Modelling and Scientific Computing, Mathematics Institute of Computational Science and Engineering-MATHICSE, Ecole Polytechnique Fédérale de Lausanne-EPFL, Station 8, CH-1015 Lausanne, Switzerland.
Int J Numer Method Biomed Eng. 2013 Jun;29(6):698-721. doi: 10.1002/cnm.2554. Epub 2013 May 7.
This work aims at identifying and quantifying uncertainties from various sources in human cardiovascular system based on stochastic simulation of a one-dimensional arterial network. A general analysis of different uncertainties and probability characterization with log-normal distribution of these uncertainties is introduced. Deriving from a deterministic one-dimensional fluid-structure interaction model, we establish the stochastic model as a coupled hyperbolic system incorporated with parametric uncertainties to describe the blood flow and pressure wave propagation in the arterial network. By applying a stochastic collocation method with sparse grid technique, we study systemically the statistics and sensitivity of the solution with respect to many different uncertainties in a relatively complete arterial network with potential physiological and pathological implications for the first time.
本工作旨在基于一维动脉网络的随机模拟,识别和量化人体心血管系统中来自不同来源的不确定性。本文介绍了对不同不确定性的一般分析以及这些不确定性的对数正态分布的概率特征。从确定性的一维流固耦合模型出发,我们建立了包含参数不确定性的随机模型,以描述动脉网络中的血流和压力波传播。通过应用随机配置方法和稀疏网格技术,我们首次系统地研究了具有潜在生理和病理意义的相对完整的动脉网络中,许多不同不确定性对解的统计和敏感性的影响。
