Equations involving fractional Laplacian operator: Compactness and application

Abstract

In this paper, we consider the following problem involving fractional Laplacian operator: equationeq:0.1 (-)α u= |u|2*α-2-u + λ u\,\, in\,\, , u=0 \,\, on\, \, ∂, equation where is a smooth bounded domain in RN, ∈ [0, 2*α-2), 0<α<1,\, 2*α = 2NN-2α. We show that for any sequence of solutions un of eq:0.1 corresponding to n∈ [0, 2*α-2), satisfying \|un\|H C in the Sobolev space H defined in eq:1.1a, un converges strongly in H provided that N>6α and λ>0. An application of this compactness result is that problem eq:0.1 possesses infinitely many solutions under the same assumptions.