| Article ID | Journal | Published Year | Pages | File Type |
|---|---|---|---|---|
| 4500438 | Mathematical Biosciences | 2011 | 9 Pages |
One of the main ecological phenomenons is the Allee effect [1], [2] and [3], in which a positive benefit from the presence of conspecifics arises. In this work we describe the dynamical behavior of a population with Allee effect in a finite domain that is surrounded by a completely hostile environment. Using spectral methods to rewrite the local density of habitants we are able to determine the critical patch size and the bifurcation diagram, hence characterizing the stability of possible solutions, for different ways to introduce the Allee effect in the reaction–diffusion equations.
► We study population extinction conditions with Allee effect. ► Populations live surrounded by hostile environments. ► We describe analytically the bifurcation diagrams. ► We consider weak and strong Allee effects and discuss the ecological implications of our results.
