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Computing Histogram of Tensor Images using Orthogonal Series Density Estimation and Riemannian Metrics

Abstract : This paper deals with the computation of the histogram of tensor images, that is, images where at each pixel is given a n by n positive definite symmetric matrix, SPD(n). An approach based on orthogonal series density estimation is introduced, which is particularly useful for the case of measures based on Riemannian metrics. By considering SPD(n) as the space of the covariance matrices of multivariate gaussian distributions, we obtain the corresponding density estimation for the measure of both the Fisher metric and the Wasserstein metric. Experimental results on the application of such histogram estimation to DTI image segmentation, texture segmentation and texture recognition are included.
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https://hal.archives-ouvertes.fr/hal-00941147
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Submitted on : Friday, April 11, 2014 - 3:19:54 PM
Last modification on : Wednesday, November 17, 2021 - 12:27:12 PM
Long-term archiving on: : Friday, July 11, 2014 - 12:45:39 PM

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Emmanuel Chevallier, Augustin Chevallier, Jesus Angulo. Computing Histogram of Tensor Images using Orthogonal Series Density Estimation and Riemannian Metrics. 22nd International Conference on Pattern Recognition (ICPR), 2014, Aug 2014, Stockholm, Sweden. ⟨10.1109/ICPR.2014.165⟩. ⟨hal-00941147v2⟩

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