A scalar field coupled to a brane in ${\cal M}_4 \times {\cal S}_1$. Part I: Kaluza-Klein spectrum and zero-mode localization
arXiv:1512.03978
Abstract
A toy model where a massless, real, scalar field $Φ$ in a compact space-time ${\cal M}_4 \times {\cal S}_1$ is coupled to a brane (parametrized as a $δ$-function) through the unique relevant operator $δ(y) Φ^2 (x,y)$ is considered. The exact Kaluza-Klein spectrum of the model is computed for any value of the coupling between field and brane using the Burniston-Siewert method to solve analytically transcendental equations. The exact KK-spectrum of a model with a Brane-Localized Kinetic Term is also computed. Weak- and strong-coupling limits are derived, matching or extending mathematically equivalent existing results. For a negative coupling, the would-be zero-mode $Ï_{0^-}^e$ is found to localize into the brane, behaving as an effective four-dimensional field. The 4-dimensional KK-decomposition of the model once a renormalizable cubic self-interaction $Φ^3 (x,y)$ is added to the action is derived computing the overlaps between the KK-modes. It is found that the localized would-be zero-mode $Ï_{0^-}^e$ decouples from the massive KK-spectrum in the limit of large brane-to-bulk coupling.
Replaced version with significant changes: shorter introduction; computation of the exact spectrum with BLKT; KK-decomposition of the model when a self-interaction is added. 32 pages, 7 pdf figures