Optimal minimization of the covariance loss

Abstract

Let X be a random vector valued in Rm such that \|X\|2 1 almost surely. For every k 3, we show that there exists a sigma algebra F generated by a partition of Rm into k sets such that \[\|Cov(X) - Cov(E[X]) \|F 1k.\] This is optimal up to the implicit constant and improves on a previous bound due to Boedihardjo, Strohmer, and Vershynin. Our proof provides an efficient algorithm for constructing F and leads to improved accuracy guarantees for k-anonymous or differentially private synthetic data. We also establish a connection between the above problem of minimizing the covariance loss and the pinning lemma from statistical physics, providing an alternate (and much simpler) algorithmic proof in the important case when X ∈ \ 1\m/m almost surely.

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