Coronavirus disease (COVID-19) is an infectious disease caused by a newly discovered coronavirus. This paper provides a numerical solution for the mathematical model of the novel coronavirus by the application of alternative Legendre polynomials to find the transmissibility of COVID-19. The mathematical model of the present problem is a system of differential equations. The goal is to convert this system to an algebraic system by use of the useful property of alternative Legendre polynomials and collocation method that can be solved easily. We compare the results of this method with those of the Runge–Kutta method to show the efficiency of the proposed method.
All Keywords
【저자키워드】 COVID-19, coronavirus, Operational matrix of derivative, Alternative Legendre polynomials, 【초록키워드】 Infectious disease, Novel coronavirus, Transmissibility, disease, Efficiency, this system, caused, provide, mathematical, algebraic, 【제목키워드】 Novel coronavirus,
【저자키워드】 COVID-19, coronavirus, Operational matrix of derivative, Alternative Legendre polynomials, 【초록키워드】 Infectious disease, Novel coronavirus, Transmissibility, disease, Efficiency, this system, caused, provide, mathematical, algebraic, 【제목키워드】 Novel coronavirus,