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Simple Binary Hypothesis Testing under Local Differential Privacy and Communication Constraints

Statistics Theory 2023-12-19 v2 Data Structures and Algorithms Information Theory Machine Learning math.IT Machine Learning Statistics Theory

Abstract

We study simple binary hypothesis testing under both local differential privacy (LDP) and communication constraints. We qualify our results as either minimax optimal or instance optimal: the former hold for the set of distribution pairs with prescribed Hellinger divergence and total variation distance, whereas the latter hold for specific distribution pairs. For the sample complexity of simple hypothesis testing under pure LDP constraints, we establish instance-optimal bounds for distributions with binary support; minimax-optimal bounds for general distributions; and (approximately) instance-optimal, computationally efficient algorithms for general distributions. When both privacy and communication constraints are present, we develop instance-optimal, computationally efficient algorithms that achieve the minimum possible sample complexity (up to universal constants). Our results on instance-optimal algorithms hinge on identifying the extreme points of the joint range set A\mathcal A of two distributions pp and qq, defined as A:={(Tp,Tq)TC}\mathcal A := \{(\mathbf T p, \mathbf T q) | \mathbf T \in \mathcal C\}, where C\mathcal C is the set of channels characterizing the constraints.

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Cite

@article{arxiv.2301.03566,
  title  = {Simple Binary Hypothesis Testing under Local Differential Privacy and Communication Constraints},
  author = {Ankit Pensia and Amir R. Asadi and Varun Jog and Po-Ling Loh},
  journal= {arXiv preprint arXiv:2301.03566},
  year   = {2023}
}

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R2 v1 2026-06-28T08:07:53.333Z