@Article{Botella-Soler_etal2012,
author="Botella-Soler, V.
and Oteo, J. A.
and Ros, J.",
title="Coexistence of periods in a bifurcation",
journal="Chaos, Solitons {\&} Fractals",
year="2012",
publisher="Pergamon-Elsevier Science Ltd",
volume="45",
number="5",
pages="681--686",
abstract="A particular type of order-to-chaos transition mediated by an infinite set of coexisting neutrally stable limit cycles of different periods is studied in the Varley-Gradwell-Hassell population model. We prove by an algebraic method that this kind of transition can only happen for a particular bifurcation parameter value. Previous results on the structure of the attractor at the transition point are here simplified and extended.",
optnote="WOS:000303785300014",
optnote="exported from refbase (https://references.ific.uv.es/refbase/show.php?record=1005), last updated on Thu, 01 Nov 2012 19:57:44 +0000",
issn="0960-0779",
doi="10.1016/j.chaos.2011.11.008",
opturl="http://arxiv.org/abs/1103.0874",
opturl="https://doi.org/10.1016/j.chaos.2011.11.008",
archivePrefix="arXiv",
eprint="1103.0874",
language="English"
}