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Fixed curves near fixed points
Published 21 Apr 2015 in math.DS and math.CV | (1504.05463v1)
Abstract: Let $H$ be a composition of an $\mathbb{R}$-linear planar mapping and $z\mapsto zn$. We classify the dynamics of $H$ in terms of the parameters of the $\mathbb{R}$-linear mapping and the degree by associating a certain finite Blaschke product. We apply this classification to this situation where $z_0$ is a fixed point of a planar quasiregular mapping with constant complex dilatation in a neighbourhood of $z_0$. In particular we find how many curves there are that are fixed by $f$ and that land at $z_0$.
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