On homomorphic encryption using abelian groups: Classical security analysis
Abstract
In [15], Leonardi and Ruiz-Lopez propose an additively homomorphic public key encryption scheme whose security is expected to depend on the hardness of the learning homomorphism with noise problem (LHN). Choosing parameters for their primitive requires choosing three groups , , and . In their paper, Leonardi and Ruiz-Lopez claim that, when , , and are abelian, then their public key cryptosystem is not quantum secure. In this paper, we study security for finite abelian groups , , and in the classical case. Moreover, we study quantum attacks on instantiations with solvable groups.
Keywords
Cite
@article{arxiv.2302.12867,
title = {On homomorphic encryption using abelian groups: Classical security analysis},
author = {Eleni Agathocleous and Vishnupriya Anupindi and Annette Bachmayr and Chloe Martindale and Rahinatou Yuh Njah Nchiwo and Mima Stanojkovski},
journal= {arXiv preprint arXiv:2302.12867},
year = {2023}
}
Comments
20 pages, changes in compliance with the referees' suggestions, to appear in the Springer AWM volume "Women in Numbers Europe 4 - Research Directions in Number Theory"