A Linear Reduction Method for Local Differential Privacy and Log-lift
Abstract
This paper considers the problem of publishing data X while protecting correlated sensitive information S. We propose a linear method to generate the sanitized data Y with the same alphabet Y = X that attains local differential privacy (LDP) and log-lift at the same time. It is revealed that both LDP and log-lift are inversely proportional to the statistical distance between conditional probability PY|S(x|s) and marginal probability PY(x): the closer the two probabilities are, the more private Y is. Specifying PY|S(x|s) that linearly reduces this distance |PY|S(x|s) - PY(x)| = (1-α)|PX|S(x|s) - PX(x)|,∀ s,x for some α ∈ (0,1], we study the problem of how to generate Y from the original data S and X. The Markov randomization/sanitization scheme PY|X(x|x') = PY|S,X(x|s,x') is obtained by solving linear equations. The optimal non-Markov sanitization, the transition probability PY|S,X(x|s,x') that depends on S, can be determined by maximizing the data utility subject to linear equality constraints. We compute the solution for two linear utility function: the expected distance and total variance distance. It is shown that the non-Markov randomization significantly improves data utility and the marginal probability PX(x) remains the same after the linear sanitization method: PY(x) = PX(x), ∀ x ∈ X.
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