English

Robust Multiplication-based Tests for Reed-Muller Codes

Computational Complexity 2020-01-01 v4

Abstract

We consider the following multiplication-based tests to check if a given function f:FqnFqf: \mathbb{F}_q^n\to \mathbb{F}_q is a codeword of the Reed-Muller code of dimension nn and order dd over the finite field Fq\mathbb{F}_q for prime qq (i.e., ff is the evaluation of a degree-dd polynomial over Fq\mathbb{F}_q for qq prime). * Teste,k\mathrm{Test}_{e,k}: Pick P1,,PkP_1,\ldots,P_k independent random degree-ee polynomials and accept iff the function fP1PkfP_1\cdots P_k is the evaluation of a degree-(d+ek)(d+ek) polynomial (i.e., is a codeword of the Reed-Muller code of dimension nn and order (d+ek)(d+ek)). We prove the robust soundness of the above tests for large values of ee, answering a question of Dinur and Guruswami [Israel Journal of Mathematics, 209:611-649, 2015]. Previous soundness analyses of these tests were known only for the case when either e=1e=1 or k=1k=1. Even for the case k=1k=1 and e>1e>1, earlier soundness analyses were not robust. We also analyze a derandomized version of this test, where (for example) the polynomials P1,,PkP_1,\dots,P_k can be the same random polynomial PP. This generalizes a result of Guruswami et al. [SIAM J. Comput., 46(1):132-159, 2017]. One of the key ingredients that go into the proof of this robust soundness is an extension of the standard Schwartz-Zippel lemma over general finite fields Fq\mathbb{F}_q, which may be of independent interest.

Keywords

Cite

@article{arxiv.1612.03086,
  title  = {Robust Multiplication-based Tests for Reed-Muller Codes},
  author = {Prahladh Harsha and Srikanth Srinivasan},
  journal= {arXiv preprint arXiv:1612.03086},
  year   = {2020}
}
R2 v1 2026-06-22T17:18:49.493Z