Extinction and non-extinction profiles for the sub-critical fast diffusion equation with weighted source

Abstract

We establish both extinction and non-extinction self-similar profiles for the following fast diffusion equation with a weighted source term ∂tu= um+|x|σup, posed for (x,t)∈N×(0,∞), N≥3, in the sub-critical range of the fast diffusion equation 0<m<mc=(N-2)/N. We consider σ>0 and \pc(σ),1\<p<pL(σ), where pc(σ)=m(N+σ)N-2, pL(σ)=1+σ(1-m)2. We show that, on the one hand, positive self-similar solutions at any time t>0, in the form u(x,t)=tαf(|x|tβ), f() C-(N-2)/m, α>0, \ β>0 exist, provided 0<m<ms=(N-2)/(N+2) and ps(σ)=m(N+2σ+2)/(N-2)<p<pL(σ). On the other hand, we prove that there exists p0(σ)∈(pc(σ),ps(σ)) such that self-similar solutions presenting finite time extinction are established both for p∈(p0(σ),ps(σ)) and for p∈(ps(σ),pL(σ)), but with profiles f() having different spatially decreasing tails as |x|∞. We also prove non-existence of self-similar solutions in complementary ranges of exponents to the ones described above or if m≥ mc.