On the radial linear stability of nonrelativistic -boson stars

Abstract

We study the linear stability of nonrelativistic -boson stars, describing static, spherically symmetric configurations of the Schr\"odinger-Poisson system with multiple wave functions having the same value of the angular momentum . In this work we restrict our analysis to time-dependent perturbations of the radial profiles of the 2+1 wave functions, keeping their angular dependency fixed. Based on a combination of analytic and numerical methods, we find that for each , the ground state is linearly stable, whereas the n'th excited states possess 2n unstable (exponentially in time growing) modes. Our results also indicate that all excited states correspond to saddle points of the conserved energy functional of the theory.