I apologize for being a bit verbose in advance: if you want to skip all the background mumbo jumbo you can see my question down below.

This is pretty much a follow up to a question I previously posted on how to compare two 1D (time dependent) signals. One of the answers I got was to use the cross-correlation function (xcorr in MATLAB), which I did.

## Background information

Perhaps a little background information will be useful: I'm trying to implement an Independent Component Analysis algorithm. One of my informal tests is to (1) create the test case by (a) generate 2 random vectors (1x1000), (b) combine the vectors into a 2x1000 matrix (called "S"), and multiply this by a 2x2 mixing matrix (called "A"), to give me a new matrix (let's call it "T").

In summary: T = A * S

(2) I then run the ICA algorithm to generate the inverse of the mixing matrix (called "W"), (3) multiply "T" by "W" to (hopefully) give me a reconstruction of the original signal matrix (called "X")

In summary: X = W * T

(4) I now want to compare "S" and "X". Although "S" and "X" are 2x1000, I simply compare `S(1,:)`

to `X(1,:)`

and `S(2,:)`

to `X(2,:)`

, each which is 1x1000, making them 1D signals. (I have another step which makes sure that these vectors are the proper vectors to compare to each other and I also normalize the signals).

So my current quandary is how to 'grade' how close `S(1,:)`

matches to `X(1,:)`

, and likewise with `S(2,:)`

to `X(2,:)`

.

So far I have used something like: `r1 = max(abs(xcorr(S(1,:), X(1,:)))`

## My question

Assuming that using the cross correlation function is a valid way to go about comparing the similarity of two signals, what would be considered a good R value to grade the similarity of the signals? Wikipedia states that this is a very subjective area, and so I defer to the better judgment of those who might have experience in this field.

As you might realize, I'm not coming from a EE/DSP/statistical background at all (I'm a medical student) so I'm going through a sort of "baptism through fire" right now, and I appreciate all the help I can get. Thanks!