Alapfogalmak
The author explores the optimal mechanisms for differential privacy in various statistical problems using K-norm and elliptic Gaussian noise.
Kivonat
The content delves into the mathematical intricacies of differential privacy mechanisms, focusing on K-norm and elliptic Gaussian noise. It discusses the efficient sampling methods for different statistical problems like Sum, Count, and Vote. The analysis includes detailed proofs and derivations of key results in a rigorous mathematical framework.
Statisztikák
Hardt and Talwar [20] showed that this task reduces to uniformly sampling the norm unit ball.
This presents a substantial practical obstacle for all but the smallest problems.
The enclosing ellipses for the sparse-contribution Count and Vote norm balls that minimize expected squared ℓ2 norm have closed forms.
Simulations show that the five algorithms yield nontrivial error improvements.
All polytopes considered in this paper have Ω(d) constraints.