Non-Linear Electrodynamics in Curved Backgrounds
摘要
We study non-linear electrodynamics in curved space from the viewpoint of dualities. After establishing the existence of a topological bound for self-dual configurations of Born-Infeld field in curved space, we check that the energy-momentum tensor vanishes. These properties are shown to hold for general duality-invariant non-linear electrodynamics. We give the dimensional reduction of Born-Infeld action to three dimensions in a general curved background admitting a Killing vector. The SO(2) duality symmetry becomes manifest but other symmetries present in flat space are broken, as is U-duality when one couples to gravity. We generalize our arguments on duality to the case of n U(1) gauge fields, and present a new Lagrangian possessing SO(n) X SO(2)_elemag duality symmetry. Other properties of this model such as Legendre duality and enhancement of the symmetry by adding dilaton and axion, are studied. We extend our arguments to include a background b-field in the curved space, and give new examples including almost Kaehler manifolds and Schwarzshild black holes with a -field.
引用
@article{arxiv.hep-th/0007019,
title = {Non-Linear Electrodynamics in Curved Backgrounds},
author = {Gary W. Gibbons and Koji Hashimoto},
journal= {arXiv preprint arXiv:hep-th/0007019},
year = {2009}
}
备注
35 pages, LaTeX, Comments and references added, a part of Sec. 5.1 deleted, published version