Almost Perfect Privacy for Additive Gaussian Privacy Filters

Abstract

We study the maximal mutual information about a random variable Y (representing non-private information) displayed through an additive Gaussian channel when guaranteeing that only ε bits of information is leaked about a random variable X (representing private information) that is correlated with Y. Denoting this quantity by gε(X,Y), we show that for perfect privacy, i.e., ε=0, one has g0(X,Y)=0 for any pair of absolutely continuous random variables (X,Y) and then derive a second-order approximation for gε(X,Y) for small ε. This approximation is shown to be related to the strong data processing inequality for mutual information under suitable conditions on the joint distribution PXY. Next, motivated by an operational interpretation of data privacy, we formulate the privacy-utility tradeoff in the same setup using estimation-theoretic quantities and obtain explicit bounds for this tradeoff when ε is sufficiently small using the approximation formula derived for gε(X,Y).