Let $N$ and $M$ be two smooth manifolds with the same dimension $n$ and let $x \in N$. If we assume that $N \subseteq M$ then how to prove or disprove that $N$ and $M$ are the same manifold in a neighborhood of $x$?
Thanks in advance.
2026-03-29 02:37:02.1774751822
Do Identical dimensions and inclusion imply equivalence for smooth manifolds?
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