Private Convex Optimization in General Norms

Abstract

We propose a new framework for differentially private optimization of convex functions which are Lipschitz in an arbitrary norm \|·\|. Our algorithms are based on a regularized exponential mechanism which samples from the density (-k(F+μ r)) where F is the empirical loss and r is a regularizer which is strongly convex with respect to \|·\|, generalizing a recent work of [Gopi, Lee, Liu '22] to non-Euclidean settings. We show that this mechanism satisfies Gaussian differential privacy and solves both DP-ERM (empirical risk minimization) and DP-SCO (stochastic convex optimization) by using localization tools from convex geometry. Our framework is the first to apply to private convex optimization in general normed spaces and directly recovers non-private SCO rates achieved by mirror descent as the privacy parameter ε ∞. As applications, for Lipschitz optimization in p norms for all p ∈ (1, 2), we obtain the first optimal privacy-utility tradeoffs; for p = 1, we improve tradeoffs obtained by the recent works [Asi, Feldman, Koren, Talwar '21, Bassily, Guzman, Nandi '21] by at least a logarithmic factor. Our p norm and Schatten-p norm optimization frameworks are complemented with polynomial-time samplers whose query complexity we explicitly bound.

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