Eternal solutions to a singular diffusion equation with critical gradient absorption

Abstract

The existence of nonnegative radially symmetric eternal solutions of exponential self-similar type u(t,x)=e-pβ t/(2-p) fβ(|x|e-β t;β) is investigated for the singular diffusion equation with critical gradient absorption ∂t u-p u+|∇ u|p/2=0 \;\;in\;\; (0,∞)×N where 2N/(N+1) < p < 2. Such solutions are shown to exist only if the parameter β ranges in a bounded interval (0,β*] which is in sharp contrast with well-known singular diffusion equations such as ∂tφ-p φ=0 when p=2N/(N+1) or the porous medium equation ∂tφ-φm=0 when m=(N-2)/N. Moreover, the profile f(r;β) decays to zero as r∞ in a faster way for β=β* than for β∈ (0,β*) but the algebraic leading order is the same in both cases. In fact, for large r, f(r;β*) decays as r-p/(2-p) while f(r;β) behaves as ( r)2/(2-p) r-p/(2-p) when β∈ (0,β*).