Well-Posedness for the Euler Equations in Function Spaces of Generalized Smoothness

Abstract

We consider the question of well-posedness for the incompressible Euler equations in generalized function spaces of the type Bs,p,q(Rd) and Fs,p,q(Rd) where is a slowly varying function in the Karamata sense and s=d/p+1. We prove that if grows fast enough, then there is a local in time solution to the Euler equations. We also establish a BKM-type criterion that allows us to obtain global existence in two dimensions.

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