New applications related to Covid-19

Analysis of mathematical models projected for COVID-19 presents in many valuable outputs. We analyze a model of differential equation related to Covid-19 in this paper. We use fractal-fractional derivatives in the proposed model. We analyze the equilibria of the model. We discuss the stability analysis in details. We apply very effective method to obtain the numerical results. We demonstrate our results by the numerical simulations.

Automated summary

The analysis of mathematical models for COVID-19 has provided valuable insights. In this paper, a differential equation model related to COVID-19 was analyzed using fractal-fractional derivatives. The equilibria of the model and stability analysis were discussed in detail, along with the effective numerical method used to obtain results which were demonstrated through numerical simulations.