Improved Capacity Outer Bound for Private Quadratic Monomial Computation
Abstract
In private computation, a user wishes to retrieve a function evaluation of messages stored on a set of databases without revealing the function's identity to the databases. Obead \emph{et al.} introduced a capacity outer bound for private nonlinear computation, dependent on the order of the candidate functions. Focusing on private \emph{quadratic monomial} computation, we propose three methods for ordering candidate functions: a graph edge-coloring method, a graph-distance method, and an entropy-based greedy method. We confirm, via an exhaustive search, that all three methods yield an optimal ordering for messages. For messages, we numerically evaluate the performance of the proposed methods compared with a directed random search. For almost all scenarios considered, the entropy-based greedy method gives the smallest gap to the best-found ordering.
Cite
@article{arxiv.2401.06125,
title = {Improved Capacity Outer Bound for Private Quadratic Monomial Computation},
author = {Karen M. Dæhli and Sarah A Obead and Hsuan-Yin Lin and Eirik Rosnes},
journal= {arXiv preprint arXiv:2401.06125},
year = {2024}
}
Comments
7 pages, 6 figures, and 1 table. An extended version of a paper accepted for presentation at the 2024 International Zurich Seminar on Information and Communication (IZS)