- #1
wang7022
- 1
- 0
Dear All:
Any idea for the following interesting question:
As we know we can calculate inner product of two wave functions A and B
as <A|B>. here both A and B are vector in hilbert space. here we may use
fourier transform to get momentum representation of A and B, and get same
result.
Then let's apply this idea in this way, if we have two real signals, such as X and Y and I want to get their inner product because signals could be consider as vector in hilbert space also. Now I use Fourier transform to get P = fft(X) and Q = fft(Y).
then get their inner product = conj(P)*Q.
now may I condiser this result as an inner product of signal X and Y?
Thanks for comments and I still don't have clear idea in this problem so just let's discuss it.
Any idea for the following interesting question:
As we know we can calculate inner product of two wave functions A and B
as <A|B>. here both A and B are vector in hilbert space. here we may use
fourier transform to get momentum representation of A and B, and get same
result.
Then let's apply this idea in this way, if we have two real signals, such as X and Y and I want to get their inner product because signals could be consider as vector in hilbert space also. Now I use Fourier transform to get P = fft(X) and Q = fft(Y).
then get their inner product = conj(P)*Q.
now may I condiser this result as an inner product of signal X and Y?
Thanks for comments and I still don't have clear idea in this problem so just let's discuss it.