Normalized solutions for a fourth-order Schr\"odinger equation with positive second-order dispersion coefficient

Abstract

We are concerned with the existence and asymptotic properties of solutions to the following fourth-order Schr\"odinger equation equation1 2u+μ u-λu=|u|p-2u, ~~~~x ∈ N\\ equation under the normalized constraint ∫RN u2=a2, where N\!≥\!2, a,μ\!>\!0, 2+8N\!<\!p\!<\! 4*\!=\!2N(N-4)+ and λ∈ appears as a Lagrange multiplier. Since the second-order dispersion term affects the structure of the corresponding energy functional Eμ(u)=12|| u||22-μ2||∇ u||22-1p||u||pp we could find at least two normalized solutions to (1) if 2\!+\!8N\!<\! p\!<\! 4* and μpγp-2ap-2\!<\!C for some explicit constant C\!=\!C(N,p)\!>\!0 and γp\!=\!N(p\!-\!2)4p. Furthermore, we give some asymptotic properties of the normalized solutions to (1) as μ0+ and a0+, respectively. In conclusion, we mainly extend the results in DBon,dbJB, which deal with (1), from μ≤0 to the case of μ>0, and also extend the results in TJLu,Nbal, which deal with (1), from L2-subcritical and L2-critical setting to L2-supercritical setting.