A Discrete Mathematical Model of the Variable State
of the Pandemic

Dublin Core

Title

A Discrete Mathematical Model of the Variable State
of the Pandemic

Subject

pandemic; mathematical modeling Covid-19; open
systems; equation of the discrete variable state, superposition of
epidemic waves, prediction.

Description

The paper describes and analyzes a discrete
mathematical model of the variable state of the pandemic, which
is important for determining production quantities of vaccines
and antiviral drugs, predicting the number of infected persons,
and the intensity of the process of disseminating information or
new ideas to the public. According to the system of differential
equations of the pandemic, a discrete mathematical model in
vector-matrix form was developed and the equilibrium of the
model in the space state was proved. As a result of the
implementation of the pandemic model, the discrete dynamic
curves of the variable state were obtained in a Matlab package.

Creator

Avtandil Bradvelidze, János Sztrik, Khatuna Bradvelidze, Irakli Basheleishvili

Source

www.ijcit.com

Date

April 2022

Contributor

peri irawan

Format

pdf

Language

english

Type

text

Files

Citation

Avtandil Bradvelidze, János Sztrik, Khatuna Bradvelidze, Irakli Basheleishvili, “A Discrete Mathematical Model of the Variable State
of the Pandemic,” Repository Horizon University Indonesia, accessed June 1, 2025, https://repository.horizon.ac.id/items/show/9023.