I'm trying to apply Linear Discriminant Analysis to a two-class problem. As far as I understand, LDA assumes that both classes have the same covariance matrix, and then models the likelihood as Gaussian distribution with different means.
Another classifier that I have tried is the naive Bayesian. It disregards any correlation between predictor variables.
Now, I don't understand what happens when I apply PCA to the dataset. By its very definition, the PCA algorithm rotates the data such that the covariance matrix is diagonal. Nothing is lost in the rotation, but since the covariance matrix is now diagonal, shouldn’t the naive Bayesian be just as good as LDA, or even better, since the LDA will have many more parameters to estimate? Yet, on my data, the Naive Bayes is outperformed by LDA with or without PCA.
Indeed, the data is exactly the same as long as I use all the principal components, which tells me that the result should indeed be as it is. Yet the covariance matrix is diagonal... brain meltdown
Can somebody explain this to me? I hope that I have phrased my question clearly enough. Thank you!