- #1
joe2317
- 6
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Hi.
I have a question on proof of proposition 2 in chater 7 Spivak volume2.
In the proof, he says that the n-dimensional distribution
[tex]\Delta_{p}[/tex]=[tex]\bigcap^{n}_{i,j=1}[/tex]ker[tex]\Lambda^{i}_{j}[/tex](p)
in R^(n+n^2) is integrable.
Could anyone explain why it is an n dimensional distribution?
Thanks.
I have a question on proof of proposition 2 in chater 7 Spivak volume2.
In the proof, he says that the n-dimensional distribution
[tex]\Delta_{p}[/tex]=[tex]\bigcap^{n}_{i,j=1}[/tex]ker[tex]\Lambda^{i}_{j}[/tex](p)
in R^(n+n^2) is integrable.
Could anyone explain why it is an n dimensional distribution?
Thanks.