Function-valued adaptive dynamics and the calculus of variations
Authors: Parvinen K, Dieckmann U, Heino M
Publication Year: 2006
Reference: Journal of Mathematical Biology, 52(1):1-26 (January 2006)
. Also available as IIASA Interim Report IR-04-038 www.iiasa.ac.at/Admin/PUB/Documents/IR-04-038.pdf
Abstract
Adaptive dynamics has been widely used to study the evolution of scalar-valued, and occasionally vector-valued, strategies in ecologically realistic models. In many ecological situations, however, evolving strategies are best described as function-valued, and thus infinite-dimensional, traits. So far, such evolution has only been studied sporadically, mostly based on quantitative genetics models with limited ecological realism. In this article we show how to apply the calculus of variations to find evolutionarily singular strategies of function-valued adaptive dynamics: such a strategy has to satisfy Euler's equation with environmental feedback. We also demonstrate how second-order derivatives can be used to investigate whether or not a function-valued singular strategy is evolutionarily stable. We illustrate our approach by presenting several worked examples.
KEYWORDS: Adaptive dynamics; Infinite-dimensional traits; Reaction norms; Calculus of variations; Euler's equation
KEYWORDS: Adaptive dynamics; Infinite-dimensional traits; Reaction norms; Calculus of variations; Euler's equation
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PUBLICATIONS
Parvinen K (2013)
Nurmi T, Parvinen K (2013)
Nonaka E, Parvinen K, Braennstroem A (2013)