T. Pitassi, Benjamin Rossman, R. Servedio, Li-Yang Tan
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引用次数: 23
摘要
我们证明了对n个变量上的某个线性大小的不可满足3-CNF公式的任何多项式大小的Frege反驳必须具有深度Ω(√logn)。与之前的最佳结果(Pitassi et al. 1993, Krajíček et al. 1995, Ben-Sasson 2002)相比,这是一个指数级的改进,后者给出了Ω(对数)下界。我们用来建立这一结果的3-CNF公式是3正则展开图上的tseittin矛盾。更详细地说,我们的主要结果是证明对于每一个d,在这些n节点图上对tseittin矛盾的任何深度d Frege反驳必须具有nΩ((logn)/d2)的大小。我们方法的一个关键组成部分是一个新的开关引理,用于在这些展开式上精心设计的随机限制过程。这些随机限制将一个3-正则n节点展开器上的tseittin实例减少到一个随机子图上的tseittin实例,该子图是一个3-正则n '节点展开器的拓扑嵌入,对于一些n '并不比n小太多。我们的结果涉及这种类型的随机限制的Ω(√logn)迭代应用。
Poly-logarithmic Frege depth lower bounds via an expander switching lemma
We show that any polynomial-size Frege refutation of a certain linear-size unsatisfiable 3-CNF formula over n variables must have depth Ω(√logn). This is an exponential improvement over the previous best results (Pitassi et al. 1993, Krajíček et al. 1995, Ben-Sasson 2002) which give Ω(loglogn) lower bounds. The 3-CNF formulas which we use to establish this result are Tseitin contradictions on 3-regular expander graphs. In more detail, our main result is a proof that for every d, any depth-d Frege refutation of the Tseitin contradiction over these n-node graphs must have size nΩ((logn)/d2). A key ingredient of our approach is a new switching lemma for a carefully designed random restriction process over these expanders. These random restrictions reduce a Tseitin instance on a 3-regular n-node expander to a Tseitin instance on a random subgraph which is a topological embedding of a 3-regular n′-node expander, for some n′ which is not too much less than n. Our result involves Ω(√logn) iterative applications of this type of random restriction.
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