Eternal solutions to a porous medium equation with strong nonhomogeneous absorption. Part I: Radially non-increasing profiles

Abstract

Existence of specific eternal solutions in exponential self-similar form to the following quasilinear diffusion equation with strong absorption∂t u= um-|x|σuq,posed for (t,x)∈(0,∞)×RN, with m>1, q∈(0,1) and σ=σc:=2(1-q)/(m-1) is proved. Looking for radially symmetric solutions of the formu(t,x)=e-α tf(|x|eβ t), α=2m-1β,we show that there exists a unique exponent β*∈(0,∞) for which there exists a one-parameter family (uA)A>0 of solutions with compactly supported and non-increasing profiles (fA)A>0 satisfying fA(0)=A and fA'(0)=0. An important feature of these solutions is that they are bounded and do not vanish in finite time, a phenomenon which is known to take place for all non-negative bounded solutions when σ∈ (0,σc).

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