Daphnia revisited : local stability and bifurcation theory for physiologically structured population models explained by way of an example

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Diekmann , O , Gyllenberg , M , Metz , J A J , Nakaoka , S & de Roos , A M 2010 , ' Daphnia revisited : local stability and bifurcation theory for physiologically structured population models explained by way of an example ' , Journal of mathematical biology , vol. 61 , no. 2 , pp. 277-318 . https://doi.org/10.1007/s00285-009-0299-y

Title: Daphnia revisited : local stability and bifurcation theory for physiologically structured population models explained by way of an example
Author: Diekmann, Odo; Gyllenberg, Mats; Metz, J. A. J.; Nakaoka, Shinji; de Roos, Andre M.
Contributor: University of Helsinki, Department of Mathematics and Statistics
University of Helsinki, Department of Mathematics and Statistics
Date: 2010
Language: eng
Number of pages: 42
Belongs to series: Journal of mathematical biology
ISSN: 0303-6812
URI: http://hdl.handle.net/10138/167440
Subject: Physiologically structured population models
Size-structure
Delay equations
Linearised stability
Characteristic equation
SYSTEMS
CONTINUATION
FORMULATION
COMPETITION
EQUATIONS
CYCLES
DELAY
111 Mathematics
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