Optimal Subspace Embeddings: Resolving Nelson-Nguyen Conjecture Up to Sub-Polylogarithmic Factors

August 19, 2025 Β· Declared Dead Β· πŸ› arXiv.org

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Authors Shabarish Chenakkod, MichaΕ‚ DereziΕ„ski, Xiaoyu Dong arXiv ID 2508.14234 Category cs.DS: Data Structures & Algorithms Cross-listed cs.LG, math.NA, math.PR, stat.ML Citations 4 Venue arXiv.org Last Checked 4 months ago
Abstract
We give a proof of the conjecture of Nelson and Nguyen [FOCS 2013] on the optimal dimension and sparsity of oblivious subspace embeddings, up to sub-polylogarithmic factors: For any $n\geq d$ and $Ξ΅\geq d^{-O(1)}$, there is a random $\tilde O(d/Ξ΅^2)\times n$ matrix $Ξ $ with $\tilde O(\log(d)/Ξ΅)$ non-zeros per column such that for any $A\in\mathbb{R}^{n\times d}$, with high probability, $(1-Ξ΅)\|Ax\|\leq\|Ξ Ax\|\leq(1+Ξ΅)\|Ax\|$ for all $x\in\mathbb{R}^d$, where $\tilde O(\cdot)$ hides only sub-polylogarithmic factors in $d$. Our result in particular implies a new fastest sub-current matrix multiplication time reduction of size $\tilde O(d/Ξ΅^2)$ for a broad class of $n\times d$ linear regression tasks. A key novelty in our analysis is a matrix concentration technique we call iterative decoupling, which we use to fine-tune the higher-order trace moment bounds attainable via existing random matrix universality tools [Brailovskaya and van Handel, GAFA 2024].
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