EFT for Vortices with Dilaton-dependent Localized Flux

TL;DR

This paper investigates how vortices with flux localization influence the geometry and stability of extra dimensions in theories with dilaton and gauge fields, providing new tools for analyzing their back-reaction and interactions.

Contribution

It extends the effective theory of vortices to include flux-localization physics with dilaton dependence, and derives boundary conditions linking vortex properties to bulk field behavior.

Findings

Derived a simple relation between vortex tension, localized flux, and boundary conditions.

Showed how flux-localization affects the curvature of extra dimensions.

Provided methods to compute vortex interactions without detailed internal structure.

Abstract

We study how codimension-two objects like vortices back-react gravitationally with their environment in theories (such as 4D or higher-dimensional supergravity) where the bulk is described by a dilaton-Maxwell-Einstein system. We do so both in the full theory, for which the vortex is an explicit classical `fat brane' solution, and in the effective theory of `point branes' appropriate when the vortices are much smaller than the scales of interest for their back-reaction (such as the transverse Kaluza-Klein scale). We extend the standard Nambu-Goto description to include the physics of flux-localization wherein the ambient flux of the external Maxwell field becomes partially localized to the vortex, generalizing the results of a companion paper to include dilaton-dependence for the tension and localized flux. In the effective theory, such flux-localization is described by the next-to-leading effective interaction, and the boundary conditions to which it gives rise are known to play an important role in how (and whether) the vortex causes supersymmetry to break in the bulk. We track how both tension and localized flux determine the curvature of the space-filling dimensions. Our calculations provide the tools required for computing how scale-breaking vortex interactions can stabilize the extra-dimensional size by lifting the dilaton's flat direction. For small vortices we derive a simple relation between the near-vortex boundary conditions of bulk fields as a function of the tension and localized flux in the vortex action that provides the most efficient means for calculating how physical vortices mutually interact without requiring a complete construction of their internal structure. In passing we show why a common procedure for doing so using a $\delta$-function can lead to incorrect results. Our procedures generalize straightforwardly to general co-dimension objects.