Entire sign-changing solutions to the fractional critical Schr\"odinger equation

Abstract

We consider the fractional critical Schr\"odinger equation (FCSE) align* u-u2s-2u=0, align* where u ∈ Hs( N), N≥ 2, 0<s<1 and 2s=2NN-2s. By virtue of the mini-max theory and the concentration compactness principle with the equivariant group action, we obtain the new type of non-radial, sign-changing solutions of (FCSE) in the energy space Hs(N). The key component is that we use the equivariant group to partion Hs(N) into several connected components, then combine the concentration compactness argument to show the compactness property of Palais-Smale sequences in each component and obtain many solutions of (FCSE) in Hs(N). Both the solutions and the argument here are different from those by Garrido, Musso in GM2016pjm and by Abreu, Barbosa and Ramirez in ABR2019arxiv.