Carrying Capacity of a Population Diffusing in a Heterogeneous Environment

The carrying capacity of the environment for a population is one of the key concepts in ecology and it is incorporated in the growth term of reaction-diffusion equations describing populations in space. Analysis of reaction-diffusion models of populations in heterogeneous space have shown that, when...

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Bibliographic Details
Published in:Mathematics (Basel) 2020-01, Vol.8 (1), p.49
Main Authors: DeAngelis, D.L., Zhang, Bo, Ni, Wei-Ming, Wang, Yuanshi
Format: Article
Language:English
Subjects:
Bioreactors
Carrying capacity
chemostat model
Climate change
Diffusion
Ecology
energy constraints
Equilibrium
Food science
Mathematical analysis
Partial differential equations
pearl-verhulst logistic model
Population growth
Populations
Reaction-diffusion equations
reaction-diffusion model
spatial heterogeneity
total realized asymptotic population abundance
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Summary:The carrying capacity of the environment for a population is one of the key concepts in ecology and it is incorporated in the growth term of reaction-diffusion equations describing populations in space. Analysis of reaction-diffusion models of populations in heterogeneous space have shown that, when the maximum growth rate and carrying capacity in a logistic growth function vary in space, conditions exist for which the total population size at equilibrium (i) exceeds the total population that which would occur in the absence of diffusion and (ii) exceeds that which would occur if the system were homogeneous and the total carrying capacity, computed as the integral over the local carrying capacities, was the same in the heterogeneous and homogeneous cases. We review here work over the past few years that has explained these apparently counter-intuitive results in terms of the way input of energy or another limiting resource (e.g., a nutrient) varies across the system. We report on both mathematical analysis and laboratory experiments confirming that total population size in a heterogeneous system with diffusion can exceed that in the system without diffusion. We further report, however, that when the resource of the population in question is explicitly modeled as a coupled variable, as in a reaction-diffusion chemostat model rather than a model with logistic growth, the total population in the heterogeneous system with diffusion cannot exceed the total population size in the corresponding homogeneous system in which the total carrying capacities are the same.
ISSN:2227-7390
2227-7390
DOI:10.3390/math8010049