Weather-driven malaria transmission model with gonotrophic and sporogonic cycles
From MaRDI portal
Publication:3304336
DOI10.1080/17513758.2019.1570363zbMath1447.92466OpenAlexW2911309745WikidataQ91255473 ScholiaQ91255473MaRDI QIDQ3304336
Kamaldeen Okuneye, Steffen E. Eikenberry, Abba B. Gumel
Publication date: 31 July 2020
Published in: Journal of Biological Dynamics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/17513758.2019.1570363
Related Items
Mathematical modeling of the dynamics of vector-borne diseases transmitted by mosquitoes: taking into account aquatic stages and gonotrophic cycle, Insecticide resistance and malaria control: a genetics-epidemiology modeling approach, Can insecticide resistance increase malaria transmission? A genetics-epidemiology mathematical modeling approach, MATHEMATICAL MODELING OF THE IMPACT OF PERIODIC RELEASE OF STERILE MALE MOSQUITOES AND SEASONALITY ON THE POPULATION ABUNDANCE OF MALARIA MOSQUITOES, IMPACT OF ADAPTIVE MOSQUITO BEHAVIOR AND INSECTICIDE-TREATED NETS ON MALARIA PREVALENCE, Mathematics of Malaria and Climate Change, Analysis of the model on the effect of seasonal factors on malaria transmission dynamics, Mathematics of an epidemiology-genetics model for assessing the role of insecticides resistance on malaria transmission dynamics, Long-lasting insecticidal nets and the quest for malaria eradication: a mathematical modeling approach, Modeling the effect of temperature variability on malaria control strategies, Mathematical modeling of the impact of temperature variations and immigration on malaria prevalence in Nigeria, IMPACT OF TEMPERATURE VARIABILITY ON SIRS MALARIA MODEL
Cites Work
- Unnamed Item
- Unnamed Item
- Periodic oscillations and backward bifurcation in a model for the dynamics of malaria transmission
- Mathematical assessment of the role of temperature and rainfall on mosquito population dynamics
- On the population dynamics of the malaria vector
- On the definition and the computation of the basic reproduction ratio \(R_ 0\) in models for infectious diseases in heterogeneous populations
- A periodic epidemic model in a patchy environment
- Persistent oscillations and backward bifurcation in a malaria model with varying human and mosquito populations: implications for control
- Threshold dynamics for compartmental epidemic models in periodic environments
- Backward bifurcations in dengue transmission dynamics
- Mathematical modeling of immunity to malaria
- Convergence results and a Poincaré-Bendixson trichotomy for asymptotically autonomous differential equations
- A mathematical model for endemic malaria with variable human and mosquito populations
- Dynamical models of tuberculosis and their applications
- Mathematical modeling of climate change and malaria transmission dynamics: a historical review
- A methodology for performing global uncertainty and sensitivity analysis in systems biology
- Reproduction numbers and sub-threshold endemic equilibria for compartmental models of disease transmission
- Vector control for the Chikungunya disease
- Analysis of a temperature- and rainfall-dependent model for malaria transmission dynamics
- Mathematical analysis of a weather-driven model for the population ecology of mosquitoes
- Approximation of the basic reproduction number \(R_{0}\) for vector-borne diseases with a periodic vector population
- Mathematical analysis of an age-structured model for malaria transmission dynamics
- Sensitivity and uncertainty analyses for an SARS model with time-varying inputs and outputs
- The Mathematics of Infectious Diseases
- A Climate-Based Malaria Transmission Model with Structured Vector Population
- QUALITATIVE ASSESSMENT OF THE ROLE OF TEMPERATURE VARIATIONS ON MALARIA TRANSMISSION DYNAMICS
- Mathematics of Malaria and Climate Change
- Bifurcation Analysis of a Mathematical Model for Malaria Transmission
- Sensitivity and Uncertainty Analysis of Complex Models of Disease Transmission: An HIV Model, as an Example
- The Theory of the Chemostat
