Continuum modeling of discrete plant communities: Why does it work and why is it advantageous?

Ehud Meron, Jamie J.R. Bennett, Cristian Fernandez-Oto, Omer Tzuk, Yuval R. Zelnik, Gideon Grafi

Research output: Contribution to journalArticlepeer-review

4 Scopus citations

Abstract

Understanding ecosystem response to drier climates calls for modeling the dynamics of dryland plant populations, which are crucial determinants of ecosystem function, as they constitute the basal level of whole food webs. Two modeling approaches are widely used in population dynamics, individual (agent)-based models and continuum partial-differential-equation (PDE) models. The latter are advantageous in lending themselves to powerful methodologies of mathematical analysis, but the question of whether they are suitable to describe small discrete plant populations, as is often found in dryland ecosystems, has remained largely unaddressed. In this paper, we first draw attention to two aspects of plants that distinguish them from most other organisms—high phenotypic plasticity and dispersal of stress-tolerant seeds—and argue in favor of PDE modeling, where the state variables that describe population sizes are not discrete number densities, but rather continuous biomass densities. We then discuss a few examples that demonstrate the utility of PDE models in providing deep insights into landscape-scale behaviors, such as the onset of pattern forming instabilities, multiplicity of stable ecosystem states, regular and irregular, and the possible roles of front instabilities in reversing desertification. We briefly mention a few additional examples, and conclude by outlining the nature of the information we should and should not expect to gain from PDE model studies.

Original languageEnglish
Article number987
JournalMathematics
Volume7
Issue number10
DOIs
StatePublished - 1 Oct 2019

Keywords

  • Continuum models
  • Desertification
  • Front instabilities
  • Homoclinic snaking
  • Individual based models
  • Partial differential equations
  • Phenotypic plasticity
  • Plant populations
  • Vegetation pattern formation

ASJC Scopus subject areas

  • Mathematics (all)

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