Approximating the unsatisfiability threshold of random formulas

Random Struct. Algorithms Pub Date : 1998-05-01 DOI:10.1002/(SICI)1098-2418(199805)12:3%3C253::AID-RSA3%3E3.0.CO;2-U

L. Kirousis, E. Kranakis, D. Krizanc, Y. Stamatiou

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引用次数: 201

Abstract

Let f be a random Boolean formula that is an instance of 3-SAT. We consider the problem of computing the least real number k such that if the ratio of the number of clauses over the number of variables of f strictly exceeds k , then f is almost certainly unsatisfiable. By a well-known and more or less straightforward argument, it can be shown that kF5.191. This upper bound was improved by Kamath et al. to 4.758 by first providing new improved bounds for the occupancy problem. There is strong experimental evidence that the value of k is around 4.2. In this work, we define, in terms of the random formula f, a decreasing sequence of random variables such that, if the expected value of any one of them converges to zero, then f is almost certainly unsatisfiable. By letting the expected value of the first term of the sequence converge to zero, we obtain, by simple and elementary computations, an upper bound for k equal to 4.667. From the expected value of the second term of the sequence, we get the value 4.601q . In general, by letting the U This work was performed while the first author was visiting the School of Computer Science, Carleton Ž University, and was partially supported by NSERC Natural Sciences and Engineering Research Council . of Canada , and by a grant from the University of Patras for sabbatical leaves. The second and third Ž authors were supported in part by grants from NSERC Natural Sciences and Engineering Research . Council of Canada . During the last stages of this research, the first and last authors were also partially Ž . supported by EU ESPRIT Long-Term Research Project ALCOM-IT Project No. 20244 . †An extended abstract of this paper was published in the Proceedings of the Fourth Annual European Ž Symposium on Algorithms, ESA’96, September 25]27, 1996, Barcelona, Spain Springer-Verlag, LNCS, . pp. 27]38 . That extended abstract was coauthored by the first three authors of the present paper. Correspondence to: L. M. Kirousis Q 1998 John Wiley & Sons, Inc. CCC 1042-9832r98r030253-17 253

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随机公式不满意阈值的逼近

设f是一个随机布尔公式，它是3-SAT的一个实例。我们考虑计算最小实数k的问题，如果子句数与f的变量数之比严格超过k，则f几乎肯定是不满足的。通过一个众所周知的或多或少直截了当的论证，可以证明kF5.191。Kamath等人首先为占用问题提供了新的改进边界，将该上界改进为4.758。有强有力的实验证据表明，k的值在4.2左右。在这项工作中，我们根据随机公式f定义了一个递减的随机变量序列，如果其中任何一个的期望值收敛于零，那么f几乎肯定是不满足的。通过让序列第一项的期望值收敛于零，通过简单的初等计算，我们得到k的上界等于4.667。从序列第二项的期望值，我们得到值4.601q。这项工作是在第一作者访问卡尔顿Ž大学计算机科学学院期间进行的，并得到了NSERC自然科学与工程研究委员会的部分支持。由加拿大帕特雷大学(University of Patras)授予的公休假。第二和第三位Ž作者得到了NSERC自然科学与工程研究的部分资助。加拿大理事会。在这项研究的最后阶段，第一和最后的作者也部分Ž。欧盟ESPRIT长期研究项目ALCOM-IT项目(20244)资助。†本文的扩展摘要发表在第四届欧洲年会论文集Ž算法研讨会，ESA ' 96, September 25]27, 1996，巴塞罗那，西班牙。[27]该扩展摘要是由本文的前三位作者共同撰写的。致:l.m. Kirousis Q 1998 John Wiley & Sons, Inc。CCC 1042-9832r98r030253-17

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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