Differentially Private Online-to-Batch for Smooth Losses
Abstract
We develop a new reduction that converts any online convex optimization algorithm suffering O(T) regret into an ε-differentially private stochastic convex optimization algorithm with the optimal convergence rate O(1/T + d/ε T) on smooth losses in linear time, forming a direct analogy to the classical non-private "online-to-batch" conversion. By applying our techniques to more advanced adaptive online algorithms, we produce adaptive differentially private counterparts whose convergence rates depend on apriori unknown variances or parameter norms.
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