Norm inflation for the cubic nonlinear heat equation above the scaling critical regularity

Abstract

We consider the ill-posedness issue for the cubic nonlinear heat equation and prove norm inflation with infinite loss of regularity in the H\"older-Besov space Cs = Bs∞, ∞ for s - 23. In particular, our result includes the subcritical range -1< s - 23, which is above the scaling critical regularity s = -1 with respect to the H\"older-Besov scale. In view of the well-posedness result in Cs, s > - 23, our ill-posedness result is sharp.

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