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A differential form $ \omega$ is a section of the exterior algebra $\Lambda^* T^* X$ of a cotangent bundle,

5 votes

k-form: sum of wedge products of 1-forms?

Johannes' answer can be upgraded to the following statement: Let $M$ be a second countable and Hausdorff manifold (who cares about others?) and $\pi_i\colon E_i \longrightarrow M$ vector bundles for …
Stefan Waldmann's user avatar
14 votes
Accepted

What do the differential k-forms on a product manifold look like?

Denote by $p_M: M \times N \longrightarrow M$ and $p_N: M \times N \longrightarrow N$ the canonical projections. Then you get an induced bilinear map from $\Omega^i(M) \times \Omega^j(N) \longrightarr …
Stefan Waldmann's user avatar
16 votes
Accepted

Hodge decomposition of smooth n-forms: is it an isomorphism of topological vector spaces?

Maybe an even more elementary argument than the one of Tobias: The continuity of all involved operators is easy: simply all differential operators with smooth coefficients between sections of vector b …
Stefan Waldmann's user avatar