Classical defects in higher-dimensional Einstein gravity coupled to nonlinear $\sigma$-models
Abstract
We construct solutions of higher-dimensional Einstein gravity coupled to nonlinear -model with cosmological constant. The -model can be perceived as exterior configuration of a spontaneously-broken global higher-codimensional "monopole". Here we allow the kinetic term of the -model to be noncanonical; in particular we specifically study a quadratic-power-law type. This is some possible higher-dimensional generalization of the Bariola-Vilenkin (BV) solutions with -global monopole studied recently. The solutions can be perceived as the exterior solution of a black hole swallowing up noncanonical global defects. Even in the absence of comological constant its surrounding spacetime is asymptotically non-flat; it suffers from deficit solid angle. We discuss the corresponding horizons. For in there can exist three extremal conditions (the cold, ultracold, and Nariai black holes), while in higher-than-four dimensions the extremal black hole is only Nariai. For we only have black hole solutions with one horizon, save for the case where there can exist two horizons. We give constraints on the mass and the symmetry-breaking scale for the existence of all the extremal cases. In addition, we also obtain factorized solutions, whose topology is the direct product of two-dimensional spaces of constant curvature (, , or ) with (D-2)-sphere. We study all possible factorized channels.
Keywords
Cite
@article{arxiv.1707.06415,
title = {Classical defects in higher-dimensional Einstein gravity coupled to nonlinear $\sigma$-models},
author = {Ilham Prasetyo and Handhika S. Ramadhan},
journal= {arXiv preprint arXiv:1707.06415},
year = {2017}
}
Comments
accepted for publication in the General Relativity and Gravitation