University of Kassel, Institute of Physics , Theoretical Physics II , Heinrich-Plett-Str. 40 , 34132 Kassel , Germany.
Zuse Institute Berlin (ZIB) , Takustraße 7 , 14195 Berlin , Germany.
J Chem Theory Comput. 2018 Jul 10;14(7):3579-3594. doi: 10.1021/acs.jctc.8b00079. Epub 2018 Jun 15.
Markov state models (MSMs) have received an unabated increase in popularity in recent years, as they are very well suited for the identification and analysis of metastable states and related kinetics. However, the state-of-the-art Markov state modeling methods and tools enforce the fulfillment of a detailed balance condition, restricting their applicability to equilibrium MSMs. To date, they are unsuitable to deal with general dominant data structures including cyclic processes, which are essentially associated with nonequilibrium systems. To overcome this limitation, we developed a generalization of the common robust Perron Cluster Cluster Analysis (PCCA+) method, termed generalized PCCA (G-PCCA). This method handles equilibrium and nonequilibrium simulation data, utilizing Schur vectors instead of eigenvectors. G-PCCA is not limited to the detection of metastable states but enables the identification of dominant structures in a general sense, unraveling cyclic processes. This is exemplified by application of G-PCCA on nonequilibrium molecular dynamics data of the Amyloid β (1-40) peptide, periodically driven by an oscillating electric field.
马尔可夫状态模型(MSMs)近年来越来越受欢迎,因为它们非常适合识别和分析亚稳态和相关动力学。然而,最先进的马尔可夫状态建模方法和工具都强制满足详细平衡条件,这限制了它们在平衡 MSM 中的适用性。迄今为止,它们不适用于处理包括循环过程在内的一般主导数据结构,而循环过程本质上与非平衡系统相关。为了克服这一限制,我们开发了一种常用的鲁棒 Perron 聚类聚类分析(PCCA+)方法的推广,称为广义 PCCA(G-PCCA)。该方法可以处理平衡和非平衡模拟数据,使用 Schur 向量而不是特征向量。G-PCCA 不仅限于检测亚稳态,而且可以从一般意义上识别主导结构,揭示循环过程。这可以通过应用 G-PCCA 对周期性受振荡电场驱动的淀粉样蛋白β(1-40)肽的非平衡分子动力学数据来举例说明。
