Anticipating critical transitions in multidimensional systems driven by time- and state-dependent noise

Andreas Morr, Keno Riechers, Leonardo Rydin Gorjão, Niklas Boers
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Abstract

Anticipating bifurcation-induced transitions in dynamical systems has gained relevance in various fields of the natural, social, and economic sciences. Before the annihilation of a system's equilibrium point by means of a bifurcation, the system's internal feedbacks that stabilize the initial state weaken and eventually vanish, a process referred to as critical slowing down (CSD). In one-dimensional systems, this motivates the use of variance and lag-1 autocorrelation as indicators of CSD. However, the applicability of variance is limited to time- and state-independent driving noise, strongly constraining the generality of this CSD indicator. In multidimensional systems, the use of these indicators is often preceded by a dimension reduction in order to obtain a one-dimensional time series. Many common techniques for such an extraction of a one-dimensional time series generally incur the risk of missing CSD in practice. Here, we propose a data-driven approach based on estimating a multidimensional Langevin equation to detect local stability changes and anticipate bifurcation-induced transitions in systems with generally time- and state-dependent noise. Our approach substantially generalizes the conditions under which CSD can reliably be detected, as demonstrated in a suite of examples. In contrast to existing approaches, changes in deterministic dynamics can be clearly discriminated from changes in the driving noise using our method. This substantially reduces the risk of false or missed alarms of conventional CSD indicators in settings with time-dependent or multiplicative noise. In multidimensional systems, our method can greatly advance the understanding of the coupling between system components and can avoid risks of missing CSD due to dimension reduction, which existing approaches suffer from.

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预测随时间和状态变化的噪声驱动的多维系统中的临界转换
在自然、社会和经济科学的各个领域中,对动态系统中分岔引起的转变进行预测已变得越来越重要。在系统的平衡点通过分岔消失之前,稳定初始状态的系统内部反馈会减弱并最终消失,这一过程被称为临界减速(CSD)。在一维系统中,这促使人们使用方差和滞后-1 自相关性作为 CSD 的指标。然而,方差的适用性仅限于与时间和状态无关的驱动噪声,这极大地限制了这一 CSD 指标的通用性。在多维系统中,使用这些指标之前通常要进行降维处理,以获得一维时间序列。许多用于提取一维时间序列的常用技术在实践中通常会产生遗漏 CSD 的风险。在此,我们提出了一种基于估算多维朗文方程的数据驱动方法,以检测局部稳定性变化,并预测具有一般时间和状态依赖性噪声的系统中由分岔引起的转变。我们的方法大大扩展了可靠检测 CSD 的条件,这一点已在一系列示例中得到证明。与现有方法相比,使用我们的方法可以将确定性动力学变化与驱动噪声变化清晰地区分开来。这大大降低了传统 CSD 指标在随时间变化的噪声或乘法噪声环境中出现误报或漏报的风险。在多维系统中,我们的方法可以极大地促进对系统各组成部分之间耦合关系的理解,并能避免现有方法所存在的因维度降低而导致的 CSD 漏报风险。
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