Analysis of a degenerated reaction-diffusion cholera model with spatial heterogeneity and stabilized total humans
From MaRDI portal
Publication:2140043
DOI10.1016/j.matcom.2022.02.026OpenAlexW4214635724MaRDI QIDQ2140043
Toshikazu Kuniya, Jinliang Wang, Wen-Jing Wu
Publication date: 20 May 2022
Published in: Mathematics and Computers in Simulation (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.matcom.2022.02.026
Lyapunov functionbasic reproduction numberthreshold dynamicsspatial heterogeneitydegenerated reaction-diffusion model
Related Items
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Asymptotic profiles of steady states for a diffusive SIS epidemic model with mass action infection mechanism
- Global well-posedness and asymptotic behavior of solutions to a reaction-convection-diffusion cholera epidemic model
- A reaction-convection-diffusion model for cholera spatial dynamics
- Global stability and uniform persistence of the reaction-convection-diffusion cholera epidemic model
- Varying total population enhances disease persistence: qualitative analysis on a diffusive SIS epidemic model
- Dynamics and asymptotic profiles of steady states of an epidemic model in advective environments
- A reaction-diffusion malaria model with incubation period in the vector population
- Dynamics and profiles of a diffusive host-pathogen system with distinct dispersal rates
- Dynamics of a host-pathogen system on a bounded spatial domain
- On the definition and the computation of the basic reproduction ratio \(R_ 0\) in models for infectious diseases in heterogeneous populations
- Influence of diffusion on the stability of equilibria in a reaction-diffusion system modeling cholera dynamic
- Influence of human behavior on cholera dynamics
- Asymptotic profiles of the steady states for an SIS epidemic reaction-diffusion model
- Asymptotic profiles of the positive steady state for an SIS epidemic reaction-diffusion model. I
- Semigroups of linear operators and applications to partial differential equations
- Spatial dynamics of a reaction-diffusion cholera model with spatial heterogeneity
- A reaction-diffusion malaria model with seasonality and incubation period
- A cholera epidemic model in a spatiotemporally heterogeneous environment
- Robust persistence for semidynamical systems.
- Dynamics of a reaction-diffusion waterborne pathogen model with direct and indirect transmission
- Analysis of a reaction-diffusion cholera epidemic model in a spatially heterogeneous environment
- Analysis of a reaction-diffusion cholera model with distinct dispersal rates in the human population
- A spatial SEIRS reaction-diffusion model in heterogeneous environment
- Basic reproduction ratios for periodic abstract functional differential equations (with application to a spatial model for Lyme disease)
- Impact of bacterial hyperinfectivity on cholera epidemics in a spatially heterogeneous environment
- A cholera model in a patchy environment with water and human movement
- Asymptotic profile of the positive steady state for an SIS epidemic reaction-diffusion model: effects of epidemic risk and population movement
- A spatial SIS model in advective heterogeneous environments
- Abstract Functional Differential Equations and Reaction-Diffusion Systems
- Analysis of cholera epidemics with bacterial growth and spatial movement
- On the Basic Reproduction Number of Reaction-Diffusion Epidemic Models
- Basic Reproduction Numbers for Reaction-Diffusion Epidemic Models
- Spectral Bound and Reproduction Number for Infinite-Dimensional Population Structure and Time Heterogeneity
- Global Attractors and Steady States for Uniformly Persistent Dynamical Systems
- Dynamics and profiles of a diffusive cholera model with bacterial hyperinfectivity and distinct dispersal rates
