考夫曼网络中吸引子数量的超多项式增长。

Superpolynomial growth in the number of attractors in Kauffman networks.

作者信息

Samuelsson Björn, Troein Carl

机构信息

Complex Systems Division, Department of Theoretical Physics, Lund University, Sölvegatan 14A, S-223 62 Lund, Sweden.

出版信息

Phys Rev Lett. 2003 Mar 7;90(9):098701. doi: 10.1103/PhysRevLett.90.098701. Epub 2003 Mar 4.

DOI:10.1103/PhysRevLett.90.098701

PMID:12689263

Abstract

The Kauffman model describes a particularly simple class of random Boolean networks. Despite the simplicity of the model, it exhibits complex behavior and has been suggested as a model for real world network problems. We introduce a novel approach to analyzing attractors in random Boolean networks, and applying it to Kauffman networks we prove that the average number of attractors grows faster than any power law with system size.

摘要

考夫曼模型描述了一类特别简单的随机布尔网络。尽管该模型很简单，但它表现出复杂的行为，并且已被建议作为现实世界网络问题的模型。我们引入了一种分析随机布尔网络中吸引子的新方法，并将其应用于考夫曼网络，我们证明吸引子的平均数量随系统规模的增长速度比任何幂律都要快。

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考夫曼网络中吸引子数量的超多项式增长。

Superpolynomial growth in the number of attractors in Kauffman networks.

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