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Mathematical Modeling of Chikungunya Dynamics: Stability and Simulation

Ruchi Arora, Dharmendra Kumar, Ishita Jhamb, Avina Kaur Narang

2020Cubo12 citationsDOIOpen Access PDF

Abstract

Abstract Infection due to Chikungunya virus (CHIKV) has a substantially prolonged recuperation period that is a long period between the stage of infection and recovery. However, so far in the existing models (SIR and SEIR), this period has not been given due attention. Hence for this disease, we have modified the existing SEIR model by introducing a new section of human population which is in the recuperation stage or in other words the human population that is no more showing acute symptoms but is yet to attain complete recovery. A mathematical model is formulated and studied by means of existence and stability of its disease free equilibrium (DFE) and endemic equilibrium (EE) points in terms of the associated basic reproduction number (R0).

Topics & Concepts

ChikungunyaBasic reproduction numberStability (learning theory)PopulationApplied mathematicsEpidemic modelStage (stratigraphy)Equilibrium pointMathematicsChikungunya feverEconometricsBiologyComputer scienceVirologyDemographyVirusDifferential equationMathematical analysisMachine learningSociologyPaleontologyMathematical and Theoretical Epidemiology and Ecology ModelsCOVID-19 epidemiological studiesMosquito-borne diseases and control
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