Ben-Sasson, Goldreich and Sudan showed that a binary error correcting code admitting a $2$-query tester cannot be good, i.e., it cannot have both linear distance and positive rate. The same holds when the alphabet is a finite field $\mathbb{F}$, the code is $\mathbb{F}$-linear, and the $2$-query tester is $\mathbb{F}$-linear. We show that those are essentially the only limitations on the existence of good locally testable codes (LTCs). That is, there are good $2$-query LTCs on any alphabet with more than $2$ letters, and good $3$-query LTCs with a binary alphabet. Similarly, there are good $3$-query $\mathbb{F}$-linear LTCs, and for every $\mathbb{F}$-vector space $V$ of dimension greater than $1$, there are good $2$-query LTCs with alphabet $V$ whose tester is $\mathbb{F}$-linear. This completely solves, for every $q\geq 2$ and alphabet (resp. $\mathbb{F}$-vector space) $Σ$, the question of whether there is a good $q$-query LTC (resp. $\mathbb{F}$-LTC) with alphabet $Σ$. Our proof builds on the recent good $2$-query $\mathbb{F}$-LTCs of the first author and Kaufman, by establishing a general method for reducing the alphabet size of a low-query LTC.
翻译:Ben-Sasson、Goldreich 与 Sudan 证明了,允许 2 查询测试器的二进制纠错编码不可能是“优良”的,即无法同时具备线性距离与正速率。当字母表为有限域 $\mathbb{F}$、编码为 $\mathbb{F}$-线性且 2 查询测试器为 $\mathbb{F}$-线性时,该结论同样成立。我们证明这些限制本质上构成了优良局部可测试编码(LTC)存在的唯一约束。具体而言,对于字母表大小超过 2 的任何字母表,均存在优良的 2 查询 LTC;对于二进制字母表,则存在优良的 3 查询 LTC。类似地,存在优良的 3 查询 $\mathbb{F}$-线性 LTC,且对于每个维数大于 1 的 $\mathbb{F}$-向量空间 $V$,均存在字母表为 $V$、测试器为 $\mathbb{F}$-线性的优良 2 查询 LTC。这完全解决了对于任意 $q\geq 2$ 及字母表(或 $\mathbb{F}$-向量空间)$Σ$,是否存在字母表为 $Σ$ 的优良 $q$ 查询 LTC(或 $\mathbb{F}$-LTC)的问题。我们的证明建立在第一作者与 Kaufman 近期提出的优良 2 查询 $\mathbb{F}$-LTC 基础上,通过建立一种通用的方法来降低低查询 LTC 的字母表规模。
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