I know in $\mathbb T^1$ is true that if any homeomorphism is minimal then it is topological conjugate to rotation map. But In homotopy to an identity, I don't know in higher dimensional. Any kind of help will be appreciate.
2026-03-31 20:08:14.1774987694
Give an example of minimal homeomorphism on $\mathbb T^n$ which is homotopy to identity and not topologically conjugate to rotation map.
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