Finite time extinction for a diffusion equation with spatially inhomogeneous strong absorption

Abstract

The phenomenon of finite time extinction of bounded and non-negative solutions to the diffusion equation with strong absorption ∂t u- um+|x|σuq=0, (t,x)∈(0,∞)×RN, with m≥1, q∈(0,1) and σ>0, is addressed. Introducing the critical exponent σ* := 2(1-q)/(m-1) for m>1 and σ*=∞ for m=1, extinction in finite time is known to take place for σ∈ [0,σ*) and an alternative proof is provided therein. When m>1 and σ σ*, the occurrence of finite time extinction is proved for a specific class of initial conditions, thereby supplementing results on non-extinction that are available in that range of σ and showing their sharpness.