The problem of testing low-degree polynomials has received significant attention over the years due to its importance in theoretical computer science, and in particular in complexity theory. The problem is specified by three parameters: field size $q$, degree $d$ and proximity parameter $\delta$, and the goal is to design a tester making as few as possible queries to a given function, which is able to distinguish between the case the given function has degree at most $d$, and the case the given function is $\delta$-far from any degree $d$ function. A tester is called optimal if it makes $O(q^d+1/\delta)$ queries (which are known to be necessary). For the field of size $q$, the natural $t$-flat tester was shown to be optimal first by Bhattacharyya et al. for $q=2$, and later by Haramaty et al. for all prime powers $q$. The dependency on the field size, however, is a tower-type function. We improve the results above, showing that the dependency on the field size is polynomial. Our approach also applies in the more general setting of lifted affine invariant codes, and is based on studying the structure of the collection of erroneous subspaces. i.e. subspaces $A$ such that $f|_{A}$ has degree greater than $d$. Towards this end, we observe that these sets are poorly expanding in the affine version of the Grassmann graph and use that to establish structural results on them via global hypercontractivity. We then use this structure to perform local correction on $f$.
翻译:由于在理论计算机科学中的重要性,特别是复杂理论中的重要性,测试低度多元度的问题多年来受到极大关注。问题由三个参数来说明:字段规模$q$、度$d$和近距离参数$\delta$。目标是设计一个测试器,对给定函数进行尽可能多的查询,该测试器能够区分给定函数的等级最多为$d$,而给定函数从任何水平美元计算到远方美元。如果测试器在理论计算机科学中,特别是复杂理论中具有重要性,那么它被称为最佳。如果它能提出$O(q ⁇ d+1/\delta)的查询(已知有必要这样做),问题由三个参数来说明问题。对于规模为$的字段规模,美元和近距离参数测试器,设计一个尽可能最佳的测试器,Bhattacharya et al., 它能够将给给给给给给给给给给给定最多为$d $d, 美元, 而后又给 Haramaty 和 al. 。但是对字段规模的依赖是一个塔式的功能。我们改进了以上的结果, 显示对美元的对美元的视野对硬度的缩缩缩缩缩结构的依度的依地值结构的依存度, 。我们在研究中, 也是以更深的缩缩缩化的对硬度, 。