In this paper, we propose hybrid data-driven ROM closures for fluid flows. These new ROM closures combine two fundamentally different strategies: (i) purely data-driven ROM closures, both for the velocity and the pressure; and (ii) physically based, eddy viscosity data-driven closures, which model the energy transfer in the system. The first strategy consists in the addition of closure/correction terms to the governing equations, which are built from the available data. The second strategy includes turbulence modeling by adding eddy viscosity terms, which are determined by using machine learning techniques. The two strategies are combined for the first time in this paper to investigate a two-dimensional flow past a circular cylinder at Re=5...
Model order reduction (MOR) has been a field of active research in the past twenty years, more recen...
Generalisability and the consistency of the a posteriori results are the most critical points of vie...
This work presents a novel reduced-order model (ROM) for the incompressible Navier-Stokes equations ...
In this paper, we propose hybrid data-driven ROM closures for fluid flows. These new ROM closures co...
In this paper, we develop data-driven closure/correction terms to increase the pressure and velocity...
For over a century, reduced order models (ROMs) have been a fundamental discipline of theoretical fl...
The Reynolds-averaged Navier-Stokes (RANS) equations offer a computationally efficient way of solvin...
Trajectory-wise data-driven reduced order models (ROMs) tend to be sensitive to training data, and t...
In this paper, we propose a novel reduced order model (ROM) lengthscale that is constructed by using...
Numerical stabilization is often used to eliminate (alleviate) the spurious oscillations generally p...
Reduced-order models (ROMs) are computationally inexpensive simplifications of high-fidelity complex...
Reduced Order Models (ROMs) represent a powerful tool to capture the most important features of a fl...
Reduced Order Models (ROMs) represent a powerful tool to capture the most important features of a fl...
Many real-world physical processes, such as fluid flows and molecular dynamics, are understood well ...
International audienceThis study focuses on stabilizing Reduced Order Model based on Proper Orthogon...
Model order reduction (MOR) has been a field of active research in the past twenty years, more recen...
Generalisability and the consistency of the a posteriori results are the most critical points of vie...
This work presents a novel reduced-order model (ROM) for the incompressible Navier-Stokes equations ...
In this paper, we propose hybrid data-driven ROM closures for fluid flows. These new ROM closures co...
In this paper, we develop data-driven closure/correction terms to increase the pressure and velocity...
For over a century, reduced order models (ROMs) have been a fundamental discipline of theoretical fl...
The Reynolds-averaged Navier-Stokes (RANS) equations offer a computationally efficient way of solvin...
Trajectory-wise data-driven reduced order models (ROMs) tend to be sensitive to training data, and t...
In this paper, we propose a novel reduced order model (ROM) lengthscale that is constructed by using...
Numerical stabilization is often used to eliminate (alleviate) the spurious oscillations generally p...
Reduced-order models (ROMs) are computationally inexpensive simplifications of high-fidelity complex...
Reduced Order Models (ROMs) represent a powerful tool to capture the most important features of a fl...
Reduced Order Models (ROMs) represent a powerful tool to capture the most important features of a fl...
Many real-world physical processes, such as fluid flows and molecular dynamics, are understood well ...
International audienceThis study focuses on stabilizing Reduced Order Model based on Proper Orthogon...
Model order reduction (MOR) has been a field of active research in the past twenty years, more recen...
Generalisability and the consistency of the a posteriori results are the most critical points of vie...
This work presents a novel reduced-order model (ROM) for the incompressible Navier-Stokes equations ...