We introduce a nonlinear stochastic model reduction technique for high-dimensional stochastic dynamical systems that have a low-dimensional invariant effective manifold with slow dynamics, and high-dimensional, large fast modes. Given only access to a black box simulator from which short bursts of simulation can be obtained, we estimate the invariant manifold, a process of the effective (stochastic) dynamics on it, and construct an efficient simulator thereof. These estimation steps can be performed on-the-fly, leading to efficient exploration of the effective state space, without losing consistency with the underlying dynamics. This construction enables fast and efficient simulation of paths of the effective dynamics, together with estimat...
Fast-slow systems We consider fast-slow systems of the form dX dt = εh(X,Y) + ε2f (X,Y) dY dt = g(Y)...
We prove a stochastic averaging theorem for stochastic differential equations in which the slow and ...
We consider slow-fast systems of differential equations, in which both the slow and fast variables a...
We propose a stochastic model reduction strategy for deterministic and stochastic slow-fast systems ...
We consider stochastic dynamical systems with multiple time scales. An intermediate reduced model is...
Eliminate the fast degrees of freedom in multiscale systems and derive an effective (stochastic) mod...
We consider complex dynamical systems showing metastable behavior but no local separation of fast an...
It has long been known that the excitation of fast motion in certain two-scale dynamical systems is ...
A method is provided for approximating random slow manifolds of a class of slow-fast stochastic dyna...
The thesis at hand focuses on approaches towards model-order reduction for stochastic differential e...
When simulating multiscale stochastic differential equations (SDEs) in high-dimensions, separation o...
The computer algebra routines documented here empower you to reproduce and check many of the details...
Trajectory-wise data-driven reduced order models (ROMs) tend to be sensitive to training data, and t...
The slow-scale linear noise approximation: an accurate, reduced stochastic description of biochemica...
The Fredkin spin chain serves as an interesting theoretical example of a quantum Hamiltonian whose g...
Fast-slow systems We consider fast-slow systems of the form dX dt = εh(X,Y) + ε2f (X,Y) dY dt = g(Y)...
We prove a stochastic averaging theorem for stochastic differential equations in which the slow and ...
We consider slow-fast systems of differential equations, in which both the slow and fast variables a...
We propose a stochastic model reduction strategy for deterministic and stochastic slow-fast systems ...
We consider stochastic dynamical systems with multiple time scales. An intermediate reduced model is...
Eliminate the fast degrees of freedom in multiscale systems and derive an effective (stochastic) mod...
We consider complex dynamical systems showing metastable behavior but no local separation of fast an...
It has long been known that the excitation of fast motion in certain two-scale dynamical systems is ...
A method is provided for approximating random slow manifolds of a class of slow-fast stochastic dyna...
The thesis at hand focuses on approaches towards model-order reduction for stochastic differential e...
When simulating multiscale stochastic differential equations (SDEs) in high-dimensions, separation o...
The computer algebra routines documented here empower you to reproduce and check many of the details...
Trajectory-wise data-driven reduced order models (ROMs) tend to be sensitive to training data, and t...
The slow-scale linear noise approximation: an accurate, reduced stochastic description of biochemica...
The Fredkin spin chain serves as an interesting theoretical example of a quantum Hamiltonian whose g...
Fast-slow systems We consider fast-slow systems of the form dX dt = εh(X,Y) + ε2f (X,Y) dY dt = g(Y)...
We prove a stochastic averaging theorem for stochastic differential equations in which the slow and ...
We consider slow-fast systems of differential equations, in which both the slow and fast variables a...