Litcius/Paper detail

Confinement-induced stabilization of the Rayleigh-Taylor instability and transition to the unconfined limit

Samar Alqatari, Thomas E. Videbæk, Sidney R. Nagel, A. E. Hosoi, Irmgard Bischofberger

2020Science Advances22 citationsDOIOpen Access PDF

Abstract

The prevention of hydrodynamic instabilities can lead to important insights for understanding the instabilities' underlying dynamics. The Rayleigh-Taylor instability that arises when a dense fluid sinks into and displaces a lighter one is particularly difficult to arrest. By preparing a density inversion between two miscible fluids inside the thin gap separating two flat plates, we create a clean initial stationary interface. Under these conditions, we find that the instability is suppressed below a critical plate spacing. With increasing spacing, the system transitions from the limit of stability where mass diffusion dominates over buoyant forces, through a regime where the gap sets the wavelength of the instability, to the unconfined regime governed by the competition between buoyancy and momentum diffusion. Our study, including experiment, simulation, and linear stability analysis, characterizes all three regimes of confinement and opens new routes for controlling mixing processes.

Topics & Concepts

InstabilityBuoyancyRayleigh–Taylor instabilityMechanicsRichtmyer–Meshkov instabilityPhysicsDiffusionMomentum (technical analysis)Mixing (physics)Classical mechanicsThermodynamicsEconomicsQuantum mechanicsFinanceFluid Dynamics and Turbulent FlowsTheoretical and Computational PhysicsLaser-Plasma Interactions and Diagnostics