Self-similar extinction for a fast diffusion equation with weighted absorption

Abstract

Finite time extinction of any bounded solution to the fast diffusion equation with spatially inhomogeneous absorption ∂tu= um-|x|σup, (x,t)∈RN×(0,∞), with N≥1 and exponents p>1, mc=(N-2)+N<m<1, σ>σ*:=2(p-1)1-m, is established. Moreover, the existence of self-similar solutions of the form U(x,t)=(T-t)αf(|x|(T-t)β), α=σ+2(1-m)(σ-σ*), \ β=p-m(1-m)(σ-σ*), with f(0)>0, f'(0)=0 and ∞(σ+2)/(p-m)f()=L∈(0,∞). is proved, together with some unbounded self-similar solutions as well. The property of finite time extinction is in striking contrast to the standard fast diffusion equation with absorption (that is, σ=0), where the strict positivity of solutions for any t∈(0,∞) is well-known.