Polynomial chaos expansions (PCE) have proven efficiency in a number of fields for propagating parametric uncertainties through computational models of complex systems, namely structural and fluid mechanics, chemical reactions and electromagnetism, etc. For problems involving oscillatory, time-dependent output quantities of interest, it is well-known that reasonable accuracy of PCE-based approaches is difficult to reach in the long term. In this paper, we propose a fully non-intrusive approach based on stochastic time warping to address this issue: each realization (trajectory) of the model response is first rescaled to its own time scale so as to put all sampled trajectories in phase in a common virtual timeline. Principal component analys...
Performing uncertainty quantification for engineering systems typically requires a large number of e...
We use concepts from chaos theory in order to model nonlinear dynamical systems that exhibit determi...
Modelling real life stochastic phenomena is difficult due to heterogeneity in associated parameters ...
ABSTRACT: Uncertainty quantification is the state-of-the-art framework dealing with uncertainties ar...
Uncertainty quantification is the state-of-the-art framework dealing with uncertainties arising in a...
Frequency Response Functions (FRFs) are important for assessing the behavior of stochastic linear dy...
This paper introduces a fast stochastic surrogate modeling technique for the frequency-domain respon...
Sparse polynomial chaos expansions (PCE) are a popular surrogate modelling method that takes advanta...
Uncertainty quantification seeks to provide a quantitative means to understand complex systems that ...
ABSTRACT: Sparse polynomial chaos expansions have recently emerged in uncertainty quantification ana...
This paper deals with the analysis of the dynamic behavior of nonlinear systems subject to probabili...
In surrogate modeling, polynomial chaos expansion (PCE) is popularly utilized to represent the rando...
Characterizing the time-domain response of a random multiple-degree-of-freedom dynamical system is c...
Stochastic simulators are computational models that produce different results when evaluated repeate...
Complex computational models are used nowadays in all fields of applied sciences to predict the beha...
Performing uncertainty quantification for engineering systems typically requires a large number of e...
We use concepts from chaos theory in order to model nonlinear dynamical systems that exhibit determi...
Modelling real life stochastic phenomena is difficult due to heterogeneity in associated parameters ...
ABSTRACT: Uncertainty quantification is the state-of-the-art framework dealing with uncertainties ar...
Uncertainty quantification is the state-of-the-art framework dealing with uncertainties arising in a...
Frequency Response Functions (FRFs) are important for assessing the behavior of stochastic linear dy...
This paper introduces a fast stochastic surrogate modeling technique for the frequency-domain respon...
Sparse polynomial chaos expansions (PCE) are a popular surrogate modelling method that takes advanta...
Uncertainty quantification seeks to provide a quantitative means to understand complex systems that ...
ABSTRACT: Sparse polynomial chaos expansions have recently emerged in uncertainty quantification ana...
This paper deals with the analysis of the dynamic behavior of nonlinear systems subject to probabili...
In surrogate modeling, polynomial chaos expansion (PCE) is popularly utilized to represent the rando...
Characterizing the time-domain response of a random multiple-degree-of-freedom dynamical system is c...
Stochastic simulators are computational models that produce different results when evaluated repeate...
Complex computational models are used nowadays in all fields of applied sciences to predict the beha...
Performing uncertainty quantification for engineering systems typically requires a large number of e...
We use concepts from chaos theory in order to model nonlinear dynamical systems that exhibit determi...
Modelling real life stochastic phenomena is difficult due to heterogeneity in associated parameters ...