Abstract
We construct two planar homoeomorphisms
$f$
and
$g$
for which the origin is a globally asymptotically stable fixed point whereas for
$f \circ g$
and
$g \circ f$
the origin is a global repeller. Furthermore, the origin remains a global repeller for the iterated function system generated by
$f$
and
$g$
where each of the maps appears with a certain probability. This planar construction is also extended to any dimension
$>$
2 and proves for first time the appearance of the dynamical Parrondo's paradox in odd dimensions.
Publisher
Cambridge University Press (CUP)
Cited by
1 articles.
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1. The dynamics of a four-step feedback procedure to control chaos;Chaos: An Interdisciplinary Journal of Nonlinear Science;2021-11