A Liouville theorem for supercritical Fujita equation and its applications

Abstract

We prove a Liouville theorem for ancient solutions to the supercritical Fujita equation \[∂tu- u=|u|p-1u, -∞ <t<0, p>n+2n-2,\] which says if u is close to the ODE solution u0(t):=(p-1)-1p-1(-t)-1p-1 at large scales, then it is an ODE solution (i.e. it depends only on t). This implies a stability property for ODE blow ups in this problem. As an application of these results, we show that for a suitable weak solution, its singular set at the end time can be decomposed into two parts: one part is relatively open and (n-1)-rectifiable, and it is characterized by the property that tangent functions at these points are the two constants (p-1)-1p-1; the other part is relatively closed and its Hausdorff dimension is not larger than n-[2p+1p-1]-1.