Global solutions versus finite time blow-up for the supercritical fast diffusion equation with inhomogeneous source

Abstract

Solutions in self-similar form, either global in time or presenting finite time blow-up, to the supercritical fast diffusion equation with spatially inhomogeneous source ∂tu= um+|x|σup, (x,t)∈RN×(0,∞) with mc=(N-2)+N≤ m<1, σ∈(\-2,-N\,∞), p>\1+σ(1-m)2,1\ are considered. It is proved that global self-similar solutions with the specific tail behavior u(x,t) C(m)|x|-2/(1-m), as \ |x|∞ exist exactly for p∈(pF(σ),ps(σ)), where pF(σ)=m+σ+2N, ps(σ)=\arrayllm(N+2σ+2)N-2, & N≥3,\\∞, & N∈\1,2\, array. are the renowned Fujita and Sobolev critical exponents. In contrast, it is shown that self-similar solutions presenting finite time blow-up exist for any σ∈(-2,0) and p as above, but do not exist for any σ≥0 and p∈(pF(σ),ps(σ)). We stress that all these results are new also in the homogeneous case σ=0.