TY - JOUR
T1 - PC analysis of stochastic differential equations driven by Wiener noise
AU - Le Maitre, Olivier
AU - Knio, Omar
N1 - KAUST Repository Item: Exported on 2020-10-01
Acknowledgements: This work was supported by the US Department of Energy (DOE), Office of Science, Office of Advanced Scientific Computing Research, under Award Number DE-SC0008789.
PY - 2015/3
Y1 - 2015/3
N2 - A polynomial chaos (PC) analysis with stochastic expansion coefficients is proposed for stochastic differential equations driven by additive or multiplicative Wiener noise. It is shown that for this setting, a Galerkin formalism naturally leads to the definition of a hierarchy of stochastic differential equations governing the evolution of the PC modes. Under the mild assumption that the Wiener and uncertain parameters can be treated as independent random variables, it is also shown that the Galerkin formalism naturally separates parametric uncertainty and stochastic forcing dependences. This enables us to perform an orthogonal decomposition of the process variance, and consequently identify contributions arising from the uncertainty in parameters, the stochastic forcing, and a coupled term. Insight gained from this decomposition is illustrated in light of implementation to simplified linear and non-linear problems; the case of a stochastic bifurcation is also considered.
AB - A polynomial chaos (PC) analysis with stochastic expansion coefficients is proposed for stochastic differential equations driven by additive or multiplicative Wiener noise. It is shown that for this setting, a Galerkin formalism naturally leads to the definition of a hierarchy of stochastic differential equations governing the evolution of the PC modes. Under the mild assumption that the Wiener and uncertain parameters can be treated as independent random variables, it is also shown that the Galerkin formalism naturally separates parametric uncertainty and stochastic forcing dependences. This enables us to perform an orthogonal decomposition of the process variance, and consequently identify contributions arising from the uncertainty in parameters, the stochastic forcing, and a coupled term. Insight gained from this decomposition is illustrated in light of implementation to simplified linear and non-linear problems; the case of a stochastic bifurcation is also considered.
UR - http://hdl.handle.net/10754/564078
UR - https://linkinghub.elsevier.com/retrieve/pii/S0951832014002749
UR - http://www.scopus.com/inward/record.url?scp=84919941256&partnerID=8YFLogxK
U2 - 10.1016/j.ress.2014.11.002
DO - 10.1016/j.ress.2014.11.002
M3 - Article
SN - 0951-8320
VL - 135
SP - 107
EP - 124
JO - Reliability Engineering & System Safety
JF - Reliability Engineering & System Safety
ER -