Information Contraction under (,δ)-Differentially Private Mechanisms

Abstract

The distinguishability quantified by information measures after being processed by a private mechanism has been a useful tool in studying various statistical and operational tasks while ensuring privacy. To this end, standard data-processing inequalities and strong data-processing inequalities (SDPI) are employed. Most of the previously known and even tight characterizations of contraction of information measures, including total variation distance, hockey-stick divergences, and f-divergences, are applicable for (,0)-local differential private (LDP) mechanisms. In this work, we derive both linear and non-linear strong data-processing inequalities for hockey-stick divergence and f-divergences that are valid for all (,δ)-LDP mechanisms even when δ ≠ 0. Our results either generalize or improve the previously known bounds on the contraction of these distinguishability measures.