A doubly critical semilinear heat equation in the L1 space

Abstract

We study the existence and nonexistence of a Cauchy problem of the semilinear heat equation ∂tu= u+|u|p-1u in RN×(0,T), u(x,0)=φ(x) in RN, in L1(RN). Here, N 1, p=1+2/N and φ∈ L1( RN) is a possibly sign-changing initial function. Since N(p-1)/2=1, the L1 space is scale critical and this problem is known as a doubly critical case. It is known that a solution does not necessarily exist for every φ∈ L1(RN). Let Xq:=\ φ∈ L1loc(RN)\ |\ ∫RN|φ| [ (e+|φ|)]qdx<∞ \ (⊂ L1(RN)). In this paper we construct a local-in-time mild solution in L1(RN) for φ∈ Xq if q N/2. We show that, for each 0 q<N/2, there is a nonnegative initial function φ0∈ Xq such that the problem has no nonnegative solution, using a necessary condition given by Baras-Pierre [Ann. Inst. H. Poincar\'e Anal. Non Lin\'eaire 2 (1985), 185--212]. Since Xq⊂ XN/2 (q N/2), XN/2 becomes a sharp integrability condition. We also prove a uniqueness in a certain set of functions which guarantees the uniqueness of the solution constructed by our method.