Solutions with snaking singularities for the fast diffusion equation
Abstract
We construct solutions of the fast diffusion equation, which exist for all t∈R and are singular on the set (t):= \ (s) ; -∞ <s ≤ ct \, c>0, where ∈ C3(R;Rn), n≥ 2. We also give a precise description of the behavior of the solutions near (t).
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