Title of article
Persistence of structured populations in random environments
Author/Authors
Benaïm، نويسنده , , Michel and Schreiber، نويسنده , , Sebastian J.، نويسنده ,
Issue Information
دوماهنامه با شماره پیاپی سال 2009
Pages
16
From page
19
To page
34
Abstract
Environmental fluctuations often have different impacts on individuals that differ in size, age, or spatial location. To understand how population structure, environmental fluctuations, and density-dependent interactions influence population dynamics, we provide a general theory for persistence for density-dependent matrix models in random environments. For populations with compensating density dependence, exhibiting “bounded” dynamics, and living in a stationary environment, we show that persistence is determined by the stochastic growth rate (alternatively, dominant Lyapunov exponent) when the population is rare. If this stochastic growth rate is negative, then the total population abundance goes to zero with probability one. If this stochastic growth rate is positive, there is a unique positive stationary distribution. Provided there are initially some individuals in the population, the population converges in distribution to this stationary distribution and the empirical measures almost surely converge to the distribution of the stationary distribution. For models with overcompensating density-dependence, weaker results are proven. Methods to estimate stochastic growth rates are presented. To illustrate the utility of these results, applications to unstructured, spatially structured, and stage-structured population models are given. For instance, we show that diffusively coupled sink populations can persist provided that within patch fitness is sufficiently variable in time but not strongly correlated across space.
Keywords
persistence , Structured populations , Source-sink , Random environment , metapopulation
Journal title
Theoretical Population Biology
Serial Year
2009
Journal title
Theoretical Population Biology
Record number
1567177
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