Onsager's Conjecture for the Incompressible Euler Equations in the H\"olog Spaces C0,αλ()

Abstract

In this note we extend a 2018 result of Bardos and Titi BT to a new class of functional spaces C0,αλ(). It is shown that weak solutions \,u\, satisfy the energy equality provided that u∈ L3((0,T);C0,αλ()) with α≥13 and λ>0. The result is new for \,α = \,13\,. Actually, a quite stronger result holds. For convenience we start by a similar extension of a 1994 result of Constantin, E, and Titi, CET, in the space periodic case. The proofs follow step by step those of the above authors. For the readers convenience, and completeness, proofs are presented in a quite complete form.