A study of Covid 19 disease mathematical model via wavelets
Authors
Kumbinarasaiah, S and Devaraju K S
Abstract
In \u00a0this \u00a0study, \u00a0we \u00a0propose \u00a0an \u00a0effective \u00a0numerical \u00a0algorithm \u00a0to \u00a0study \u00a0the \u00a0Covid-19 \u00a0epidemic
model that is in the form of a system of the \u00a0coupled ordinary \u00a0differential equation. \u00a0This algorithm includes
the collocation method and truncated Laguerre wavelet. Here, we reduce the system of a differential equation
into \u00a0a \u00a0set \u00a0of \u00a0algebraic \u00a0equations \u00a0which \u00a0are \u00a0having \u00a0unknown \u00a0Laguerre \u00a0wavelet \u00a0coefficients. \u00a0Moreover, \u00a0the
modeling of the spreading of a Covid-19 disease in a population is numerically solved by the present method.
