In this study, we investigate how to use sample data, generated by a fully resolved multiscale model, to construct stochastic representations of unresolved scales in reduced models. We explore three methods to model these stochastic representations. They employ empirical distributions, conditional Markov chains, and conditioned Ornstein–Uhlenbeck processes, respectively. The Kac–Zwanzig heat bath model is used as a prototype model to illustrate the methods. We demonstrate that all tested strategies reproduce the dynamics of the resolved model variables accurately. Furthermore, we show that the computational cost of the reduced model is several orders of magnitude lower than that of the fully resolved model
We consider Bayesian inference via Markov chain Monte Carlo for a variety of fractal Gaussian proces...
We present a computational framework based on stochastic expansion methods for the efficient propaga...
Finding coarse-grained, low-dimensional descriptions is an important task in the analysis of complex...
In this study, we investigate how to use sample data, generated by a fully resolved multiscale model...
In simulations of multiscale dynamical systems, not all relevant processes can be resolved explicitl...
This paper presents a probabilistic upscaling of mechanics models. A reduced-order probabilistic mod...
The thesis provides a detailed analysis of the independence structure possessed by multiscale models...
The success of any physical model critically depends upon adopting an appropriate representation for...
AbstractThis paper has two interrelated foci: (i) obtaining stable and efficient data-driven closure...
This paper has two interrelated foci: (i) obtaining stable and efficient data-driven closure models ...
Although the governing equations of many systems, when derived from first principles, may be viewed ...
Recently, a framework for multiscale stochastic modeling was introduced based on coarse-to-fine scal...
Multiscale dynamics are frequently present in real-world processes, such as the atmosphere-ocean and...
We describe a framework for solving nonlinear inverse problems in a random environment. Such problem...
International audienceProviding efficient and accurate parameterizations for model reduction is a ke...
We consider Bayesian inference via Markov chain Monte Carlo for a variety of fractal Gaussian proces...
We present a computational framework based on stochastic expansion methods for the efficient propaga...
Finding coarse-grained, low-dimensional descriptions is an important task in the analysis of complex...
In this study, we investigate how to use sample data, generated by a fully resolved multiscale model...
In simulations of multiscale dynamical systems, not all relevant processes can be resolved explicitl...
This paper presents a probabilistic upscaling of mechanics models. A reduced-order probabilistic mod...
The thesis provides a detailed analysis of the independence structure possessed by multiscale models...
The success of any physical model critically depends upon adopting an appropriate representation for...
AbstractThis paper has two interrelated foci: (i) obtaining stable and efficient data-driven closure...
This paper has two interrelated foci: (i) obtaining stable and efficient data-driven closure models ...
Although the governing equations of many systems, when derived from first principles, may be viewed ...
Recently, a framework for multiscale stochastic modeling was introduced based on coarse-to-fine scal...
Multiscale dynamics are frequently present in real-world processes, such as the atmosphere-ocean and...
We describe a framework for solving nonlinear inverse problems in a random environment. Such problem...
International audienceProviding efficient and accurate parameterizations for model reduction is a ke...
We consider Bayesian inference via Markov chain Monte Carlo for a variety of fractal Gaussian proces...
We present a computational framework based on stochastic expansion methods for the efficient propaga...
Finding coarse-grained, low-dimensional descriptions is an important task in the analysis of complex...