Studies of the Dynamics of Critical Random Boolean Networks Using Relevant Element Loops(General)
スポンサーリンク
概要
- 論文の詳細を見る
Our investigations focus on the various features of relevant element loops that have one element with two inputs. Such networks occur as relevant components of critical K = 2 random Boolean networks. We have found many interesting results. Of them, one rather important outcome is that the mean number of attractors of the relevant element loops increases exponentially with the system size, yet the mean length of attractors increases at a power-law rate with the system size, but not faster than any power law.
- 社団法人日本物理学会の論文
- 2007-12-15
著者
-
Wang Shu-chin
Department Of Physics National Changhua University Of Education
-
Li Ping-cheng
Department Of Physics National Chung-hsing University
-
CHEN Shan-Tarng
Department of Physics, National Chung-Hsing University
-
TSENG Hsen-Che
Department of Physics, National Chung-Hsing University
-
Tseng Hsen-che
Department Of Physics National Chung-hsing University
-
Chen Shan-tarng
Department Of Physics National Chung-hsing University
関連論文
- Investigation of the Dynamics of Critical k=2 Kauffman Networks Using Second-Order Loops(General)
- Studies of the Dynamics of Critical Random Boolean Networks Using Relevant Element Loops(General)
- Entropic Transport from a Discrete Standpoint