Log-Hilbert-Schmidt metric between positive definite operators on Hilbert spaces
–Neural Information Processing Systems
This paper introduces a novel mathematical and computational framework, namely Log-Hilbert-Schmidt metric between positive definite operators on a Hilbert space. This is a generalization of the Log-Euclidean metric on the Riemannian manifold of positive definite matrices to the infinite-dimensional setting. The general framework is applied in particular to compute distances between covariance operators on a Reproducing Kernel Hilbert Space (RKHS), for which we obtain explicit formulas via the corresponding Gram matrices. Empirically, we apply our formulation to the task of multi-category image classification, where each image is represented by an infinite-dimensional RKHS covariance operator. On several challenging datasets, our method significantly outperforms approaches based on covariance matrices computed directly on the original input features, including those using the Log-Euclidean metric, Stein and Jeffreys divergences, achieving new state of the art results.
Neural Information Processing Systems
Mar-13-2024, 14:10:37 GMT
- Country:
- South America > Argentina
- Pampas > Buenos Aires F.D. > Buenos Aires (0.04)
- Europe
- Italy (0.04)
- Sweden > Uppsala County
- Uppsala (0.04)
- South America > Argentina
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