English

Low-Degree Testing Over Grids

Computational Complexity 2024-11-12 v2

Abstract

We study the question of local testability of low (constant) degree functions from a product domain S1××SnS_1 \times \dots \times {S}_n to a field F\mathbb{F}, where SiF{S_i} \subseteq \mathbb{F} can be arbitrary constant sized sets. We show that this family is locally testable when the grid is "symmetric". That is, if Si=S{S_i} = {S} for all i, there is a probabilistic algorithm using constantly many queries that distinguishes whether ff has a polynomial representation of degree at most dd or is Ω(1)\Omega(1)-far from having this property. In contrast, we show that there exist asymmetric grids with S1==Sn=3|{S}_1| =\dots= |{S}_n| = 3 for which testing requires ωn(1)\omega_n(1) queries, thereby establishing that even in the context of polynomials, local testing depends on the structure of the domain and not just the distance of the underlying code. The low-degree testing problem has been studied extensively over the years and a wide variety of tools have been applied to propose and analyze tests. Our work introduces yet another new connection in this rich field, by building low-degree tests out of tests for "junta-degrees". A function f:S1××SnGf : {S}_1 \times \dots \times {S}_n \to {G}, for an abelian group G{G} is said to be a junta-degree-dd function if it is a sum of dd-juntas. We derive our low-degree test by giving a new local test for junta-degree-dd functions. For the analysis of our tests, we deduce a small-set expansion theorem for spherical noise over large grids, which may be of independent interest.

Keywords

Cite

@article{arxiv.2305.04983,
  title  = {Low-Degree Testing Over Grids},
  author = {Prashanth Amireddy and Srikanth Srinivasan and Madhu Sudan},
  journal= {arXiv preprint arXiv:2305.04983},
  year   = {2024}
}

Comments

39 pages, conference version appeared in RANDOM 2023, corrected typos

R2 v1 2026-06-28T10:29:06.670Z