Full double H\"older regularity of the pressure in bounded domains

Abstract

We consider H\"older continuous weak solutions u∈ Cγ(), u· n|∂ =0, of the incompressible Euler equations on a bounded and simply connected domain ⊂Rd. If is of class C2,1 then the corresponding pressure satisfies p∈ C2γ*() in the case γ∈ (0,12], where C2γ* is the H\"older-Zygmund space, which coincides with the usual H\"older space for γ<12. This result, together with our previous one in [11] covering the case γ∈(12,1), yields the full double regularity of the pressure on bounded and sufficiently regular domains. The interior regularity comes from the corresponding C2γ* estimate for the pressure on the whole space Rd, which in particular extends and improves the known double regularity results (in the absence of a boundary) in the borderline case γ=12. The boundary regularity features the use of local normal geodesic coordinates, pseudodifferential calculus and a fine Littlewood-Paley analysis of the modified equation in the new coordinate system. We also discuss the relation between different notions of weak solutions, a step which plays a major role in our approach.