Block-radial symmetry breaking for ground states of biharmonic NLS

Abstract

We prove that the biharmonic NLS equation 2 u +2 u+(1+)u=|u|p-2u in Rd has at least k+1 different solutions if >0 is small enough and 2<p<2k, where 2k is an explicit critical exponent arising from the Fourier restriction theory of O(d-k)× O(k)-symmetric functions. This extends the recent symmetry breaking result of Lenzmann-Weth and relies on a chain of strict inequalities for the corresponding Rayleigh quotients associated with distinct values of k. We further prove that, as 0+, the Fourier transform of each ground state concentrates near the unit sphere and becomes rough in the scale of Sobolev spaces.