Private Matrix Approximation and Geometry of Unitary Orbits

July 06, 2022 Β· Declared Dead Β· πŸ› Annual Conference Computational Learning Theory

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Authors Oren Mangoubi, Yikai Wu, Satyen Kale, Abhradeep Guha Thakurta, Nisheeth K. Vishnoi arXiv ID 2207.02794 Category cs.DS: Data Structures & Algorithms Cross-listed cs.CR, cs.LG, math.MG, stat.ML Citations 5 Venue Annual Conference Computational Learning Theory Last Checked 4 months ago
Abstract
Consider the following optimization problem: Given $n \times n$ matrices $A$ and $Ξ›$, maximize $\langle A, UΞ›U^*\rangle$ where $U$ varies over the unitary group $\mathrm{U}(n)$. This problem seeks to approximate $A$ by a matrix whose spectrum is the same as $Ξ›$ and, by setting $Ξ›$ to be appropriate diagonal matrices, one can recover matrix approximation problems such as PCA and rank-$k$ approximation. We study the problem of designing differentially private algorithms for this optimization problem in settings where the matrix $A$ is constructed using users' private data. We give efficient and private algorithms that come with upper and lower bounds on the approximation error. Our results unify and improve upon several prior works on private matrix approximation problems. They rely on extensions of packing/covering number bounds for Grassmannians to unitary orbits which should be of independent interest.
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