Onsager's conjecture for admissible weak solutions

Abstract

We prove that given any β<1/3, a time interval [0,T], and given any smooth energy profile e [0,T] (0,∞), there exists a weak solution v of the three-dimensional Euler equations such that v ∈ Cβ([0,T]× T3), with e(t) = ∫T3 |v(x,t)|2 dx for all t∈ [0,T]. Moreover, we show that a suitable h-principle holds in the regularity class Cβt,x, for any β<1/3. The implication of this is that the dissipative solutions we construct are in a sense typical in the appropriate space of subsolutions as opposed to just isolated examples.