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We present an extension of Principal Component Analysis (PCA) and a new algorithm for clustering points in ⁿ based on it. The key property of the algorithm is that it is affine-invariant. When the input is a sample from a mixture of two arbitrary Gaussians, the algorithm correctly classifies the sample assuming only that the two components are separable by a hyperplane, i. e. , there exists a halfspace that contains most of one Gaussian and almost none of the other in probability mass. This is nearly the best possible, improving known results substantially. For k≫2 components, the algorithm requires only that there be some (k-1) -dimensional subspace in which the ``overlap'' in every direction is small. Our main tools are isotropic transformation, spectral projection and a simple reweighting technique. We call this combination isotropic PCA.
Brubaker et al. (Wed,) studied this question.
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