Private Empirical Risk Minimization: Efficient Algorithms and Tight Error Bounds
Pennsylvania State University · Microsoft Research (India) · +1 more institution
Abstract
Convex empirical risk minimization is a basic tool in machine learning and statistics. We provide new algorithms and matching lower bounds for differentially private convex empirical risk minimization assuming only that each data point's contribution to the loss function is Lipschitz and that the domain of optimization is bounded. We provide a separate set of algorithms and matching lower bounds for the setting in which the loss functions are known to also be strongly convex. Our algorithms run in polynomial time, and in some cases even match the optimal nonprivate running time (as measured by oracle complexity). We give separate algorithms (and lower bounds) for (ε, 0)and (ε, δ)-differential privacy; perhaps…
Citation impact
- FWCI
- 24.11
- Percentile
- 100%
- References
- 69
Authors
3Topics & keywords
- Empirical risk minimization
- Algorithm
- Lipschitz continuity
- Convex function
- Bounded function
- Oracle
- Differential privacy
- Estimator
- Peace, Justice and strong institutions