H\"older continuous weak solutions of the 3D Boussinesq equation with thermal diffusion

Abstract

In this paper, we show the existence of H\"older continuous periodic weak solutions of the 3D Boussinesq equation with thermal diffusion, which apprroximate the Onsager's critical spatial regularity and satisfy the prescribed kinetic energy. More precisely, for any smooth e(t):[0,T]→ R+ and β∈ (0, 13), there exist v∈ Cβ([0,T]× T 3) and θ∈ Ct1,β2Cx2,β([0,T]× T 3) which solve (e:boussinesq equation) in the sense of distribution and satisfy align e(t)=∫T 3|v(t,x)|2dx, ∀ t∈ [0,T]. align