A method is presented to estimate the region of attraction (ROA) of stochastic systems with finite second moment and uncertainty-dependent equilibria. The approach employs Polynomial Chaos (PC) expansions to represent the stochastic system by a higher-dimensional set of deterministic equations. We first show how the equilibrium point of the deterministic formulation provides the stochastic moments of an uncertainty-dependent equilibrium point of the stochastic system. A connection between the boundedness of the moments of the stochastic system and the Lyapunov stability of its PC expansion is then derived. Defining corresponding notions of a ROA for both system representations, we show how this connection can be leveraged to recover an esti...
International audienceMultidisciplinary analysis (MDA) is nowadays a powerful tool for analysis and ...
peer reviewedWe address the curse of dimensionality in methods for solving stochastic coupled proble...
Polynomial chaos (PC) expansions are used for the propagation of uncertainty through dynamical syste...
We present a general formulation for estimation of the re-gion of attraction (ROA) for nonlinear sys...
Uncertainty quantification seeks to provide a quantitative means to understand complex systems that ...
Estimating the Domain of Attraction (DA) of equilibrium points is a problem of fundamental importanc...
The Region of Attraction of an equilibrium point is the set of initial conditions whose trajectories...
A method is presented to obtain inner estimates of the region of transverse contraction (ROTC) which...
Polynomial Chaos Expansions (PCEs) offer an efficient alternative to assess the statistical properti...
This paper deals with the analysis of the dynamic behavior of nonlinear systems subject to probabili...
Here, we examine the suitability of truncated Polynomial Chaos Expansions (PCE) and truncated Gram-C...
Estimating the Domain of Attraction (DA) of equilibrium points is a problem of fundamental importanc...
A dynamical uncertain system is studied in this paper. Two kinds of uncertainties are addressed, whe...
Inherent physical uncertainties can have a significant influence on computational predictions. It is...
A general framework is presented to estimate the Region of Attraction of attracting equilibrium poin...
International audienceMultidisciplinary analysis (MDA) is nowadays a powerful tool for analysis and ...
peer reviewedWe address the curse of dimensionality in methods for solving stochastic coupled proble...
Polynomial chaos (PC) expansions are used for the propagation of uncertainty through dynamical syste...
We present a general formulation for estimation of the re-gion of attraction (ROA) for nonlinear sys...
Uncertainty quantification seeks to provide a quantitative means to understand complex systems that ...
Estimating the Domain of Attraction (DA) of equilibrium points is a problem of fundamental importanc...
The Region of Attraction of an equilibrium point is the set of initial conditions whose trajectories...
A method is presented to obtain inner estimates of the region of transverse contraction (ROTC) which...
Polynomial Chaos Expansions (PCEs) offer an efficient alternative to assess the statistical properti...
This paper deals with the analysis of the dynamic behavior of nonlinear systems subject to probabili...
Here, we examine the suitability of truncated Polynomial Chaos Expansions (PCE) and truncated Gram-C...
Estimating the Domain of Attraction (DA) of equilibrium points is a problem of fundamental importanc...
A dynamical uncertain system is studied in this paper. Two kinds of uncertainties are addressed, whe...
Inherent physical uncertainties can have a significant influence on computational predictions. It is...
A general framework is presented to estimate the Region of Attraction of attracting equilibrium poin...
International audienceMultidisciplinary analysis (MDA) is nowadays a powerful tool for analysis and ...
peer reviewedWe address the curse of dimensionality in methods for solving stochastic coupled proble...
Polynomial chaos (PC) expansions are used for the propagation of uncertainty through dynamical syste...