Optimal bounds for $\ell_p$ sensitivity sampling via $\ell_2$ augmentation
June 01, 2024 Β· Declared Dead Β· π International Conference on Machine Learning
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Authors
Alexander Munteanu, Simon Omlor
arXiv ID
2406.00328
Category
cs.DS: Data Structures & Algorithms
Cross-listed
cs.LG,
stat.ML
Citations
5
Venue
International Conference on Machine Learning
Last Checked
4 months ago
Abstract
Data subsampling is one of the most natural methods to approximate a massively large data set by a small representative proxy. In particular, sensitivity sampling received a lot of attention, which samples points proportional to an individual importance measure called sensitivity. This framework reduces in very general settings the size of data to roughly the VC dimension $d$ times the total sensitivity $\mathfrak S$ while providing strong $(1\pm\varepsilon)$ guarantees on the quality of approximation. The recent work of Woodruff & Yasuda (2023c) improved substantially over the general $\tilde O(\varepsilon^{-2}\mathfrak Sd)$ bound for the important problem of $\ell_p$ subspace embeddings to $\tilde O(\varepsilon^{-2}\mathfrak S^{2/p})$ for $p\in[1,2]$. Their result was subsumed by an earlier $\tilde O(\varepsilon^{-2}\mathfrak Sd^{1-p/2})$ bound which was implicitly given in the work of Chen & Derezinski (2021). We show that their result is tight when sampling according to plain $\ell_p$ sensitivities. We observe that by augmenting the $\ell_p$ sensitivities by $\ell_2$ sensitivities, we obtain better bounds improving over the aforementioned results to optimal linear $\tilde O(\varepsilon^{-2}(\mathfrak S+d)) = \tilde O(\varepsilon^{-2}d)$ sampling complexity for all $p \in [1,2]$. In particular, this resolves an open question of Woodruff & Yasuda (2023c) in the affirmative for $p \in [1,2]$ and brings sensitivity subsampling into the regime that was previously only known to be possible using Lewis weights (Cohen & Peng, 2015). As an application of our main result, we also obtain an $\tilde O(\varepsilon^{-2}ΞΌd)$ sensitivity sampling bound for logistic regression, where $ΞΌ$ is a natural complexity measure for this problem. This improves over the previous $\tilde O(\varepsilon^{-2}ΞΌ^2 d)$ bound of Mai et al. (2021) which was based on Lewis weights subsampling.
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