Asymptotics of the fast diffusion equation via entropy estimates

Abstract

We consider non-negative solutions of the fast diffusion equation ut= um with m ∈ (0,1), in the Euclidean space Rd, d?3, and study the asymptotic behavior of a natural class of solutions, in the limit corresponding to t∞ for m mc=(d-2)/d, or as t approaches the extinction time when m < mc. For a class of initial data we prove that the solution converges with a polynomial rate to a self-similar solution, for t large enough if m mc, or close enough to the extinction time if m < mc. Such results are new in the range m mc where previous approaches fail. In the range mc < m < 1 we improve on known results.