Reputation
Top tag
Next privilege 125 Rep.
Vote down
Badges
2
Newest
 Student
Impact
~49 people reached

  • 0 posts edited
  • 0 helpful flags
  • 0 votes cast
Feb
5
comment Hilbert basis of $L^2([-1,1])$?
No, I have not checked it.
Feb
4
awarded  Student
Feb
4
awarded  Editor
Feb
4
revised Hilbert basis of $L^2([-1,1])$?
added 153 characters in body; edited title
Feb
4
comment Hilbert basis of $L^2([-1,1])$?
I am editing now
Feb
4
comment Hilbert basis of $L^2([-1,1])$?
Yes, I know. I would like to check that my solution is correct or not?
Feb
4
asked Hilbert basis of $L^2([-1,1])$?