Refined regularity of the blow-up set linked to refined asymptotic behavior for the semilinear heat equation

Abstract

We consider u(x,t), a solution of ∂tu = u + |u|p-1u which blows up at some time T > 0, where u:RN ×[0,T) R, p > 1 and (N-2)p < N+2. Define S ⊂ RN to be the blow-up set of u, that is the set of all blow-up points. Under suitable nondegeneracy conditions, we show that if S contains a (N-)-dimensional continuum for some ∈ \1,…, N-1\, then S is in fact a C2 manifold. The crucial step is to derive a refined asymptotic behavior of u near blow-up. In order to obtain such a refined behavior, we have to abandon the explicit profile function as a first order approximation and take a non-explicit function as a first order description of the singular behavior. This way we escape logarithmic scales of the variable (T-t) and reach significant small terms in the polynomial order (T-t)μ for some μ > 0. The refined asymptotic behavior yields geometric constraints of the blow-up set, leading to more regularity on S.