On ground states for the L2-critical boson star equation

Abstract

We consider ground state solutions u ≥ 0 for the L2-critical boson star equation - \, u - (|x|-1 |u|2 ) u = -u in 3. We prove analyticity and radial symmetry of u. In a previous version of this paper, we also stated uniqueness and nondegeneracy of ground states for the L2-critical boson star equation in 3, but the arguments given there contained a gap. However, we refer to our recent preprint FraLe in arXiv:1009.4042, where we prove a general uniqueness and nondegeneracy result for ground states of nonlinear equations with fractional Laplacians in d=1 space dimension.