Stability and persistence in ODE modelsfor populations with many stages

Stability and persistence in ODE modelsfor populations with many stages

A model of ordinary differential equations is formulated for populationswhich are structured by many stages. The model is motivated by tickswhich are vectors of infectious diseases, but is general enough to apply to many other species.Our analysis identifies a basic reproduction numberthat acts as a...

Full description

Saved in:

Bibliographic Details
Main Authors:	Guihong Fan, Yijun Lou, Horst R. Thieme, Jianhong Wu
Format:	Article
Language:	English
Published:	AIMS Press 2015-03-01
Series:	Mathematical Biosciences and Engineering
Subjects:	persistence uniqueness extinction basic reproduction number boundedness equilibria (existence lyapunov functions and stability).
Online Access:	https://www.aimspress.com/article/doi/10.3934/mbe.2015.12.661
Tags:	Add Tag No Tags, Be the first to tag this record!

Similar Items

A mathematical model for the seasonal transmission of schistosomiasis in the lake and marshland regions of China
by: Yingke Li, et al.
Published: (2017-09-01)

Global stability and uniform persistence of the reaction-convection-diffusion cholera epidemic model
by: Kazuo Yamazaki, et al.
Published: (2017-03-01)

Global existence and boundedness for quasi-variational systems
by: Giancarlo Cantarelli
Published: (1999-01-01)

The impact of migrant workers on the tuberculosis transmission: General models and a case study forChina
by: Luju Liu, et al.
Published: (2012-09-01)

Revisiting the classical target cell limited dynamical within-host HIV model - Basic mathematical properties and stability analysis
by: Benjamin Wacker
Published: (2024-12-01)

Network-level reproduction number and extinction threshold for vector-borne diseases
by: Ling Xue, et al.
Published: (2014-12-01)

Chemostats and epidemics: Competition for nutrients/hosts
by: Hal L. Smith, et al.
Published: (2013-07-01)

Models for the spread and persistence of hantavirus infection in rodents with direct and indirect transmission
by: Curtis L. Wesley, et al.
Published: (2009-12-01)

Robust uniform persistence in discrete and continuous dynamical systems using Lyapunov exponents
by: Paul L. Salceanu
Published: (2011-05-01)

Modeling and analysis of taeniasis and cysticercosis transmission dynamics in humans, pigs and cattle
by: Joshua, A. Mwasunda, et al.
Published: (2021)

About the existence and uniqueness theorem for hyperbolic equation
by: M. E. Khalifa
Published: (1995-01-01)

Transition of interaction outcomes in a facilitation-competition system of two species
by: Yuanshi Wang, et al.
Published: (2017-09-01)

On latencies in malaria infections and their impact on the disease dynamics
by: Yanyu Xiao, et al.
Published: (2012-12-01)

Existence of weak solutions for abstract hyperbolic-parabolic equations
by: Marcondes Rodrigues Clark
Published: (1994-01-01)

Parameters and solutions of linear and nonlinear oscillators
by: Rina Ling
Published: (1979-01-01)

A two-strain TB model with multiplelatent stages
by: Azizeh Jabbari, et al.
Published: (2016-04-01)

Epidemic threshold conditions for seasonally forced SEIR models
by: Junling Ma, et al.
Published: (2005-10-01)

On the basic reproduction number $R_0$ in sexual activity models for HIV/AIDS epidemics: Example from Yunnan, China
by: Nicolas Bacaër, et al.
Published: (2007-07-01)

Modeling control strategies for concurrent epidemics of seasonal and pandemic H1N1 influenza
by: Olivia Prosper, et al.
Published: (2010-12-01)

A male-female mathematical model of human papillomavirus (HPV) in African American population
by: Najat Ziyadi
Published: (2016-12-01)

Threshold dynamics of a periodic SIR model with delay in an infected compartment
by: Zhenguo Bai
Published: (2014-12-01)

Assessing the Role of Vaccination in the Control of Hand, Foot, and Mouth Disease Transmission
by: Zuhur Alqahtani, et al.
Published: (2025-01-01)

A final size relation for epidemic models
by: Julien Arino, et al.
Published: (2007-01-01)

Weak solutions of unconditionally stable second-order difference schemes for nonlinear sine-Gordon systems
by: Ozgur Yildirim
Published: (2024-12-01)

Epidemic models with nonlinear infection forces
by: Wendi Wang
Published: (2005-10-01)

Transmission dynamics and control for a brucellosis model in Hinggan League of Inner Mongolia, China
by: Mingtao Li, et al.
Published: (2014-05-01)

Optimal control analysis of Taenia saginata bovine cysticercosis and human taeniasis
by: Damian, Kajunguri, et al.
Published: (2022)

A general existence theorem for a multi-valued control problem
by: Emamizadeh, Behrouz, et al.
Published: (2024-03-01)

Caputo fractional model for the predator–prey relation with sickness in prey and refuge to susceptible prey
by: Shivani Sharma, et al.
Published: (2024-12-01)

Modeling and optimal regulation of erythropoiesis subject to benzene intoxication
by: H. T. Banks, et al.
Published: (2004-02-01)

Global dynamics of a vector-host epidemic model with age of infection
by: Yan-Xia Dang, et al.
Published: (2017-09-01)

Modeling and analysis of the San Francisco City Clinic Cohort (SFCCC) HIV-epidemic including treatment
by: Brandy Rapatski, et al.
Published: (2013-12-01)

Global stability of the steady states of an epidemic model incorporating intervention strategies
by: Yongli Cai, et al.
Published: (2017-09-01)

Mixed vaccination strategy for the control of tuberculosis: A case study in China
by: Siyu Liu, et al.
Published: (2017-05-01)

Ebola: Impact of hospital's admission policy in an overwhelmed scenario
by: Mondal Hasan Zahid, et al.
Published: (2018-11-01)

Discrete quadratic splines
by: Surendra Singh Rana
Published: (1990-01-01)

Local existence for a general model of size-dependent population dynamics
by: Nobuyuki Kato, et al.
Published: (1997-01-01)

Using Chebyshev’s polynomials for solving Fredholm integral equations of the second kind
by: José Antonio Ezquerro, et al.
Published: (2025-01-01)

A toxin-mediated size-structured population model: Finite difference approximation and well-posedness
by: Qihua Huang, et al.
Published: (2016-04-01)

Calculation of $R_0$ for age-of-infection models
by: Christine K. Yang, et al.
Published: (2008-05-01)