Optimal perturbations for controlling the growth of a Rayleigh–Taylor instability
From MaRDI portal
Publication:5229943
DOI10.1017/jfm.2019.532zbMath1419.76224OpenAlexW2965064804MaRDI QIDQ5229943
Publication date: 19 August 2019
Published in: Journal of Fluid Mechanics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1017/jfm.2019.532
Variational methods applied to problems in fluid mechanics (76M30) Direct numerical and large eddy simulation of turbulence (76F65) Interfacial stability and instability in hydrodynamic stability (76E17)
Related Items (8)
An optimization method for chaotic turbulent flow ⋮ Adaptive energy stable artificial dissipation for preserving scalar boundedness in turbulent flows ⋮ A robust, discrete-gradient descent procedure for optimisation with time-dependent PDE and norm constraints ⋮ Turbulent mixing in the vertical magnetic Rayleigh–Taylor instability ⋮ Analytical model of nonlinear evolution of single-mode Rayleigh–Taylor instability in cylindrical geometry ⋮ An adjoint method for control of liquid-gas flows using a sharp interface model ⋮ Kinetic energy and enstrophy transfer in compressible Rayleigh–Taylor turbulence ⋮ Parallel-in-time adjoint-based optimization -- application to unsteady incompressible flows
Uses Software
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Accuracy of the simultaneous-approximation-term boundary condition for time-dependent problems
- Stable and accurate artificial dissipation
- A practical discrete-adjoint method for high-fidelity compressible turbulence simulations
- 3D simulations to investigate initial condition effects on the growth of Rayleigh-Taylor mixing
- A stable high-order finite difference scheme for the compressible Navier-Stokes equations: No-slip wall boundary conditions
- An overview of Rayleigh-Taylor instability
- Summation by parts for finite difference approximations for \(d/dx\)
- Time-stable boundary conditions for finite-difference schemes solving hyperbolic systems: Methodology and application to high-order compact schemes
- Control of mixing by boundary feedback in 2D channel flow.
- Comprehensive numerical methodology for direct numerical simulations of compressible Rayleigh-Taylor instability
- Transition stages of Rayleigh–Taylor instability between miscible fluids
- Saturated Rayleigh–Taylor instability of an oscillating Couette film flow
- Self-sustained hydrodynamic oscillations in lifted jet diffusion flames: origin and control
- The effects of forced small-wavelength, finite-bandwidth initial perturbations and miscibility on the turbulent Rayleigh–Taylor instability
- On the control and suppression of the Rayleigh-Taylor instability using electric fields
- Numerical simulations of two-fluid turbulent mixing at large density ratios and applications to the Rayleigh–Taylor instability
- Using multiscale norms to quantify mixing and transport
- Compressibility effects on the Rayleigh–Taylor instability growth between immiscible fluids
- A comparative study of the turbulent Rayleigh–Taylor instability using high-resolution three-dimensional numerical simulations: The Alpha-Group collaboration
- Control of stretching rate in time-periodic chaotic flows
- Application of monotone integrated large eddy simulation to Rayleigh–Taylor mixing
- Nonlinear saturation of Rayleigh–Taylor instability in thin films
- Effects of Diffusion on Interface Instability between Gases
- Proposed Inflow/Outflow Boundary Condition for Direct Computation of Aerodynamic Sound
- Turbulent Combustion
- Optimal mixing in three-dimensional plane Poiseuille flow at high Péclet number
- New solutions for capillary waves on fluid sheets
- Potential flow models of Rayleigh–Taylor and Richtmyer–Meshkov bubble fronts
- Optimal mixing in two-dimensional plane Poiseuille flow at finite Péclet number
- Optimal perturbations in time-dependent variable-density Kelvin–Helmholtz billows
- Adjoint-based sensitivity and ignition threshold mapping in a turbulent mixing layer
- Adjoint-based sensitivity analysis of flames
- The drag-adjoint field of a circular cylinder wake at Reynolds numbers 20, 100 and 500
- Enthalpy diffusion in multicomponent flows
- A noise-controlled free shear flow
- LARGE-EDDY SIMULATION OF TURBULENT COMBUSTION
- A numerical study of the influence of initial perturbations on the turbulent Rayleigh–Taylor instability
This page was built for publication: Optimal perturbations for controlling the growth of a Rayleigh–Taylor instability
