Tags: delay

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  1. 1969-Israelsson, D. and A. Johnsson - Phase Shift In Geotropical Oscillations

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

    Israelsson, D. and A. Johnsson. 1969. Phase-shift in Geotropic Oscillations a Theoretical and Experimental Study.  Physiologia Plantarum. 22:  1226-1237.See https://pubmed.ncbi.nlm.nih.gov/20925673/ .The paper studies geotropical induced phase-shifts in circumnutations (turning)...

  2. 1975-Burghes, David N. - Population dynamics An introduction to differential equations

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

    Burghes, David N. 1975. Population dynamics An introduction to differential equations. International Journal of Mathematical Education in Science and Technology. 6(3): 265-276.See https://www.tandfonline.com/doi/abs/10.1080/0020739750060302 .Abstract:  In this paper a number of...

  3. 2002-Nelson, Patrick W. and Alan S. Perelson - Mathematical analysis of delay differential equation models of HIV-1 infection

    02 Mar 2017 | Contributor(s):: Brian Winkel

    Nelson, Patrick W. and Alan S. Perelson. 2002. Mathematical analysis of delay differential equation models of HIV-1 infection. Mathematical Biosciences. 179: 73–94.Article Abstract: Models of HIV-1 infection that include intracellular delays are more accurate representations of the...

  4. 1977-Mackey,  Michael C. and Leon Glass - Oscillation and Chaos in Physiological Control Systems

    26 Jun 2015 | Contributor(s):: Michael C. Mackey, Leon Glass, William Clark

    Mackey,  Michael C. and Leon Glass. 1977. Oscillation and Chaos in Physiological Control Systems. Science. 197: 287-289.See https://www.science.org/doi/abs/10.1126/science.267326 .Article Abstract: First-order nonlinear differential-delay equations describing physiological control...

  5. 2011-Kreith, Kurt - The Mathematics of Global Change

    25 Jun 2015 | | Contributor(s):: Kurt Kreith

    Kreith, Kurt. 2011. The Mathematics of Global Change.  The Journal of Mathematics Education at Teachers College. Fall-Winter, Volume 2: 37-44.This work is freely available at the journal's web site at http://journals.tc-library.org/index.php/matheducation/article/viewFile/725/455...

  6. 2010-Kar,T. K. and Kunal Chakraborty - Bioeconomic modelling of a prey predator system using differential algebraic equations

    21 Jun 2015 | | Contributor(s):: T. K. Kar, Kunal Chakraborty

    T. K. Kar and Kunal Chakraborty. 2010. Bioeconomic modelling of a prey predator system using differential algebraic equations. International Journal of Engineering, Science and Technology . 2(1): 13-34Article Abstract: We propose a biological economic model based on prey-predator dynamics...