Trapping of Spin-0 fields on tube-like topological defects

Abstract

We have considered the localization of resonant bosonic states described by a scalar field trapped in tube-like topological defects. The tubes are formed by radial symmetric defects in (2,1) dimensions, constructed with two scalar fields φ and , and embedded in the (3,1)-dimensional Minkowski spacetime. The general coupling between the topological defect and the scalar field is given by the potential η F(φ,)2. After a convenient decomposition of the field , we find that the amplitudes of the radial modes satisfy Schr\"odinger-like equations whose eigenvalues are the masses of the bosonic resonances. Specifically, we have analyzed two simple couplings: the first one is F(φ,)=2 for a fourth-order potential and, the second one is a sixth-order interaction characterized by F(φ,)=(φ)2% . In both cases the Schr\"odinger-like equations are numerically solved with appropriated boundary conditions. Several resonance peaks for both models are obtained and the numerical analysis showed that the fourth-order potential generates more resonances than the sixth-order one.