A comparative study of two stochastic mode reduction methods
From MaRDI portal
Publication:2492255
DOI10.1016/j.physd.2005.11.010zbMath1110.34035arXivmath/0509028OpenAlexW1975553250MaRDI QIDQ2492255
Publication date: 9 June 2006
Published in: Physica D (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/math/0509028
Applications of stochastic analysis (to PDEs, etc.) (60H30) Ordinary differential equations and systems with randomness (34F05) Singular perturbations for ordinary differential equations (34E15) Multiple scale methods for ordinary differential equations (34E13)
Related Items (5)
On the estimation of the Mori-Zwanzig memory integral ⋮ Data-driven non-Markovian closure models ⋮ Generalized Langevin equations for systems with local interactions ⋮ Faber approximation of the Mori-Zwanzig equation ⋮ Transitions in stochastic non-equilibrium systems: efficient reduction and analysis
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Fast chaos versus white noise: Entropy analysis and a Fokker-Planck model for the slow dynamics
- Semigroups of conditioned shifts and approximation of Markov processes
- Some probabilistic problems and methods in singular perturbations
- Identification of almost invariant aggregates in reversible nearly uncoupled Markov chains
- Optimal prediction with memory
- A priori tests of a stochastic mode reduction strategy
- The first and second fluid approximation to the linearized Boltzmann equation
- A limit theorem for perturbed operator semigroups with applications to random evolutions
- Optimal prediction of underresolved dynamics
- Models for stochastic climate prediction
- Optimal prediction and the Mori–Zwanzig representation of irreversible processes
- Remarkable statistical behavior for truncated Burgers–Hopf dynamics
- Extracting macroscopic dynamics: model problems and algorithms
- Stochastic Optimal Prediction for the Kuramoto--Sivashinsky Equation
- Asymptotic theory of mixing stochastic ordinary differential equations
- A mathematical framework for stochastic climate models
- LONG-TERM BEHAVIOUR OF LARGE MECHANICAL SYSTEMS WITH RANDOM INITIAL DATA
- Transport, Collective Motion, and Brownian Motion
- A limit theorem with strong mixing in banach space and two applications to stochastic differential equations
- Averaging methods in nonlinear dynamical systems
This page was built for publication: A comparative study of two stochastic mode reduction methods
