An Analysis of a Semelparous Population Model with Density-Dependent Fecundity and Density - Dependent Survival Probabilities.
Permanent link
https://hdl.handle.net/10037/12026Date
2017-12-17Type
Journal articleTidsskriftartikkel
Peer reviewed
Author
Wikan, ArildAbstract
A discrete age-structured semelparous Leslie matrix model where density dependence is included both in the fecundity and in the
survival probabilities is analysed. Depending on strength of density dependence, we show in the precocious semelparous case that
the nonstationary dynamics may indeed be rich, ranging from SYC (a dynamical state where the whole population is in one age
class only) dynamics to cycles of low period where all age classes are populated. Quasiperiodic and chaotic dynamics have also
been identified. Moreover, outside parameter regions where SYC dynamics dominates, we prove that the transfer from stability
to instability goes through a supercritical Neimark
−
Sacker bifurcation, and it is further shown that when the population switches
from possessing a precocious to a delayed semelparous life history both stability properties and the possibility of periodic dynamics
become weaker.
Description
Source at https://doi.org/10.1155/2017/8934295 .