Abstract We present a novel kernel-based machine learning algorithm for identifying the low-dimensional geometry of the effective dynamics of high-dimensional multiscale stochastic systems. Recently, the authors developed a mathematical framework for the computation of optimal reaction coordinates of such systems that is based on learning a parameterization of a low-dimensional transition manifold in a certain function space. In this article, we enhance this approach by embedding and learning this transition manifold in a reproducing kernel Hilbert space, exploiting the favorable properties of kernel embeddings. Under mild assumptions on the kernel, the manifold structure is shown to be preserved under the embedding, and distortion...
We present a systematic approach to reduce the dimensionality of a complex molecular system. Startin...
AbstractNonlinear dynamical systems, which include models of the Earth’s climate, financial markets ...
We present a novel method for the identification of the most important metastable states of a system...
We present a novel kernel-based machine learning algorithm for identifying the low-dimensional geome...
We consider complex dynamical systems showing metastable behavior but no local separation of fast an...
We investigate how to learn a kernel matrix for high dimensional data that lies on or near a low dim...
Reaction Coordinates (RCs) are indicators of hidden, low-dimensional mechanisms that govern the lon...
Large scale dynamical systems (e.g. many nonlinear coupled differential equations)can often be summa...
With rapidly expanding volumes of data across all quantitative disciplines, there is a great need fo...
We present a method for optimizing transition state theory dividing surfaces with support vector mac...
In this work we introduce a manifold learning-based method for uncertainty quantification (UQ) in sy...
Reaction coordinates are indicators of hidden, low-dimensional mechanisms that govern the long-term...
Regressing the vector field of a dynamical system from a finite number of observed states is a natur...
We introduce a nonlinear stochastic model reduction technique for high-dimensional stochastic dynami...
We study the Langevin dynamics of a physical system with manifold structure $\mathcal{M}\subset\math...
We present a systematic approach to reduce the dimensionality of a complex molecular system. Startin...
AbstractNonlinear dynamical systems, which include models of the Earth’s climate, financial markets ...
We present a novel method for the identification of the most important metastable states of a system...
We present a novel kernel-based machine learning algorithm for identifying the low-dimensional geome...
We consider complex dynamical systems showing metastable behavior but no local separation of fast an...
We investigate how to learn a kernel matrix for high dimensional data that lies on or near a low dim...
Reaction Coordinates (RCs) are indicators of hidden, low-dimensional mechanisms that govern the lon...
Large scale dynamical systems (e.g. many nonlinear coupled differential equations)can often be summa...
With rapidly expanding volumes of data across all quantitative disciplines, there is a great need fo...
We present a method for optimizing transition state theory dividing surfaces with support vector mac...
In this work we introduce a manifold learning-based method for uncertainty quantification (UQ) in sy...
Reaction coordinates are indicators of hidden, low-dimensional mechanisms that govern the long-term...
Regressing the vector field of a dynamical system from a finite number of observed states is a natur...
We introduce a nonlinear stochastic model reduction technique for high-dimensional stochastic dynami...
We study the Langevin dynamics of a physical system with manifold structure $\mathcal{M}\subset\math...
We present a systematic approach to reduce the dimensionality of a complex molecular system. Startin...
AbstractNonlinear dynamical systems, which include models of the Earth’s climate, financial markets ...
We present a novel method for the identification of the most important metastable states of a system...