Non-uniqueness of mild solutions to supercritical heat equations

Abstract

We consider the focusing power nonlinearity heat equation equationEq:HeatabstractNLH ∂t u - u = |u|p-1u, p>1, equation in dimensions d ≥ 3. It is well-known that if p is large enough then Eq:Heatabstract is unconditionally locally well-posed in Lq(Rd) for q ≥ d(p-1)/2. We prove that this result is optimal in the sense that uniqueness of local solutions fails when q < d(p-1)/2 as long as p < pJL, where pJL stands for the Joseph-Lundgren exponent. Our proof is based on the method that Jia-Sver\'ak proposed in JiaSve15 to show non-uniqueness of Leray solutions to incompressible 3d Navier-Stokes equations. In particular, we rigorously verify for Eq:Heatabstract the (analogue of the) spectral assumption made in JiaSve15. To our knowledge, this is the first rigorous implementation of the Jia-Sver\'ak method to a nonlinear parabolic equation without forcing.