Privacy Under Hard Distortion Constraints
Abstract
We study the problem of data disclosure with privacy guarantees, wherein the utility of the disclosed data is ensured via a \emph{hard distortion} constraint. Unlike average distortion, hard distortion provides a deterministic guarantee of fidelity. For the privacy measure, we use a tunable information leakage measure, namely \textit{maximal -leakage} (), and formulate the privacy-utility tradeoff problem. The resulting solution highlights that under a hard distortion constraint, the nature of the solution remains unchanged for both local and non-local privacy requirements. More precisely, we show that both the optimal mechanism and the optimal tradeoff are invariant for any ; i.e., the tunable leakage measure only behaves as either of the two extrema, i.e., mutual information for and maximal leakage for .
Cite
@article{arxiv.1806.00063,
title = {Privacy Under Hard Distortion Constraints},
author = {Jiachun Liao and Oliver Kosut and Lalitha Sankar and Flavio P. Calmon},
journal= {arXiv preprint arXiv:1806.00063},
year = {2018}
}
Comments
5 pages, 1 figure