Almost Optimal Time Lower Bound for Approximating Parameterized Clique, CSP, and More, under ETH

arXiv - CS - Computational Complexity Pub Date : 2024-04-13 DOI:arxiv-2404.08870

Venkatesan Guruswami, Bingkai Lin, Xuandi Ren, Yican Sun, Kewen Wu

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Abstract

The Parameterized Inapproximability Hypothesis (PIH), which is an analog of the PCP theorem in parameterized complexity, asserts that, there is a constant $\varepsilon> 0$ such that for any computable function $f:\mathbb{N}\to\mathbb{N}$, no $f(k)\cdot n^{O(1)}$-time algorithm can, on input a $k$-variable CSP instance with domain size $n$, find an assignment satisfying $1-\varepsilon$ fraction of the constraints. A recent work by Guruswami, Lin, Ren, Sun, and Wu (STOC'24) established PIH under the Exponential Time Hypothesis (ETH). In this work, we improve the quantitative aspects of PIH and prove (under ETH) that approximating sparse parameterized CSPs within a constant factor requires $n^{k^{1-o(1)}}$ time. This immediately implies that, assuming ETH, finding a $(k/2)$-clique in an $n$-vertex graph with a $k$-clique requires $n^{k^{1-o(1)}}$ time. We also prove almost optimal time lower bounds for approximating $k$-ExactCover and Max $k$-Coverage. Our proof follows the blueprint of the previous work to identify a "vector-structured" ETH-hard CSP whose satisfiability can be checked via an appropriate form of "parallel" PCP. Using further ideas in the reduction, we guarantee additional structures for constraints in the CSP. We then leverage this to design a parallel PCP of almost linear size based on Reed-Muller codes and derandomized low degree testing.

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近似参数化 Clique、CSP 等的近似最优时间下限，ETH 下

参数化不可逼近假说（PIH）是参数化复杂性中 PCP 定理的一个类似物，它断言，存在一个常数$\varepsilon> 0$，对于任何可计算函数$f：\没有一个$f(k)\cdot n^{O(1)}$ 时的算法可以在输入一个域大小为$n$的$k$变量 CSP 实例时，找到一个满足$1-\varepsilon$部分约束的赋值。最近，Guruswami、Lin、Ren、Sun 和 Wu（STOC'24）的一项研究建立了指数时间假说（ETH）下的 PIH。在这项工作中，我们改进了 PIH 的定量方面，并证明（在 ETH 下）在常数因子内逼近稀疏参数化 CSP 需要 $n^{k^{1-o(1)}}$ 时间。这立即意味着，假设 ETH，在一个有 $k$-clique 的 $n$ 顶点图中找到一个 $(k/2)$-clique 需要 $n^{k^{1-o(1)}}$ 时间。我们还证明了接近 $k$-ExactCover 和 Max $k$-Coverage 的几乎最优时间下限。我们的证明沿袭了前人的工作蓝图，即找出一种 "向量结构 "的 ETH 难 CSP，通过 "并行 "PCP 的适当形式检查其满足性。利用还原中的进一步想法，我们保证了 CSP 中约束的附加结构。然后，我们利用这一点，基于里德-穆勒代码和去随机化低度测试，设计出了几乎线性大小的并行 PCP。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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arXiv - CS - Computational Complexity

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