An exponential separation between the matching principle and the pigeonhole principle

P. Beame, T. Pitassi
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引用次数: 26

Abstract

The combinatorial matching principle states that there is no perfect matching on an odd number of vertices. This principle generalizes the pigeonhole principle, which states that for a fixed bipartition of the vertices, there is no perfect matching between them. Therefore, it follows from recent lower bounds for the pigeonhole principle that the matching principle requires exponential-size bounded-depth Frege proofs. M. Ajtai (1990) previously showed that the matching principle does not have polynomial-size bounded-depth Frege proofs even with the pigeonhole principle as an axiom schema. His proof utilizes nonstandard model theory and is nonconstructive. We improve Ajtai's lower bound from barely superpolynomial to exponential, and eliminate the nonstandard model theory. Our lower bound is also related to the inherent complexity of particular search classes. In particular, oracle separations between the complexity classes PPA and PPAD and between PPA and PPP follow from our techniques.<>
匹配原理和鸽子洞原理之间的指数分离
组合匹配原则指出,在奇数个顶点上不存在完美匹配。这一原理推广了鸽子洞原理,鸽子洞原理指出,对于顶点的固定双分割,它们之间没有完美的匹配。因此,从鸽子洞原理最近的下界可以得出,匹配原理需要指数大小的有界深度Frege证明。M. Ajtai(1990)先前表明,即使将鸽子洞原理作为公理模式,匹配原理也没有多项式大小的有界深度Frege证明。他的证明利用了非标准模型理论,是非建设性的。我们将Ajtai的下界由勉强超多项式改进为指数,并消除了非标准模型理论。我们的下界也与特定搜索类的内在复杂性有关。特别是,我们的技术将复杂性类PPA和PPAD以及PPA和PPP之间的oracle分离。
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