Global existences and asymptotic behavior for semilinear heat equation

Abstract

In this paper, we consider the global Cauchy problem for the L2-critical semilinear heat equations ∂t h= h |h|4dh, with h(0,x)=h0, where h is an unknown real function defined on +×d. In most of the studies on this subject, the initial data h0 belongs to Lebesgue spaces Lp(d) for some p 2 or to subcritical Sobolev space Hs(d) with s>0. First, we prove that there exists some positive constant γ0 depending on d, such that the Cauchy problem is locally and globally well-posed for any initial data h0 which is radial, supported away from the origin and in the negative Sobolev space H-γ0(d). In particular, it leads to local and global existences of the solutions to Cauchy problem considered above for the initial data in a proper subspace of Lp(d) with some p<2. Secondly, the sharp asymptotic behavior of the solutions ( i.e. L2-decay estimates ) as t +∞ are obtained with arbitrary large initial data h0∈ H-γ0(d) in the defocusing case and in the focusing case with suitably small initial data h0.