Norm inflation for a non-linear heat equation with Gaussian initial conditions
Abstract
We consider a non-linear heat equation ∂t u = u + B(u,Du)+P(u) posed on the d-dimensional torus, where P is a polynomial of degree at most 3 and B is a bilinear map that is not a total derivative. We show that, if the initial condition u0 is taken from a sequence of smooth Gaussian fields with a specified covariance, then u exhibits norm inflation with high probability. A consequence of this result is that there exists no Banach space of distributions which carries the Gaussian free field on the 3D torus and to which the DeTurck-Yang-Mills heat flow extends continuously, which complements recent well-posedness results in arXiv:2111.10652 and arXiv:2201.03487. Another consequence is that the (deterministic) non-linear heat equation exhibits norm inflation, and is thus locally ill-posed, at every point in the Besov space B-1/2∞,∞; the space B-1/2∞,∞ is an endpoint since the equation is locally well-posed for Bη∞,∞ for every η>-12.
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