Hello,

I would like to know how to make statistical compares between similar PSSMs (e. g. two SRY matrices obtained in different ways) estimating the significance of the observed differences. If we took, for example, a TRANSFAC matrix, we could make an ANOVA analysis between columns, but there would be the problem of the correlation between elements on a single line, and thus we should use some method to consider this matter (e. g. a Pearson correlation coefficient). Is there an efficient way to sort it out?

While I share you concerns about associations between columns in a PSSM, weight matrix based approaches assume independence of columns in the matrix. Thus, if you are using a PSSM representation of protein-DNA recognition, then you are implicitly assuming independence in your model and therefore I don't see that it necessary to account for non-independence among columns when testing the difference of two PSSMs. Whether or not independence (=additivity) is a good assumption is a matter for debate, but Stormo and colleagues state:

We conclude that despite the fact that the additivity assumption does not fit the data perfectly, in most cases it provides a very good approximation of the true nature of the specific protein–DNA interactions.

If you are OK with the additivity assumption, then there are a number of methods to compute the difference between two PSSMs, either to find matches in a PSSM database or to detect significant similarities between PSSMs. I'd recommend using the Noble Lab's Tomtom which is part of the MEME suite, which implements most of the common PSSM difference measures and computes P-values (See also: paper here).

I think you thinking to complicated about this comparison, because, PSSMs are matrices. The difference between two matrices A,B is, well ofc, the difference between the matrices (A-B), and is itself a matrix. The more the matrix is different from the 0-matrix, the more different the matrices, is this clear?

A PSSM contains log-likelihoods, now the difference between two log-likelihoods should itself be a log likelihood. Now, a likelihood-ratio test between the two matrices is what comes to my mind. But please discuss with somebody else before you build something mission-critical on this.

If I can correctly remember BLOSUM and PAM series of matrices are compared for equivalence by their 'Relative Entropy'. Maybe you can use the same method with some tweaks if necessary