From snapshots to modal expansions – bridging low residuals and pure frequencies
From MaRDI portal
Publication:4976790
DOI10.1017/jfm.2016.416zbMath1462.76094OpenAlexW2492343420MaRDI QIDQ4976790
Publication date: 2 August 2017
Published in: Journal of Fluid Mechanics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1017/jfm.2016.416
Related Items (14)
Impact of POD modes energy redistribution on flow reconstruction for unsteady flows of impulsively started airfoils and wings ⋮ Non-linearly stable reduced-order models for incompressible flow with energy-conserving finite volume methods ⋮ Sparse reduced-order modelling: sensor-based dynamics to full-state estimation ⋮ Real-time reduced-order modeling of stochastic partial differential equations via time-dependent subspaces ⋮ A stabilized POD model for turbulent flows over a range of Reynolds numbers: optimal parameter sampling and constrained projection ⋮ Reduced-order variational mode decomposition to reveal transient and non-stationary dynamics in fluid flows ⋮ Recursive dynamic mode decomposition of transient and post-transient wake flows ⋮ Multi-scale proper orthogonal decomposition of complex fluid flows ⋮ Cluster-based network model ⋮ An observation-driven time-dependent basis for a reduced description of transient stochastic systems ⋮ Low-order model for successive bifurcations of the fluidic pinball ⋮ Metric for attractor overlap ⋮ Adaptive reduced basis method for the reconstruction of unsteady vortex-dominated flows ⋮ Model-Based Adaptive MOR Framework for Unsteady Flows Around Lifting Bodies
Cites Work
- Unnamed Item
- Unnamed Item
- Discovering governing equations from data by sparse identification of nonlinear dynamical systems
- Variants of dynamic mode decomposition: boundary condition, Koopman, and Fourier analyses
- Spectral proper orthogonal decomposition
- Dynamic mode decomposition of numerical and experimental data
- Cluster-based reduced-order modelling of a mixing layer
- Spectral analysis of nonlinear flows
- Continuous Mode Interpolation for Control-Oriented Models of Fluid Flow
- Low-dimensional modelling of high-Reynolds-number shear flows incorporating constraints from the Navier–Stokes equation
- A minimization principle for the description of modes associated with finite-time instabilities
- Centroidal Voronoi Tessellation-Based Reduced-Order Modeling of Complex Systems
This page was built for publication: From snapshots to modal expansions – bridging low residuals and pure frequencies
