Privacy-Preserving Parametric Inference: A Case for Robust Statistics

Avella‐Medina, Marco

doi:10.1080/01621459.2019.1700130

Cited by 31 publications

(17 citation statements)

References 51 publications

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“…. Then we find that actually ||W t || 2 2 /σ 2 follows a chi-square distribution χ 2 (d). By the concentration of chi-square distribution, there exists constants c 0 , c 1 , c 2 , such that:…”

Section: Proof Of Theorem 52mentioning

confidence: 86%

“…The trade-off between statistical accuracy and privacy is one of the fundamental topics in differential privacy. In the low-dimensional setting, there are various works focusing on this trade-off, including mean estimation [28,52,8,34,10,36], confidence intervals of Gaussian mean [37] and binomial mean [4], linear regression [55,10], generalized linear models [51,11,50], principal component analysis [30,12], convex empirical risk minimization [7], and robust M-estimators [2,3].…”

Section: Introductionmentioning

confidence: 99%

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High-Dimensional Differentially-Private EM Algorithm: Methods and Near-Optimal Statistical Guarantees

Zhang,

Zhang

2021

Preprint

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In this paper, we develop a general framework to design differentially private expectationmaximization (EM) algorithms in high-dimensional latent variable models, based on the noisy iterative hard-thresholding. We derive the statistical guarantees of the proposed framework and apply it to three specific models: Gaussian mixture, mixture of regression, and regression with missing covariates. In each model, we establish the near-optimal rate of convergence with differential privacy constraints, and show the proposed algorithm is minimax rate optimal up to logarithm factors. The technical tools developed for the high-dimensional setting are then extended to the classic low-dimensional latent variable models, and we propose a near rate-optimal EM algorithm with differential privacy guarantees in this setting. Simulation studies and real data analysis are conducted to support our results.

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Section: Proof Of Theorem 52mentioning

confidence: 86%

Section: Introductionmentioning

confidence: 99%

High-Dimensional Differentially-Private EM Algorithm: Methods and Near-Optimal Statistical Guarantees

Zhang,

Zhang

2021

Preprint

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“…Note that, in general, computing smooth sensitivity is also computationally inefficient with an exception of [AM21]. Using smooth sensitivity, [Lei11, Smi11, CH12, AM21] leverage robust Mestimators for differentially private estimation and inference.…”

Section: Testmentioning

confidence: 99%

Differential privacy and robust statistics in high dimensions

Liu¹,

Kong²,

Oh³

2021

Preprint

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We introduce a universal framework for characterizing the statistical efficiency of a statistical estimation problem with differential privacy guarantees. Our framework, which we call High-dimensional Propose-Test-Release (HPTR), builds upon three crucial components: the exponential mechanism from [MT07], robust statistics, and the Propose-Test-Release mechanism from [DL09]. Gluing all these together is the concept of resilience, which is central to robust statistical estimation. Resilience guides the design of the algorithm, the sensitivity analysis, and the success probability analysis of the test step in Propose-Test-Release. The key insight is that if we design an exponential mechanism that accesses the data only via one-dimensional robust statistics, then the resulting local sensitivity can be dramatically reduced. Using resilience, we can provide tight local sensitivity bounds. These tight bounds readily translate into near-optimal utility guarantees in several cases. We give a general recipe for applying HPTR to a given instance of a statistical estimation problem and demonstrate it on canonical problems of mean estimation, linear regression, covariance estimation, and principal component analysis. We introduce a general utility analysis technique that proves that HPTR nearly achieves the optimal sample complexity under several scenarios studied in the literature.

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“…For example, after defining the above robustness measures, Chaudhuri and Hsu (2012) use the notion of GES to deliver convergence rates for differentially private statistical estimators while Avella-Medina (2019) uses this measure to calibrate the additive noise to deliver differentially private M-Estimators. In the next sections we explore another approach, suggested but not studied in Chaudhuri and Hsu (2012) and Avella-Medina (2019), where we investigate the use of bounded M-Estimation for differentially private estimation and prediction using the OPM. While empirical risk minimization, that objective perturbation is built on, can be classified as M-Estimation, it is not straightforward to integrate the standard bounded functions for M-estimation as is.…”

Section: Links With Robust Statisticsmentioning

confidence: 99%

Perturbed M-Estimation: A Further Investigation of Robust Statistics for Differential Privacy

Slavković¹,

Molinari²

2021

Preprint

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Differential Privacy (DP) provides an elegant mathematical framework for defining a provable disclosure risk in the presence of arbitrary adversaries; it guarantees that whether an individual is in a database or not, the results of a DP procedure should be similar in terms of their probability distribution.While DP mechanisms are provably effective in protecting privacy, they often negatively impact the utility of the query responses, statistics and/or analyses that come as outputs from these mechanisms. To address this problem, we use ideas from the area of robust statistics which aims at reducing the influence of outlying observations on statistical inference. Based on the preliminary known links between differential privacy and robust statistics, we modify the objective perturbation mechanism by making use of a new bounded function and define a bounded M-Estimator with adequate statistical properties. The resulting privacy mechanism, named "Perturbed M-Estimation", shows important potential in terms of improved statistical utility of its outputs as suggested by some preliminary results. These results consequently support the need to further investigate the use of robust statistical tools for differential privacy.

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Privacy-Preserving Parametric Inference: A Case for Robust Statistics

Cited by 31 publications

References 51 publications

High-Dimensional Differentially-Private EM Algorithm: Methods and Near-Optimal Statistical Guarantees

High-Dimensional Differentially-Private EM Algorithm: Methods and Near-Optimal Statistical Guarantees

Differential privacy and robust statistics in high dimensions

Perturbed M-Estimation: A Further Investigation of Robust Statistics for Differential Privacy

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