Thread: Smooth covector field on S^2
View Single Post
  #2  
Old June 5th, 2009, 04:50 PM
Rebesques's Avatar
Rebesques Rebesques is offline
Senior Member
  
Join Date: Jul 2005
Location: At my house.
Posts: 396
Thanks: 30
Thanked 49 Times in 44 Posts
Rebesques will become famous soon enough
Send a message via ICQ to Rebesques Send a message via AIM to Rebesques Send a message via MSN to Rebesques Send a message via Yahoo to Rebesques
Default
Quote:
Originally Posted by Different View Post
Is there a smooth covector field on {\mathbb S}^2 that is exact and vanishes at exactly one point?

I think the answer is no...
in case of exact field we have w = df for some smooth function on {\mathbb S}^2... it vanishes at some point p when partial derivatives of f at p are equal to zero (in some chart containing p).


Not quite sure what you mean, but if w = df for f\in C^{\infty}({\mathbb S}^2), compactness of the sphere implies f must attain two extrema (at least). So there are two points where \omega=df=0.


Quote:
..is it correct to say

No.
__________________
Never leave home without some Latex in your back pocket.
Reply With Quote