Let $M$ be a manifold of dimension m and $X:M \rightarrow TM$ a smooth vectorial field. I want to prove that the set of all smooth vectorial fields is infinite dimensional algebraic. I know that it can be proved by seeing it as a $C^{\infty}(M)$ module.
2026-04-23 06:37:23.1776926243
proving algebraically that the space of smooth vectorial fields over a smooth manifold is infinite dimensional
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