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$p$-Adic $(3,2)$-rational dynamical systems with three fixed points

Published 2019-09-01Version 1

In this paper we consider dynamical systems generated by $(3,2)$-rational functions on the field of $p$-adic complex numbers. Each such function has three fixed points. We show that Siegel disks of the dynamical system may either coincide or be disjoint for different fixed points. Also, we find the basin of each attractor of the dynamical system. We show that, for some values of the parameters, there are trajectories which go arbitrary far from the fixed points.

Categories: math.DS

Keywords: fixed points, rational dynamical systems, adic complex numbers, arbitrary far, rational functions

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arXiv:1909.00335 [math.DS]Abstract References Reviews Resources

$p$-Adic $(3,2)$-rational dynamical systems with three fixed points

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arXiv:1909.00335 [math.DS]AbstractReferencesReviewsResources

$p$-Adic $(3,2)$-rational dynamical systems with three fixed points

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arXiv:1909.00335 [math.DS]Abstract References Reviews Resources