Litcius/Paper detail

Differentially private inference via noisy optimization

Marco Avella-Medina, Casey Bradshaw, Po‐Ling Loh

2023The Annals of Statistics16 citationsDOI

Abstract

We propose a general optimization-based framework for computing differentially private M-estimators and a new method for constructing differentially private confidence regions. First, we show that robust statistics can be used in conjunction with noisy gradient descent or noisy Newton methods in order to obtain optimal private estimators with global linear or quadratic convergence, respectively. We establish local and global convergence guarantees, under both local strong convexity and self-concordance, showing that our private estimators converge with high probability to a small neighborhood of the nonprivate M-estimators. Second, we tackle the problem of parametric inference by constructing differentially private estimators of the asymptotic variance of our private M-estimators. This naturally leads to approximate pivotal statistics for constructing confidence regions and conducting hypothesis testing. We demonstrate the effectiveness of a bias correction that leads to enhanced small-sample empirical performance in simulations. We illustrate the benefits of our methods in several numerical examples.

Topics & Concepts

EstimatorMathematicsInferenceParametric statisticsEmpirical likelihoodConvexityConvergence (economics)Rate of convergenceDelta methodMathematical optimizationStatistical inferenceApplied mathematicsStatisticsComputer scienceArtificial intelligenceComputer networkEconomicsChannel (broadcasting)Financial economicsEconomic growthStatistical Methods and InferenceStatistical Methods and Bayesian InferenceDistributed Sensor Networks and Detection Algorithms
Differentially private inference via noisy optimization | Litcius