702965