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Distributed empirical risk minimization with differential privacy

Changxin Liu, Karl Henrik Johansson, Yang Shi

2024Automatica11 citationsDOIOpen Access PDF

Abstract

This work studies the distributed empirical risk minimization (ERM) problem under differential privacy (DP) constraint. Standard distributed algorithms achieve DP typically by perturbing all local subgradients with noise, leading to significantly degenerated utility. To tackle this issue, we develop a class of private distributed dual averaging (DDA) algorithms, which activates a fraction of nodes to perform optimization. Such subsampling procedure provably amplifies the DP guarantee, thereby achieving an equivalent level of DP with reduced noise. We prove that the proposed algorithms have utility loss comparable to centralized private algorithms for both general and strongly convex problems. When removing the noise, our algorithm attains the optimal O(1/t) convergence for non-smooth stochastic optimization. Finally, experimental results on two benchmark datasets are given to verify the effectiveness of the proposed algorithms.

Topics & Concepts

Differential privacyBenchmark (surveying)Computer scienceMathematical optimizationConvergence (economics)Noise (video)MinificationEmpirical risk minimizationDual (grammatical number)Convex optimizationOptimization problemConstraint (computer-aided design)Class (philosophy)Fraction (chemistry)Regular polygonAlgorithmMathematicsArtificial intelligenceImage (mathematics)ArtLiteratureEconomicsGeographyOrganic chemistryEconomic growthGeometryGeodesyChemistryPrivacy-Preserving Technologies in DataStochastic Gradient Optimization TechniquesAge of Information Optimization