MODELING THE TRANSMISSION DYNAMICS OF DAIRY CATTLE BRUCELLOSIS IN JILIN PROVINCE, CHINA
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Publication:2937413
DOI10.1142/S021833901450020XzbMath1302.92134MaRDI QIDQ2937413
Youming Wang, Zhen Jin, Jing Nie, Chaojian Shen, Nan Wang, Xiang-Dong Sun, Baoxu Huang, Juan Zhang, Gui-Quan Sun
Publication date: 9 January 2015
Published in: Journal of Biological Systems (Search for Journal in Brave)
Related Items (10)
Transmission dynamics of brucellosis in Jilin province, China: effects of different control measures ⋮ Proof of conjecture in: The basic reproduction number obtained from Jacobian and next generation matrices -- a case study of dengue transmission modelling ⋮ Stationary distribution and extinction of a stochastic cattle brucellosis model ⋮ Dynamical analysis of the \textit{SEIB} model for brucellosis transmission to the dairy cows with immunological threshold ⋮ Transmission dynamics of a brucellosis model: basic reproduction number and global analysis ⋮ Cost assessment of control measure for brucellosis in Jilin province, China ⋮ Cost assessment of optimal control strategy for brucellosis dynamic model based on economic factors ⋮ Rich dynamics of a brucellosis model with transport ⋮ Transmission dynamics of fractional order Brucellosis model using Caputo-Fabrizio operator ⋮ Threshold dynamics of an age-space structured brucellosis disease model with Neumann boundary condition
Cites Work
- Lyapunov functions and global stability for \(SIR\) and \(SIRS\) epidemiological models with non-linear transmission
- Global stability of two models with incomplete treatment for tuberculosis
- On the definition and the computation of the basic reproduction ratio \(R_ 0\) in models for infectious diseases in heterogeneous populations
- Uniform persistence and flows near a closed positively invariant set
- Analysis of a model of bovine brucellosis using singular perturbations
- A delay mathematical model for the spread and control of water borne diseases
- Reproduction numbers and sub-threshold endemic equilibria for compartmental models of disease transmission
- The Mathematics of Infectious Diseases
- A model for ovine brucellosis incorporating direct and indirect transmission
- Uniform Stability of Switched Linear Systems: Extensions of LaSalle's Invariance Principle
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