Repository: Freie Universität Berlin, Math Department

Derivation of a generalized quasi-geostrophic approximation for inviscid ows in a channel domain: The fast waves correction

Bardos, Claude and Liu, Xin and Titi, Edriss (2023) Derivation of a generalized quasi-geostrophic approximation for inviscid ows in a channel domain: The fast waves correction. pp. 1-33. (Unpublished)

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Abstract

This paper is devoted to investigating the rotating Boussinesq equations of inviscid, incompressible ows with both fast Rossby waves and fast internal gravity waves. The main objective is to establish a rigorous derivation and justi�cation of a new generalized quasi-geostrophic approximation in a channel domain with no normal ow at the upper and lower solid boundaries, taking into account the resonance terms due to the fast and slow waves interactions. Under these circumstances, We are able to obtain uniform estimates and compactness without the requirement of either well-prepared initial data (as in [10]) or domain with no boundary (as in [17]). In particular, the nonlinear resonances and the new limit system, which takes into account the fast waves correction to the slow waves dynamics, are also identi�ed without introducing Fourier series expansion. The key ingredient includes the introduction of (full) generalized potential vorticity.

Item Type:Article
Divisions:Department of Mathematics and Computer Science > Institute of Mathematics
ID Code:2939
Deposited By: Monika Drueck
Deposited On:17 Apr 2023 09:57
Last Modified:17 Apr 2023 09:57

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