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On some spectral properties of stochastic similarity matrices for data clustering

Clustering in image analysis is a central technique that allows to classify elements of an image. We describe a simple clustering technique that uses the method of similarity matrices. We expand upon recent results in spectral analysis for Gaussian mixture distributions, and in particular, provide conditions for the existence of a spectral gap between the leading and remaining eigenvalues for matrices with entries from a Gaussian mixture with two real univariate components. Furthermore, we describe an algorithm in which a collection of image elements is treated as a dynamical system in which the existence of the mentioned spectral gap results in an efficient clustering.

preprint2022arXivOpen access
Denis GaidashevRalf PihlströmMartin Ryner
math.STStatistics Theory
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Denis GaidashevRalf PihlströmMartin Ryner

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