Regularity in time of H\"older solutions of Euler and hypodissipative Navier-Stokes equations

Abstract

In this work we investigate some regularization properties of the incompressible Euler equations and of the fractional Navier-Stokes equations where the dissipative term is given by (-)α, for a suitable power α ∈ (0,12) (the only meaningful range for this result). Assuming that the solution u ∈ L∞ t(Cθx) for some θ ∈ (0,1) we prove that u ∈ Cθt,x, the pressure p∈ C2θ-t,x and the kinetic energy e ∈ C2θ1-θt. This result was obtained for the Euler equations in [Is13] with completely different arguments and we believe that our proof, based on a regularization and a commutator estimate, gives a simpler insight on the result.