Degree growth of polynomial automorphisms and birational maps: some examples
Abstract: We provide the existence of new degree growths in the context of polynomial automorphisms of $\mathbb{C}k$: if $k$ is an integer $\geq 3$, then for any $\ell\leq \left[\frac{k-1}{2}\right]$ there exist polynomial automorphisms $f$ of $\mathbb{C}k$ such that $\mathrm{deg}\, fn\sim n\ell$. We also give counter-examples in dimension $k\geq 3$ to some classical properties satisfied by polynomial automorphisms of $\mathbb{C}2$. We provide the existence of new degree growths in the context of birational maps of $\mathbb{P}k_\mathbb{C}$: assume $k\geq 3$; forall $0\leq\ell\leq k$ there exist birational maps $\phi$ of $\mathbb{P}k_\mathbb{C}$ such that $\mathrm{deg}\, \phin\sim n\ell$.
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