Information-Theoretic Guarantees for Recovering Low-Rank Tensors from Symmetric Rank-One Measurements
Abstract: We investigate the sample complexity of recovering tensors with low symmetric rank from symmetric rank-one measurements, a setting particularly motivated by the study of higher-order interactions in statistics and the analysis of two-layer polynomial neural networks. Using a covering number argument, we analyze the performance of the symmetric rank minimization program and establish near-optimal sample complexity bounds when the underlying distribution is log-concave. Our measurement model involves random symmetric rank-one tensors, leading to involved probability calculations. To address these challenges, we employ the Carbery-Wright inequality, a powerful tool for studying anti-concentration properties of random polynomials, and leverage orthogonal polynomial expansions. Additionally, we provide a sample complexity lower bound via Fano’s inequality, and discuss broader implications of our results for two-layer polynomial networks.
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Submission Number: 145
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