一类布尔生物网络可控性测试的多项式时间算法。

Koichi Kobayashi, Jun-Ichi Imura, Kunihiko Hiraishi
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引用次数: 0

摘要

近年来,人们广泛研究了基于布尔网络模型的复杂生物网络(如基因调控网络)动态分析方法。这类网络控制理论的基本问题之一是确定给定物质的量是否可以通过操作其他物质的量来任意控制,我们称之为可控性问题。本文提出了一种多项式时间算法来解决这一问题。虽然该算法基于可控性的充分条件,但与现有方法相比,它对于更多大规模的生物网络都很容易计算。我们的方法之所以成功,关键在于放弃了严格计算布尔运算,而是利用布尔网络诱导的有向图的邻接矩阵。通过将提出的方法应用于神经递质信号通路,证明了它的有效性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

Polynomial-time algorithm for controllability test of a class of boolean biological networks.

Polynomial-time algorithm for controllability test of a class of boolean biological networks.

Polynomial-time algorithm for controllability test of a class of boolean biological networks.

Polynomial-time algorithm for controllability test of a class of boolean biological networks.

In recent years, Boolean-network-model-based approaches to dynamical analysis of complex biological networks such as gene regulatory networks have been extensively studied. One of the fundamental problems in control theory of such networks is the problem of determining whether a given substance quantity can be arbitrarily controlled by operating the other substance quantities, which we call the controllability problem. This paper proposes a polynomial-time algorithm for solving this problem. Although the algorithm is based on a sufficient condition for controllability, it is easily computable for a wider class of large-scale biological networks compared with the existing approaches. A key to this success in our approach is to give up computing Boolean operations in a rigorous way and to exploit an adjacency matrix of a directed graph induced by a Boolean network. By applying the proposed approach to a neurotransmitter signaling pathway, it is shown that it is effective.

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