绝对浓度稳健性代数与几何

IF 0.6 4区数学 Q4 COMPUTER SCIENCE, THEORY & METHODS

Journal of Symbolic Computation Pub Date : 2024-10-30 DOI:10.1016/j.jsc.2024.102398

Luis David García Puente , Elizabeth Gross , Heather A. Harrington , Matthew Johnston , Nicolette Meshkat , Mercedes Pérez Millán , Anne Shiu

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引用次数: 0

摘要

受生物系统如何在不断变化的环境中保持平衡这一问题的启发，Shinar 和 Feinberg 于 2010 年提出了绝对浓度稳健性（ACR）的概念。如果一个生化系统中某些物种的稳态值不依赖于初始条件，那么该物种就会表现出 ACR。因此，即使初始条件发生变化，具有 ACR 的系统也能保持某一物种的恒定水平。尽管近年来人们对 ACR 产生了浓厚的兴趣，但以下基本问题仍然悬而未决：我们如何才能快速确定一个特定的生化系统是否具有 ACR？尽管已经提出了解决这一问题的各种方法，但我们发现这些方法并不全面。因此，我们提出了利用计算代数来判断 ACR 的新方法。我们将在几个生化信号网络中说明我们的结果。

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Absolute concentration robustness: Algebra and geometry

Motivated by the question of how biological systems maintain homeostasis in changing environments, Shinar and Feinberg introduced in 2010 the concept of absolute concentration robustness (ACR). A biochemical system exhibits ACR in some species if the steady-state value of that species does not depend on initial conditions. Thus, a system with ACR can maintain a constant level of one species even as the initial condition changes. Despite a great deal of interest in ACR in recent years, the following basic question remains open: How can we determine quickly whether a given biochemical system has ACR? Although various approaches to this problem have been proposed, we show that they are incomplete. Accordingly, we present new methods for deciding ACR, which harness computational algebra. We illustrate our results on several biochemical signaling networks.

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来源期刊

Journal of Symbolic Computation 工程技术-计算机：理论方法

CiteScore

2.10

自引率

14.30%

发文量

审稿时长

142 days

期刊介绍： An international journal, the Journal of Symbolic Computation, founded by Bruno Buchberger in 1985, is directed to mathematicians and computer scientists who have a particular interest in symbolic computation. The journal provides a forum for research in the algorithmic treatment of all types of symbolic objects: objects in formal languages (terms, formulas, programs); algebraic objects (elements in basic number domains, polynomials, residue classes, etc.); and geometrical objects. It is the explicit goal of the journal to promote the integration of symbolic computation by establishing one common avenue of communication for researchers working in the different subareas. It is also important that the algorithmic achievements of these areas should be made available to the human problem-solver in integrated software systems for symbolic computation. To help this integration, the journal publishes invited tutorial surveys as well as Applications Letters and System Descriptions.