H\"older continuous weak solution of 2d Boussinesq equation with diffusive temperature
Abstract
We show the existence of H\"older continuous periodic weak solutions of the 2d Boussinesq equation with diffusive temperature which satisfy the prescribed kinetic energy. More precisely, for any smooth e(t):[0,1]→ R+ and ∈ (0, 110), there exist v∈ C110-([0,1]× T2), θ∈ Ct1,120-2Cx2,110-([0,1]× T2) which solve boussinesq equation in the sense of distribution and satisfy e(t)=∫ T2|v(t,x)|2dx, ∀ t∈ [0,1].
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