A1 Vertaisarvioitu alkuperäisartikkeli tieteellisessä lehdessä
Invasion dynamics and attractor inheritance
Tekijät: Geritz SAH, Gyllenberg M, Jacobs FJA, Parvinen K
Kustantaja: SPRINGER-VERLAG
Julkaisuvuosi: 2002
Journal: Journal of Mathematical Biology
Tietokannassa oleva lehden nimi: JOURNAL OF MATHEMATICAL BIOLOGY
Lehden akronyymi: J MATH BIOL
Vuosikerta: 44
Numero: 6
Aloitussivu: 548
Lopetussivu: 560
Sivujen määrä: 13
ISSN: 0303-6812
DOI: https://doi.org/10.1007/s002850100136
Tiivistelmä
We study the dynamics of a population of residents that is being invaded by an initially rare mutant. We show that under relatively mild conditions the sum of the mutant and resident population sizes stays arbitrarily close to the initial attractor of the monomorphic resident population whenever the mutant has a strategy sufficiently similar to that of the resident. For stochastic systems we show that the probability density of the sum of the mutant and resident population sizes stays arbitrarily close to the stationary probability density of the monomorphic resident population. Attractor switching, evolutionary suicide as well as most cases of "the resident strikes back" in systems with multiple attractors are possible only near a bifurcation point in the strategy space where the resident attractor undergoes a discontinuous change. Away from such points, when the mutant takes over the population from the resident and hence becomes the new resident itself, the population stays on the same attractor. In other words, the new resident "inherits" the attractor from its predecessor, the former resident.
We study the dynamics of a population of residents that is being invaded by an initially rare mutant. We show that under relatively mild conditions the sum of the mutant and resident population sizes stays arbitrarily close to the initial attractor of the monomorphic resident population whenever the mutant has a strategy sufficiently similar to that of the resident. For stochastic systems we show that the probability density of the sum of the mutant and resident population sizes stays arbitrarily close to the stationary probability density of the monomorphic resident population. Attractor switching, evolutionary suicide as well as most cases of "the resident strikes back" in systems with multiple attractors are possible only near a bifurcation point in the strategy space where the resident attractor undergoes a discontinuous change. Away from such points, when the mutant takes over the population from the resident and hence becomes the new resident itself, the population stays on the same attractor. In other words, the new resident "inherits" the attractor from its predecessor, the former resident.
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