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Is it possible to project a multidimensional data to a 2D map using LDA? It seems that the tool Matlab provided does not provide such functions...

Thanks for reply. My data now is having 6 classes, so does it mean that if I have 6 classes, I can only reduce it to 5 dimensions? Or can it be done in a similar way with PCA, which takes the top 2 eigenvalues, and use these 2 for projection? The PCA does not quite work for my problem as an unsupervised approach, so I am wondering if LDA might help.

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up vote 3 down vote accepted

LDA isn't really meant for dimensionality-reduction strictly speaking, especially in the cases where all your data belongs to one class. It's meant to come up with a single linear projection that is the most discriminative between between two classes. Thus, there's no real natural way to do this using LDA.

If your data all belongs to the same class, then you might be interested more in PCA (Principcal Component Analysis), which gives you the most important directions for the data ranked in order of importance. Other methods exist as well like ISOMAP (as mentioned by EMS in the comments) or self-organizing maps.

As a side note, LDA can help you reduce dimensionality if you know that you have multi-class data. It can help you reduce dimensionality down to k-1 dimensions if you have k-class data, but you didn't mention that this is the case.

EDIT: Credit goes to @EMS for helping to clarify this answer.

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Once you compute the best projection from some set of training data, you can apply that projection to any newly collected data to reduce its dimensionality. I don't know what the generalization properties of this will be, but it's certainly a valid dimensionality reduction scheme (though probably inaccurate). – Mr. F Apr 30 '12 at 1:56
    
Sure, that single linear component will be one such dimension, but I don't know of a generalization to LDA that comes up with more than one (and I've looked), hence my first sentence. – Chris A. Apr 30 '12 at 1:58
    
That's surprising. The Wikipedia article lists dimensionality reduction among the first applications of LDA, and in particular, multi-class LDA is described as finding a (k-1)-dimensional subspace through N-dimensional data space that best separates the k different classes. LDA generalizes straightforwardly to finding a k-dimensional plane through N-dimensional data, where k < N. – Mr. F Apr 30 '12 at 2:02
    
As an aside, the Isomap algorithm is an alternative to PCA type methods that attempts to preserve the manifold distance between data points, instead of Euclidean distance. There may be variants of Isomap that attempt to project manifold distances down in a way that handles between- and within-class scatter optimally, but I'm not familiar with them. Isomap may be too complicated for this problem, but it's good to know what the options are. – Mr. F Apr 30 '12 at 2:04
    
@EMS, the OP didn't mention anything about having multi-class (or even two class for that matter) data. I made the logical stretch that he was interested in two class data since he mentioned LDA, but LDA is typically not used for dimensionality reduction in one-class problems. – Chris A. Apr 30 '12 at 2:10

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