Exponential approximations for the primitive equations of the ocean

Abstract

We show that in the limit of small Rossby number , the primitive equations of the ocean (OPEs) can be approximated by ``higher-order quasi-geostrophic equations'' up to an exponential accuracy in . This approximation assumes well-prepared initial data and is valid for a timescale of order one (independent of ). Our construction uses Gevrey regularity of the OPEs and a classical method to bound errors in higher-order perturbation theory.

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