Compactness results for Sign-Changing Solutions of critical nonlinear elliptic equations of low energy

Abstract

Let be a bounded, smooth connected open domain in Rn with n≥ 3. We investigate in this paper compactness properties for the set of sign-changing solutions v ∈ H10() of equation * - v+h v =|v|2*-2v in , v = 0 on ∂ equation where h∈ C1() and 2*:=2n/(n-2). Our main result establishes that the set of sign-changing solutions of (*) at the lowest sign-changing energy level is unconditionally compact in C2() when 3 n 5, and is compact in C2() when n 7 provided h never vanishes in . In dimensions n 7 our results apply when h >0 in and thus complement the compactness result of Devillanova-Solimini, Adv. Diff. Eqs. 7 (2002). Our proof is based on a new, global pointwise description of blowing-up sequences of solutions of (*) that holds up to the boundary. We also prove more general compactness results under perturbations of h.

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