On Onsager's type conjecture for the inviscid Boussinesq equations

Abstract

In this paper, we investigate the Cauchy problem for the three dimensional inviscid Boussinesq system in the periodic setting. For 1 p ∞, we show that the threshold regularity exponent for Lp-norm conservation of temperature of this system is 1/3, consistent with Onsager exponent. More precisely, for 1 p∞, every weak solution (v,θ)∈ CtCβx to the inviscid Boussinesq equations satisfies that \|θ(t)\|Lp(T3)=\|θ0\|Lp(T3) if β>13, while if β<13, there exist infinitely many weak solutions (v,θ)∈ CtCβx such that the Lp-norm of temperature is not conserved. As a byproduct, we are able to construct many weak solutions in CtCβx for β<13 displaying wild behavior, such as fast kinetic energy dissipation and high oscillation of velocity. Moreover, we also show that if a weak solution (v, θ) of this system has at least one interval of regularity, then this weak solution (v,θ) is not unique in CtCβx for β<13.