Stable ergodicity of skew product endomorphisms on $T^2$

Ruihao Gu

Published 2023-07-17Version 1

For a family of skew product endomorphisms on closed surface $f_{\phi}(x,y)=\big(l x\ , \ y+\phi(x)\big)$, where $l\in \mathbb{N}_{\geq 2}$ and $\phi: S^1\to \mathbb{R}$ is a $C^r\ (r>1)$ function, we get a dichotomy on the cohomology class of $\phi$ and the $C^1$-stable ergodicity of $f_{\phi}$, where the perturbation may not be a skew product endomorphism.