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On an SIS epidemic model with power‐like nonlinear incidence and with/without cross‐diffusion

Huicong Li, Tian Xiang

2024Studies in Applied Mathematics16 citationsDOIOpen Access PDF

Abstract

Abstract We study global existence, boundedness, and convergence of nonnegative classical solutions to a Neumann initial‐boundary value problem for the following possibly cross‐diffusive SIS (susceptible–infected–susceptible) epidemic model with power‐like infection mechanism generalizing the standard mass action incidence: in a bounded smooth domain . The infection force of the form with is a natural extension of the classical mass action type , and the cross‐diffusive term with describes the effect that susceptible individuals tend to move away from higher density of infected populations. Global existence and boundedness of classical solutions are established in certain parameter ranges, and threshold/nonthreshold long‐time behaviors of global bounded solutions are also detected. Our findings significantly improve and extend previous related studies.

Topics & Concepts

Bounded functionMathematicsConvergence (economics)Action (physics)Incidence (geometry)Epidemic modelNonlinear systemMathematical analysisDomain (mathematical analysis)DiffusionBoundary value problemBoundary (topology)Power (physics)Type (biology)Applied mathematicsPhysicsGeometryDemographyQuantum mechanicsPopulationSociologyEconomicsEconomic growthEcologyBiologyMathematical and Theoretical Epidemiology and Ecology ModelsMathematical Biology Tumor GrowthEvolution and Genetic Dynamics
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