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Analysis of illegal drug transmission model using fractional delay differential equations

Komal Bansal, Trilok Mathur, Narinderjit Singh Sawaran Singh, Shivi Agarwal

2022AIMS Mathematics22 citationsDOIOpen Access PDF

Abstract

<abstract><p>The global burden of illegal drug-related death and disability continues to be a public health threat in developed and developing countries. Hence, a fractional-order mathematical modeling approach is presented in this study to examine the consequences of illegal drug usage in the community. Based on epidemiological principles, the transmission mechanism is the social interaction between susceptible and illegal drug users. A pandemic threshold value ($ \Lambda $) is provided for the illegal drug-using profession, which determines the stability of the model. The Lyapunov function is employed to determine the stability conditions of illegal drug addiction equilibrium point of society. Finally, the proposed model has been extended to include time lag in the delayed illegal drug transmission model. The characteristic equation of the endemic equilibrium establishes a set of appropriate conditions for ensuring local stability and the development of a Hopf bifurcation of the model. Finally, numerical simulations are performed to support the analytical results.</p></abstract>

Topics & Concepts

Stability (learning theory)Lyapunov functionEquilibrium pointTransmission (telecommunications)Epidemic modelPandemicDifferential equationComputer scienceEconometricsMathematicsEconomicsMedicineCoronavirus disease 2019 (COVID-19)Environmental healthNonlinear systemPhysicsPopulationInfectious disease (medical specialty)Mathematical analysisTelecommunicationsMachine learningQuantum mechanicsPathologyDiseaseMathematical and Theoretical Epidemiology and Ecology ModelsFractional Differential Equations SolutionsCOVID-19 epidemiological studies
Analysis of illegal drug transmission model using fractional delay differential equations | Litcius