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On Compression Functions over Groups with Applications to Homomorphic Encryption

Group Theory 2025-07-04 v2 Cryptography and Security

Abstract

Fully homomorphic encryption (FHE) enables an entity to perform arbitrary computation on encrypted data without decrypting the ciphertexts. An ongoing group-theoretical approach to construct an FHE scheme uses a certain "compression" function F(x)F(x) implemented by group operations on a given finite group GG, which satisfies that F(1)=1F(1) = 1 and F(σ)=F(σ2)=σF(\sigma) = F(\sigma^2) = \sigma where σG\sigma \in G is some element of order 33. The previous work gave an example of such a function over the symmetric group G=S5G = S_5 by just a heuristic approach. In this paper, we systematically study the possibilities of such a function over various groups. We show that such a function does not exist over any solvable group GG (such as an Abelian group and a smaller symmetric group SnS_n with n4n \leq 4). We also construct such a function over the alternating group G=A5G = A_5 that has a shortest possible expression. Moreover, by using this new function, we give a reduction of a construction of an FHE scheme to a construction of a homomorphic encryption scheme over the group A5A_5, which is more efficient than the previously known reductions.

Cite

@article{arxiv.2208.02468,
  title  = {On Compression Functions over Groups with Applications to Homomorphic Encryption},
  author = {Koji Nuida},
  journal= {arXiv preprint arXiv:2208.02468},
  year   = {2025}
}

Comments

14 pages

R2 v1 2026-06-25T01:28:08.409Z