A New Fully Justified Asymptotic Model for the Propagation of Internal Waves in the Camassa--Holm Regime

Abstract: This study deals with asymptotic models for the propagation of one-dimensional internal waves at the interface between two layers of immiscible fluids of different densities, under the rigid lid assumption and with a flat bottom. We present a new Green-Naghdi type model in the Camassa-Holm (or medium amplitude) regime. This model is fully justified, in the sense that it is consistent, well-posed, and that its solutions remain close to exact solutions of the full Euler system with corresponding initial data. Mo… Show more

“…Many attempts have been made to "regularize" the Green-Naghdi model, that is proposing new models with formally the same precision as the original model, but which are not subject to high-frequency Kelvin-Helmholtz instabilities, even without surface tension [11][12][13][14][15]. The strategies adopted in these works rely on change of unknowns and/or Benjamin-Bona-Mahony type tricks; see [16, section 5.2] for a thorough presentation of such methods in the free-surface setting.…”

A New Class of Two‐Layer Green–Naghdi Systems with Improved Frequency Dispersion

“…Many attempts have been made to "regularize" the Green-Naghdi model, that is proposing new models with formally the same precision as the original model, but which are not subject to high-frequency Kelvin-Helmholtz instabilities, even without surface tension [11][12][13][14][15]. The strategies adopted in these works rely on change of unknowns and/or Benjamin-Bona-Mahony type tricks; see [16, section 5.2] for a thorough presentation of such methods in the free-surface setting.…”

A New Class of Two‐Layer Green–Naghdi Systems with Improved Frequency Dispersion

“…We note that, in the terminology of some authors, our long-time existence results [2] together with the work presented here are in fact consistency, existence, convergence results for the nonlocal bidirectional approximations of the nonlocal equation (1). We refer to [3][4][5][6][7] and the references therein for a detailed discussion of these concepts.…”

“…for some c 1 , c 2 > 0. The condition (7) implies that the convolution operator is invertible. On the other hand, (7) lacks the regularization effect of (6) for r ≥ 2.…”

“…The computation in [2] shows that the optimal values of D and P are approximately 7.35 and 55.34, respectively. Throughout this work we will assume that the kernel β(x) is an even function with β(x)dx = 1 and satisfies (7).…”

“…where k(ξ) = β(ξ) and F −1 denotes the inverse Fourier transform. We note that K 2 w = β * w and, by (7), K is an invertible bounded operator on H s . We then convert (5) to…”

Comparison of nonlocal nonlinear wave equations in the long-wave limit

A Numerical Scheme for the Propagation of Internal Waves in an Oceanographic Model