A General Framework for Low Soundness Homomorphism Testing
Abstract
We introduce a general framework to design and analyze algorithms for the problem of testing homomorphisms between finite groups in the low-soundness regime. In this regime, we give the first constant-query tests for various families of groups. These include tests for: (i) homomorphisms between arbitrary cyclic groups, (ii) homomorphisms between any finite group and , (iii) automorphisms of dihedral and symmetric groups, (iv) inner automorphisms of non-abelian finite simple groups and extraspecial groups, and (v) testing linear characters of , and finite-dimensional Lie algebras over . We also recover the result of Kiwi [TCS'03] for testing homomorphisms between and . Prior to this work, such tests were only known for abelian groups with a constant maximal order (such as ). No tests were known for non-abelian groups. As an additional corollary, our framework gives combinatorial list decoding bounds for cyclic groups with list size dependence of (for agreement parameter ). This improves upon the currently best-known bound of due to Dinur, Grigorescu, Kopparty, and Sudan [STOC'08], and Guo and Sudan [RANDOM'14].
Cite
@article{arxiv.2509.05871,
title = {A General Framework for Low Soundness Homomorphism Testing},
author = {Tushant Mittal and Sourya Roy},
journal= {arXiv preprint arXiv:2509.05871},
year = {2025}
}