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Unified lower bounds for interactive high-dimensional estimation under information constraints

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arxiv 2010.06562 v6 pith:TSE2BG2I submitted 2020-10-13 cs.DS cs.DMcs.ITcs.LGmath.ITmath.STstat.TH

Unified lower bounds for interactive high-dimensional estimation under information constraints

classification cs.DS cs.DMcs.ITcs.LGmath.ITmath.STstat.TH
keywords boundslowerestimationconstraintsfamiliesframeworkinformationinteractive
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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We consider distributed parameter estimation using interactive protocols subject to local information constraints such as bandwidth limitations, local differential privacy, and restricted measurements. We provide a unified framework enabling us to derive a variety of (tight) minimax lower bounds for different parametric families of distributions, both continuous and discrete, under any $\ell_p$ loss. Our lower bound framework is versatile and yields "plug-and-play" bounds that are widely applicable to a large range of estimation problems, and, for the prototypical case of the Gaussian family, circumvents limitations of previous techniques. In particular, our approach recovers bounds obtained using data processing inequalities and Cram\'er--Rao bounds, two other alternative approaches for proving lower bounds in our setting of interest. Further, for the families considered, we complement our lower bounds with matching upper bounds.

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