Dynamics near the ground state for the Sobolev critical Fujita type heat equation in 6D

Abstract

This paper investigates the asymptotic behavior of solutions to ut= u+|u|p-1u in the Sobolev critical case. Our main result is a classification of the dynamics near the ground states in the six dimensional case. It is shown that if the initial data u0∈ H1(R6) satisfies \|u0- Q\| H1(R6)1, then the solution falls into one of the following three scenarios: 1) It is globally defined and converge to one of the ground states as t∞. 2) It is globally defined and converge to 0 in H1(R6) as t∞. 3) It exhibits finite time blowup with a type I rate. This paper extends the classification result in the case n≥7, previously obtained by Collot-Merle-Rapha\"el, to the borderline case n=6.

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