Degeneration of internal Kelvin waves in a continuous two-layer stratification

TitleDegeneration of internal Kelvin waves in a continuous two-layer stratification
Publication TypeJournal Article
Year of Publication2015
AuthorsUlloa HN, Winters KB, de la Fuente A, Niño Y
JournalJournal of Fluid Mechanics
Date Published2015/08
ISBN Number1469-7645
Keywordsstratified flows,transition to turbulence,waves in rotating fluids

We explore the evolution of the gravest internal Kelvin wave in a two-layer rotating cylindrical basin, using direct numerical simulations (DNS) with a hyper-viscosity/diffusion approach to illustrate different dynamic and energetic regimes. The initial condition is derived from Csanady’s (J. Geophys. Res., vol. 72, 1967, pp. 4151–4162) conceptual model, which is adapted by allowing molecular diffusion to smooth the discontinuous idealized solution over a transition scale, δi, taken to be small compared to both layer thicknesses hℓ,ℓ=1,2. The different regimes are obtained by varying the initial wave amplitude, η0, for the same stratification and rotation. Increasing η0 increases both the tendency for wave steepening and the shear in the vicinity of the density interface. We present results across several regimes: from the damped, linear–laminar regime (DLR), for which η0∼δi and the Kelvin wave retains its linear character, to the nonlinear–turbulent transition regime (TR), for which the amplitude η0 approaches the thickness of the (thinner) upper layer h1, and nonlinearity and dispersion become significant, leading to hydrodynamic instabilities at the interface. In the TR, localized turbulent patches are produced by Kelvin wave breaking, i.e. shear and convective instabilities that occur at the front and tail of energetic waves within an internal Rossby radius of deformation from the boundary. The mixing and dissipation associated with the patches are characterized in terms of dimensionless turbulence intensity parameters that quantify the locally elevated dissipation rates of kinetic energy and buoyancy variance.

Short TitleJ. Fluid Mech.
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