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Projection-Free Bandit Optimization with Privacy Guarantees

Machine Learning 2020-12-23 v1 Cryptography and Security Data Structures and Algorithms Optimization and Control

Abstract

We design differentially private algorithms for the bandit convex optimization problem in the projection-free setting. This setting is important whenever the decision set has a complex geometry, and access to it is done efficiently only through a linear optimization oracle, hence Euclidean projections are unavailable (e.g. matroid polytope, submodular base polytope). This is the first differentially-private algorithm for projection-free bandit optimization, and in fact our bound of O~(T3/4)\widetilde{O}(T^{3/4}) matches the best known non-private projection-free algorithm (Garber-Kretzu, AISTATS `20) and the best known private algorithm, even for the weaker setting when projections are available (Smith-Thakurta, NeurIPS `13).

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Cite

@article{arxiv.2012.12138,
  title  = {Projection-Free Bandit Optimization with Privacy Guarantees},
  author = {Alina Ene and Huy L. Nguyen and Adrian Vladu},
  journal= {arXiv preprint arXiv:2012.12138},
  year   = {2020}
}

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Appears in AAAI-21

R2 v1 2026-06-23T21:13:18.375Z