Uniqueness and time oscillating behaviour of finite points blow-up solutions of the fast diffusion equation
Abstract
Let n 3 and 0<m<n-2n. We will extend the results of J.L. Vazquez and M. Winkler and prove the uniqueness of finite points blow-up solutions of the fast diffusion equation ut= um in both bounded domains and Rn× (0,∞). We will also construct initial data such that the corresponding solution of the fast diffusion equation in bounded domain oscillate between infinity and some positive constant as t∞.
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