- #1
phibonacci
- 4
- 0
Hi,
I am currently reading about differential forms in "Introduction to Smooth Manifolds" by J. M. Lee, and I was wondering exactly how you define the wedge product on the exterior algebra \Lambda^*(V) = \oplus_{k=0}^n\Lambda^k(V) of a vector space V. I understand how the wedge product is defined as a map
\Lambda^k(V)\times \Lambda^l(V) \rightarrow \Lambda^{k+l}(V).
Is the idea simply to extend this definition bilinearly to \Lambda^*(V)? I.e. given elements (T_0, ..., T_n) and (S_0, ..., S_n) in \Lambda^*(V), do we simply calculate all the combinations T_j \wedge S_k, add the obtained forms that have the same degree, and finally let these sums make up the new element of \Lambda^*(V)? This seems to me like an intuitive definition, but Lee wasn't very specific about this, so I thought I should make sure this is correct.
Please let me know if there is something in my post that seems unclear.
I am currently reading about differential forms in "Introduction to Smooth Manifolds" by J. M. Lee, and I was wondering exactly how you define the wedge product on the exterior algebra \Lambda^*(V) = \oplus_{k=0}^n\Lambda^k(V) of a vector space V. I understand how the wedge product is defined as a map
\Lambda^k(V)\times \Lambda^l(V) \rightarrow \Lambda^{k+l}(V).
Is the idea simply to extend this definition bilinearly to \Lambda^*(V)? I.e. given elements (T_0, ..., T_n) and (S_0, ..., S_n) in \Lambda^*(V), do we simply calculate all the combinations T_j \wedge S_k, add the obtained forms that have the same degree, and finally let these sums make up the new element of \Lambda^*(V)? This seems to me like an intuitive definition, but Lee wasn't very specific about this, so I thought I should make sure this is correct.
Please let me know if there is something in my post that seems unclear.
