Separations in Proof Complexity and TFNP

IF 2.3 2区 计算机科学 Q2 COMPUTER SCIENCE, HARDWARE & ARCHITECTURE
Journal of the ACM Pub Date : 2024-05-09 DOI:10.1145/3663758
Mika Göös, Alexandros Hollender, Siddhartha Jain, Gilbert Maystre, William Pires, Robert Robere, Ran Tao
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引用次数: 0

Abstract

It is well-known that Resolution proofs can be efficiently simulated by Sherali–Adams (SA) proofs. We show, however, that any such simulation needs to exploit huge coefficients: Resolution cannot be efficiently simulated by SA when the coefficients are written in unary. We also show that Reversible Resolution (a variant of MaxSAT Resolution) cannot be efficiently simulated by Nullstellensatz (NS).

These results have consequences for total \({\text{\upshape \sffamily NP}} \) search problems. First, we characterise the classes \({\text{\upshape \sffamily PPADS}} \), \({\text{\upshape \sffamily PPAD}} \), \({\text{\upshape \sffamily SOPL}} \) by unary-SA, unary-NS, and Reversible Resolution, respectively. Second, we show that, relative to an oracle, \({\text{\upshape \sffamily PLS}} \not\subseteq {\text{\upshape \sffamily PPP}} \), \({\text{\upshape \sffamily SOPL}} \not\subseteq {\text{\upshape \sffamily PPA}} \), and \({\text{\upshape \sffamily EOPL}} \not\subseteq {\text{\upshape \sffamily UEOPL}} \). In particular, together with prior work, this gives a complete picture of the black-box relationships between all classical \({\text{\upshape \sffamily TFNP}} \) classes introduced in the 1990s.

证明复杂性与 TFNP 的分离
众所周知,解析证明可以通过谢拉利-亚当斯(Sherali-Adams,SA)证明进行高效模拟。然而,我们发现,任何此类模拟都需要利用庞大的系数:当系数以一元形式书写时,SA 无法高效地模拟解析。我们还证明了可逆解析(MaxSAT解析的一种变体)无法通过空策略(Nullstellensatz,NS)进行有效模拟。这些结果对总搜索({text{\upshape \sffamily NP}} \)问题有影响。首先,我们通过unary-SA、unary-NS和可逆解析分别描述了\({\text{upshape \sffamily PPADS}} \)、\({text{upshape \sffamily PPAD}} \)、\({text{upshape \sffamily SOPL}} \)类。其次,我们证明,相对于甲骨文,({text ({text (upshape (sffamily PLS}}))\not\subseteq {\text{upshape\sffamily PPP}}.\),({text ({向上形狀 (sffamily SOPL}}\not\subseteq {\text{upshape \sffamily PPA} }\),和 ({text (上形) (sffamily EOPL}}\not(subseteq {\text{upshape \sffamily UEOPL}} )。\).特别是,结合之前的工作,这就完整地描述了 20 世纪 90 年代引入的所有经典类之间的黑箱关系。
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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来源期刊
Journal of the ACM
Journal of the ACM 工程技术-计算机:理论方法
CiteScore
7.50
自引率
0.00%
发文量
51
审稿时长
3 months
期刊介绍: The best indicator of the scope of the journal is provided by the areas covered by its Editorial Board. These areas change from time to time, as the field evolves. The following areas are currently covered by a member of the Editorial Board: Algorithms and Combinatorial Optimization; Algorithms and Data Structures; Algorithms, Combinatorial Optimization, and Games; Artificial Intelligence; Complexity Theory; Computational Biology; Computational Geometry; Computer Graphics and Computer Vision; Computer-Aided Verification; Cryptography and Security; Cyber-Physical, Embedded, and Real-Time Systems; Database Systems and Theory; Distributed Computing; Economics and Computation; Information Theory; Logic and Computation; Logic, Algorithms, and Complexity; Machine Learning and Computational Learning Theory; Networking; Parallel Computing and Architecture; Programming Languages; Quantum Computing; Randomized Algorithms and Probabilistic Analysis of Algorithms; Scientific Computing and High Performance Computing; Software Engineering; Web Algorithms and Data Mining
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