PUBLIC REVOLUTION: A MATHEMATICAL MODELLING

Bapan Kalita

Abstract


People may become agitated against the incumbents because of many reasons. The offended public meet the common men and motivate them to become dissidents. This way the number of dissidents’ hikes and they raise their points against the stakeholders. This is called public revolution. This can be mathematically modelled. In this article, Kermack-Mckendrik’s famous SI model is used to express the situation. The common men are considered as susceptible and the dissidents are considered as infectives. The more interaction between common men and dissidents, the more chance of public revolution. The whole situation is organized with a system of ordinary differential equations. The basic reproduction number is called the basic dissidence number. If the basic dissidence number is higher than 1, then the chance of public revolution sustains.

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