Norm inflation for the Boussinesq system
Abstract
We prove the norm inflation phenomena for the Boussinesq system on T3. For arbitrarily small initial data (u0,0) in the negative-order Besov spaces B-1∞, ∞ × B-1∞, ∞, the solution can become arbitrarily large in a short time. Such largeness can be detected in in Besov spaces of any negative order: B-s∞, ∞ for any s>0. Notice that our initial data space is scaling critical for u and is scaling subcritical for .
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