An Onsager type theorem for the Euler-Boussinesq equations in two spatial dimensions
Abstract
In this article, we construct non-trivial weak solutions (v, θ) to the inviscid Euler-Boussinesq system in two spatial dimensions. These solutions exhibit compact temporal support, thereby violating the conservation of the temperature's Lp-norm. Furthermore, the pair (v, θ) resides in the H\"older space Cγ( R × T2) × Cγ ( R × T2) for any exponent γ<1/3. The methodology integrates a Nash iteration scheme with a linear decoupling technique to achieve these results.
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