Improved Linear Embeddings via Lagrange Duality

November 30, 2017 ยท Declared Dead ยท ๐Ÿ› Machine-mediated learning

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Authors Kshiteej Sheth, Dinesh Garg, Anirban Dasgupta arXiv ID 1711.11527 Category stat.ML: Machine Learning (Stat) Cross-listed cs.LG Citations 1 Venue Machine-mediated learning Last Checked 4 months ago
Abstract
Near isometric orthogonal embeddings to lower dimensions are a fundamental tool in data science and machine learning. In this paper, we present the construction of such embeddings that minimizes the maximum distortion for a given set of points. We formulate the problem as a non convex constrained optimization problem. We first construct a primal relaxation and then use the theory of Lagrange duality to create dual relaxation. We also suggest a polynomial time algorithm based on the theory of convex optimization to solve the dual relaxation provably. We provide a theoretical upper bound on the approximation guarantees for our algorithm, which depends only on the spectral properties of the dataset. We experimentally demonstrate the superiority of our algorithm compared to baselines in terms of the scalability and the ability to achieve lower distortion.
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