Global Strong Well-posedness of the Three Dimensional Primitive equations in Lp-spaces

Abstract

In this article, an Lp-approach to the primitive equations is developed. In particular, it is shown that the three dimensional primitive equations admit a unique, global strong solution for all initial data a ∈ [Xp,D(Ap)]1/p provided p ∈ [6/5,∞). To this end, the hydrostatic Stokes operator Ap defined on Xp, the subspace of Lp associated with the hydrostatic Helmholtz projection, is introduced and investigated. Choosing p large, one obtains global well-posedness of the primitive equations for strong solutions for initial data a having less differentiability properties than H1, hereby generalizing in particular a result by Cao and Titi (Ann. Math. 166 (2007), pp. 245-267) to the case of non-smooth initial data.