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Literature DB >> 12689263

Superpolynomial growth in the number of attractors in Kauffman networks.

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.

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Year: 2003 PMID： 12689263 DOI： 10.1103/PhysRevLett.90.098701

Source DB: PubMed Journal: Phys Rev Lett ISSN： 0031-9007 Impact factor: 9.161

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Cited

19 in total

1. Genetic networks with canalyzing Boolean rules are always stable.

Authors: Stuart Kauffman; Carsten Peterson; Björn Samuelsson; Carl Troein
Journal: Proc Natl Acad Sci U S A Date: 2004-11-30 Impact factor: 11.205

2. Algorithms for finding small attractors in Boolean networks.

Authors: Shu-Qin Zhang; Morihiro Hayashida; Tatsuya Akutsu; Wai-Ki Ching; Michael K Ng
Journal: EURASIP J Bioinform Syst Biol Date: 2007

3. Algorithms and complexity analyses for control of singleton attractors in Boolean networks.

Authors: Morihiro Hayashida; Takeyuki Tamura; Tatsuya Akutsu; Shu-Qin Zhang; Wai-Ki Ching
Journal: EURASIP J Bioinform Syst Biol Date: 2008

4. Attractor-Based Obstructions to Growth in Homogeneous Cyclic Boolean Automata.

Authors: Bilal Khan; Yuri Cantor; Kirk Dombrowski
Journal: J Comput Sci Syst Biol Date: 2015-11-04

5. Robustness in regulatory interaction networks. A generic approach with applications at different levels: physiologic, metabolic and genetic.

Authors: Jacques Demongeot; Hedi Ben Amor; Adrien Elena; Pierre Gillois; Mathilde Noual; Sylvain Sené
Journal: Int J Mol Sci Date: 2009-11-20 Impact factor: 6.208

Superpolynomial growth in the number of attractors in Kauffman networks.

1. Genetic networks with canalyzing Boolean rules are always stable.

2. Algorithms for finding small attractors in Boolean networks.

3. Algorithms and complexity analyses for control of singleton attractors in Boolean networks.

4. Attractor-Based Obstructions to Growth in Homogeneous Cyclic Boolean Automata.

5. Robustness in regulatory interaction networks. A generic approach with applications at different levels: physiologic, metabolic and genetic.

6. Integer programming-based method for observability of singleton attractors in Boolean networks.

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9. Boolean networks as modeling framework.

10. Network class superposition analyses.