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In this paper, we develop a significantly simpler, computationally efficient algorithm that guarantees $O(d \sqrt{T})$ linear swap regret for a general convex set that has been preconditioned via the John ellipsoid. Our algorithm leverages the powerful response-based approachability framework of Bernstein and Shimkin (JMLR~'15) -- previously overlooked in the line of work on swap regret minimization -- and simultaneously minimizes profile swap regret, which was recently shown to guarantee non-manipulability. Moreover, we establish a matching information-theoretic lower bound: any learner must incur in expectation $\Omega(d \sqrt{T})$ linear swap regret for large enough $T$, even when the set is centrally symmetric. This also shows that the classic algorithm of Gordon, Greenwald, and Marks (ICML '08) is existentially optimal for minimizing linear swap regret, although it is computationally inefficient. Finally, we extend our approach to minimize regret with respect to the set of swap deviations with polynomial dimension, unifying and strengthening recent results in equilibrium computation and online learning.
| Comments: | V3 makes certain clarifications and improves the upper bound for general sets via symmetrization |
| Subjects: | Machine Learning (cs.LG) |
| Cite as: | arXiv:2602.06264 [cs.LG] |
| (or arXiv:2602.06264v3 [cs.LG] for this version) | |
| https://doi.org/10.48550/arXiv.2602.06264 arXiv-issued DOI via DataCite |
From: Ioannis Anagnostides [view email]
[v1]
Thu, 5 Feb 2026 23:43:25 UTC (307 KB)
[v2]
Wed, 15 Apr 2026 10:40:59 UTC (305 KB)
[v3]
Thu, 21 May 2026 04:37:52 UTC (306 KB)
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