Robustness Properties of Dimensionality Reduction with Gaussian Random Matrices

January 08, 2015 Β· Declared Dead Β· πŸ› Science China Mathematics

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Authors Bin Han, Zhiqiang Xu arXiv ID 1501.01695 Category cs.IT: Information Theory Cross-listed math.FA, math.NA, math.PR Citations 4 Venue Science China Mathematics Last Checked 4 months ago
Abstract
In this paper we study the robustness properties of dimensionality reduction with Gaussian random matrices having arbitrarily erased rows. We first study the robustness property against erasure for the almost norm preservation property of Gaussian random matrices by obtaining the optimal estimate of the erasure ratio for a small given norm distortion rate. As a consequence, we establish the robustness property of Johnson-Lindenstrauss lemma and the robustness property of restricted isometry property with corruption for Gaussian random matrices. Secondly, we obtain a sharp estimate for the optimal lower and upper bounds of norm distortion rates of Gaussian random matrices under a given erasure ratio. This allows us to establish the strong restricted isometry property with the almost optimal RIP constants, which plays a central role in the study of phaseless compressed sensing.
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