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  1. 2014-Eckhoff, Philip A, Caitlin A Bever, Jaline Gerardin and Edward A Wenger - Fun with maths: exploring implications of mathematical models for malaria eradication.

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    06 Apr 2020 | Contributor(s):: Brian Winkel

    Eckhoff, Philip A, Caitlin A Bever, Jaline Gerardin and Edward A Wenger. 2014.  Fun with maths: exploring implications of mathematical models for malaria eradication. Malaria Journal.  13:486See https://malariajournal.biomedcentral.com/articles/10.1186/1475-2875-13-486...

  2. 2011-Mandal, Sandip , Ram Rup Sarkar and Somdatta Sinha - Mathematical models of malaria - a review.

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    28 Mar 2020 | Contributor(s):: Brian Winkel

    Mandal, Sandip , Ram Rup Sarkar and Somdatta Sinha. 2011. Mathematical models of malaria - a review. Malaria Journal. 10:1-19.See https://pubmed.ncbi.nlm.nih.gov/21777413/ .Abstract: Mathematical models have been used to provide an explicit framework for understanding malaria...

  3. 2011-Xiao,Yanyu - Study of Malaria Transmission Dynamics by Mathematical Models. Doctoral thesis.

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    26 Nov 2017 | Contributor(s):: Brian Winkel

    Xiao,Yanyu. 2011. Study of Malaria Transmission Dynamics by Mathematical Models. Doctoral thesis. The University of Western Ontario.See  https://ir.lib.uwo.ca/etd/354/ . Abstract: This Ph.D thesis focuses on modeling transmission and dispersal of one of the most common...

  4. 2009-Schaffer, W. M.  and   T. V. Bronnikova - Controlling malaria: competition, seasonality and 'slingshotting' transgenic mosquitoes into natural populations.

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    09 Sep 2017 | Contributor(s):: Brian Winkel

    Schaffer, W. M.  and   T. V. Bronnikova. 2009. Controlling malaria: competition, seasonality and ‘slingshotting’ transgenic mosquitoes into natural populations. Journal of Biological Dynamics. 3(2-3):  286-304.See https://pubmed.ncbi.nlm.nih.gov/22880835/...

  5. 1-024-S-MalariaControl

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    06 May 2016 | | Contributor(s):: David Culver

    This project offers students a chance to make policy recommendations based on the analysis of models using both linear (exponential decay) and non-linear (logistic growth) differential equations. The scenario is based on the deployment of the United States Army's 62nd Engineer Battalion to...