Sublinear Time Quantum Sensitivity Sampling

September 20, 2025 Β· Declared Dead Β· πŸ› arXiv.org

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Authors Zhao Song, David P. Woodruff, Lichen Zhang arXiv ID 2509.16801 Category cs.DS: Data Structures & Algorithms Cross-listed cs.LG, quant-ph Citations 0 Venue arXiv.org Last Checked 4 months ago
Abstract
We present a unified framework for quantum sensitivity sampling, extending the advantages of quantum computing to a broad class of classical approximation problems. Our unified framework provides a streamlined approach for constructing coresets and offers significant runtime improvements in applications such as clustering, regression, and low-rank approximation. Our contributions include: * $k$-median and $k$-means clustering: For $n$ points in $d$-dimensional Euclidean space, we give an algorithm that constructs an $Ξ΅$-coreset in time $\widetilde O(n^{0.5}dk^{2.5}~\mathrm{poly}(Ξ΅^{-1}))$ for $k$-median and $k$-means clustering. Our approach achieves a better dependence on $d$ and constructs smaller coresets that only consist of points in the dataset, compared to recent results of [Xue, Chen, Li and Jiang, ICML'23]. * $\ell_p$ regression: For $\ell_p$ regression problems, we construct an $Ξ΅$-coreset of size $\widetilde O_p(d^{\max\{1, p/2\}}Ξ΅^{-2})$ in time $\widetilde O_p(n^{0.5}d^{\max\{0.5, p/4\}+1}(Ξ΅^{-3}+d^{0.5}))$, improving upon the prior best quantum sampling approach of [Apers and Gribling, QIP'24] for all $p\in (0, 2)\cup (2, 22]$, including the widely studied least absolute deviation regression ($\ell_1$ regression). * Low-rank approximation with Frobenius norm error: We introduce the first quantum sublinear-time algorithm for low-rank approximation that does not rely on data-dependent parameters, and runs in $\widetilde O(nd^{0.5}k^{0.5}Ξ΅^{-1})$ time. Additionally, we present quantum sublinear algorithms for kernel low-rank approximation and tensor low-rank approximation, broadening the range of achievable sublinear time algorithms in randomized numerical linear algebra.
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