1. Self-sustained oscillations of complex genomic regulatory networks
- Author
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Ye, Weiming, Huang, Xiaodong, Huang, Xuhui, Li, Pengfei, Xia, Qinzhi, and Hu, Gang
- Subjects
- *
GEOMETRIC analysis , *OSCILLATIONS , *GRAPH theory , *GENERATING functions , *DIMENSIONAL analysis , *TREE graphs - Abstract
Abstract: Recently, self-sustained oscillations in complex networks consisting of non-oscillatory nodes have attracted great interest in diverse natural and social fields. Oscillatory genomic regulatory networks are one of the most typical examples of this kind. Given an oscillatory genomic network, it is important to reveal the central structure generating the oscillation. However, if the network consists of large numbers of genes and interactions, the oscillation generator is deeply hidden in the complicated interactions. We apply the dominant phase-advanced driving path method proposed in Qian et al. (2010) to reduce complex genomic regulatory networks to one-dimensional and unidirectionally linked network graphs where negative regulatory loops are explored to play as the central generators of the oscillations, and oscillation propagation pathways in the complex networks are clearly shown by tree branches radiating from the loops. Based on the above understanding we can control oscillations of genomic networks with high efficiency. [Copyright &y& Elsevier]
- Published
- 2010
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