Department of Fisheries, Wildlife and Conservation Biology, University of Minnesota, St. Paul, Minnesota, 55108, USA.
Wetland Wildlife Populations and Research Group, Minnesota Department of Natural Resources, Bemidji, Minnesota, 56601, USA.
Ecol Appl. 2018 Mar;28(2):309-322. doi: 10.1002/eap.1645. Epub 2018 Jan 19.
Ecosystems sometimes undergo dramatic shifts between contrasting regimes. Shallow lakes, for instance, can transition between two alternative stable states: a clear state dominated by submerged aquatic vegetation and a turbid state dominated by phytoplankton. Theoretical models suggest that critical nutrient thresholds differentiate three lake types: highly resilient clear lakes, lakes that may switch between clear and turbid states following perturbations, and highly resilient turbid lakes. For effective and efficient management of shallow lakes and other systems, managers need tools to identify critical thresholds and state-dependent relationships between driving variables and key system features. Using shallow lakes as a model system for which alternative stable states have been demonstrated, we developed an integrated framework using Bayesian latent variable regression (BLR) to classify lake states, identify critical total phosphorus (TP) thresholds, and estimate steady state relationships between TP and chlorophyll a (chl a) using cross-sectional data. We evaluated the method using data simulated from a stochastic differential equation model and compared its performance to k-means clustering with regression (KMR). We also applied the framework to data comprising 130 shallow lakes. For simulated data sets, BLR had high state classification rates (median/mean accuracy >97%) and accurately estimated TP thresholds and state-dependent TP-chl a relationships. Classification and estimation improved with increasing sample size and decreasing noise levels. Compared to KMR, BLR had higher classification rates and better approximated the TP-chl a steady state relationships and TP thresholds. We fit the BLR model to three different years of empirical shallow lake data, and managers can use the estimated bifurcation diagrams to prioritize lakes for management according to their proximity to thresholds and chance of successful rehabilitation. Our model improves upon previous methods for shallow lakes because it allows classification and regression to occur simultaneously and inform one another, directly estimates TP thresholds and the uncertainty associated with thresholds and state classifications, and enables meaningful constraints to be built into models. The BLR framework is broadly applicable to other ecosystems known to exhibit alternative stable states in which regression can be used to establish relationships between driving variables and state variables.
生态系统有时会在截然不同的状态之间发生剧烈转变。例如,浅水湖泊可以在两种替代稳定状态之间转变:一种是由水下植被主导的清澈状态,另一种是由浮游植物主导的浑浊状态。理论模型表明,关键营养阈值可以将三种湖泊类型区分开来:高度弹性的清澈湖泊、在受到干扰后可能在清澈和浑浊状态之间切换的湖泊,以及高度弹性的浑浊湖泊。为了对浅水湖泊和其他系统进行有效和高效的管理,管理者需要工具来识别关键阈值以及驱动变量与关键系统特征之间的状态相关关系。我们使用浅水湖泊作为已经证明存在替代稳定状态的模型系统,使用贝叶斯潜在变量回归(BLR)开发了一个综合框架,用于对湖泊状态进行分类,确定总磷(TP)的关键阈值,并使用横截面数据估计 TP 与叶绿素 a(chl a)之间的稳定状态关系。我们使用来自随机微分方程模型的模拟数据来评估该方法,并将其性能与带有回归的 K 均值聚类(KMR)进行比较。我们还将该框架应用于包含 130 个浅水湖泊的数据。对于模拟数据集,BLR 的状态分类率较高(中位数/平均值准确率>97%),并且能够准确估计 TP 阈值和状态相关的 TP-chl a 关系。随着样本量的增加和噪声水平的降低,分类和估计效果得到了改善。与 KMR 相比,BLR 的分类率更高,并且更好地逼近了 TP-chl a 稳定状态关系和 TP 阈值。我们将 BLR 模型拟合到三年的经验浅水湖泊数据中,管理者可以使用估计的分岔图根据湖泊接近阈值的程度和成功恢复的机会对湖泊进行优先级排序,以便进行管理。我们的模型改进了以前的浅水湖泊方法,因为它允许分类和回归同时进行,并相互告知,直接估计 TP 阈值以及与阈值和状态分类相关的不确定性,并能够将有意义的约束构建到模型中。BLR 框架广泛适用于已知存在替代稳定状态的其他生态系统,在这些系统中可以使用回归来建立驱动变量和状态变量之间的关系。
