Abstract
Abstract
We study the dynamics of the map
$f:\mathbb {A}^N\to \mathbb {A}^N$
defined by
$$ \begin{align*} f(\mathbf{X})=A\mathbf{X}^d+\mathbf{b}, \end{align*} $$
for
$A\in \operatorname {SL}_N$
,
$\mathbf {b}\in \mathbb {A}^N$
, and
$d\geq 2$
, a class which specializes to the unicritical polynomials when
$N=1$
. In the case
$k=\mathbb {C}$
we obtain lower bounds on the sum of Lyapunov exponents of f, and a statement which generalizes the compactness of the Mandelbrot set. Over
$\overline {\mathbb {Q}}$
we obtain estimates on the critical height of f, and over algebraically closed fields we obtain some rigidity results for post-critically finite morphisms of this form.
Publisher
Cambridge University Press (CUP)
Subject
Applied Mathematics,General Mathematics
Cited by
1 articles.
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1. Dynamically improper hypersurfaces for endomorphisms of projective space;Proceedings of the American Mathematical Society, Series B;2023-09-25