Matrix factorisation and the interpretation of geodesic distance
–Neural Information Processing Systems
Given a graph or similarity matrix, we consider the problem of recovering a notion of true distance between the nodes, and so their true positions. We show that this can be accomplished in two steps: matrix factorisation, followed by nonlinear dimension reduction. This combination is effective because the point cloud obtained in the first step lives close to a manifold in which latent distance is encoded as geodesic distance.
Neural Information Processing Systems
Aug-13-2025, 15:53:20 GMT
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