Second order asymptotics and uniqueness for self-similar profiles to a singular diffusion equation with gradient absorption
Abstract
Solutions in self-similar form presenting finite time extinction to the singular diffusion equation with gradient absorption ∂t u - div(|∇ u|p-2∇ u) +|∇ u|q=0 in \ (0,∞)×RN are studied when N≥1 and the exponents (p,q) satisfy pc=2NN+1, p-1<q<p2. Existence and uniqueness of such a solution are established in dimension N=1. In dimension N≥2, existence of radially symmetric self-similar solutions is proved and a fine description of their behavior as |x|∞ is provided.
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