The energy identity of Sacks-Uhlenbeck operator and infinitely many solutions for Brezis-Nirenberg problem

Abstract

Let be a bounded smooth domain in RN with N≥ 3, 1<α, 2=2NN-2 and \uα\⊂ H01,2α() be a critical point of the functional equation* Iα,λ(u)=12α∫ [(1+|∇ u|2)α-1 ]dx-λ2∫u2dx-12∫|u|2dx. equation* In this paper, we obtain the limit behaviour of uα ( α→ 1), energy identity, Pohozaev identity, some integral estimates, etc. And using these results, we prove infinitely many solutions for the following Brezis-Nirenberg problem for N≥ 7: equation* \ aligned &- u=|u|2-2u+λ u\ \ \ in\ ,\\ &u=0,\ \ on\ ∂. aligned . equation*