English

Improved Summation from Shuffling

Cryptography and Security 2019-09-26 v1

Abstract

A protocol by Ishai et al.\ (FOCS 2006) showing how to implement distributed nn-party summation from secure shuffling has regained relevance in the context of the recently proposed \emph{shuffle model} of differential privacy, as it allows to attain the accuracy levels of the curator model at a moderate communication cost. To achieve statistical security 2σ2^{-\sigma}, the protocol by Ishai et al.\ requires the number of messages sent by each party to {\em grow} logarithmically with nn as O(logn+σ)O(\log n + \sigma). In this note we give an improved analysis achieving a dependency of the form O(1+σ/logn)O(1+\sigma/\log n). Conceptually, this addresses the intuitive question left open by Ishai et al.\ of whether the shuffling step in their protocol provides a "hiding in the crowd" amplification effect as nn increases. From a practical perspective, our analysis provides explicit constants and shows, for example, that the method of Ishai et al.\ applied to summation of 3232-bit numbers from n=104n=10^4 parties sending 1212 messages each provides statistical security 2402^{-40}.

Keywords

Cite

@article{arxiv.1909.11225,
  title  = {Improved Summation from Shuffling},
  author = {Borja Balle and James Bell and Adria Gascon and Kobbi Nissim},
  journal= {arXiv preprint arXiv:1909.11225},
  year   = {2019}
}
R2 v1 2026-06-23T11:24:56.910Z