Log-Euclidean metric learning on symmetric positive definite Manifold with application to image set classification
The manifold of Symmetric Positive Definite (SPD) matrices has been successfully used for data representation in image set classification. By endowing the SPD manifold with Log-Euclidean Metric, existing methods typically work on vector-forms of SPD matrix logarithms. This however not only inevitably distorts the geometrical structure of the space of SPD matrix logarithms but also brings low efficiency especially when the dimensionality of SPD matrix is high. To overcome this limitation, we prop
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Face and Expression RecognitionComputer Vision and Pattern RecognitionMetric (unit)Tangent spaceMathematicsManifold (fluid mechanics)Mahalanobis distanceMatrix (chemical analysis)Tangent vectorEuclidean distanceEuclidean spacePattern recognition (psychology)Artificial intelligenceTangentComputer sciencePure mathematicsGeometry