A mathematical model of syphilis transmission in an MSM population
From MaRDI portal
Publication:288940
DOI10.1016/j.mbs.2016.03.017zbMath1358.92096OpenAlexW2315810684WikidataQ39856002 ScholiaQ39856002MaRDI QIDQ288940
Zhisheng Shuai, Pauline van den Driessche, Chadi M. Saad-Roy
Publication date: 27 May 2016
Published in: Mathematical Biosciences (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.mbs.2016.03.017
Related Items
Dynamics in a simple evolutionary-epidemiological model for the evolution of an initial asymptomatic infection stage ⋮ Products of compartmental models in epidemiology ⋮ Dynamics of infectious diseases: a review of the main biological aspects and their mathematical translation ⋮ Modeling syphilis and HIV coinfection: a case study in the USA ⋮ Mathematical analysis of the transmission dynamics of HIV syphilis co-infection in the presence of treatment for syphilis ⋮ The dynamics of vector-borne relapsing diseases ⋮ Stationary distribution and extinction of a stochastic model of syphilis transmission in an MSM population with telegraph noises ⋮ A co-infection model for HPV and syphilis with optimal control and cost-effectiveness analysis
Cites Work
- Complete global stability for an SIRS epidemic model with generalized non-linear incidence and vaccination
- Sign patterns that require or allow particular refined inertias
- Determining important parameters in the spread of malaria through the sensitivity analysis of a mathematical model
- Reproduction numbers and sub-threshold endemic equilibria for compartmental models of disease transmission
- Population dynamics of a mathematical model for syphilis
- Models of Bovine Babesiosis including juvenile cattle
- On the global stability of SIS, SIR and SIRS epidemic models with standard incidence
- Global Stability of Infectious Disease Models Using Lyapunov Functions
- A New Mathematical Model of Syphilis
- Nonlinear Oscillations in Epidemic Models
- Sensitivity and Uncertainty Analysis of Complex Models of Disease Transmission: An HIV Model, as an Example
- Unnamed Item
- Unnamed Item
- Unnamed Item
