|
|||||
|
|
Bifurcation analysis of a metapopulation model with sources and sinks |
|
| Authors: | M. Gyllenberg A. V. Osipov G. Söderbacka |
| Affiliation: | 1. Department of Mathematics, University of Turku, FIN-20014, Turku, Finland 2. Faculty of Mathematics and Mechanics, St. Petersburg State University, Ulianovskaya 1, St. Petergof, 198904, St. Petersburg, Russia 3. Department of Mathematics, University of Lule?, S-97187, Lule?, Sweden |
| Abstract: | Summary A class of functions describing the Allee effect and local catastrophes in population dynamics is introduced and the behaviour of the resulting one-dimensional discrete dynamical system is investigated in detail. The main topic of the paper is a treatment of the two-dimensional system arising when an Allee function is coupled with a function describing the population decay in a so-called sink. New types of bifurcation phenomena are discovered and explained. The relevance of the results for metapopulation dynamics is discussed. |
| Keywords: | Metapopulation Allee effect local catastrophe source-sink model two-dimensional discrete dynamical system basin-eroding and chaotic area bifurcations salvage effect critical lines subcharacteristic set |
| 本文献已被 SpringerLink 等数据库收录! | |