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March 1, 2026Open Access

Universal Shuffle Asymptotics: Sharp Privacy Analysis via Limit Experiments (Parts I–III)

Key Points

The aim is to develop a complete asymptotic theory for privacy amplification through shuffling techniques.
Developed sharp Gaussian equivalence and privacy curves for fixed local randomizers.
Identified non-Gaussian limit experiments at the critical scaling boundary.
Provided proofs for linearization and GDP asymptotics in multi-message scenarios.
Established exact finite-n privacy curves for local randomizers.
Introduced new non-Gaussian limit experiments related to privacy amplification.
Completed proofs leading to a Berry–Esseen theorem connecting Gaussian and Poisson regimes.

Abstract

A three-part series establishing a complete asymptotic theory for privacy amplification by shuffling. Part I develops sharp Gaussian (GDP/LAN) equivalence and exact finite-n privacy curves for fixed local randomizers. Part II identifies non-Gaussian Poisson/Skellam/PPP limit experiments at the critical scaling boundary. Part III completes the program with full proofs of the conditional-expectation linearization, multi-message unbundled GDP asymptotics, and a boundary Berry–Esseen theorem bridging the Gaussian and Poisson regimes.

Universal Shuffle Asymptotics: Sharp Privacy Analysis via Limit Experiments (Parts I–III)

Key Points

Abstract

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