String Instabilities in Black Hole Spacetimes
Abstract
We study the emergence of string instabilities in - dimensional black hole spacetimes (Schwarzschild and Reissner - Nordstr\o m), and De Sitter space (in static coordinates to allow a better comparison with the black hole case). We solve the first order string fluctuations around the center of mass motion at spatial infinity, near the horizon and at the spacetime singularity. We find that the time components are always well behaved in the three regions and in the three backgrounds. The radial components are {\it unstable}: imaginary frequencies develop in the oscillatory modes near the horizon, and the evolution is like , , near the spacetime singularity, , where the world - sheet time , and the proper string length grows infinitely. In the Schwarzschild black hole, the angular components are always well - behaved, while in the Reissner - Nordstr\o m case they develop instabilities inside the horizon, near where the repulsive effects of the charge dominate over those of the mass. In general, whenever large enough repulsive effects in the gravitational background are present, string instabilities develop. In De Sitter space, all the spatial components exhibit instability. The infalling of the string to the black hole singularity is like the motion of a particle in a potential where depends on the spacetime dimensions and string angular momentum, with for Schwarzschild and for Reissner - Nordstr\o m black holes. For the string ends trapped by the black hole singularity.
Cite
@article{arxiv.gr-qc/9212016,
title = {String Instabilities in Black Hole Spacetimes},
author = {C. O. Lousto and N. Sánchez},
journal= {arXiv preprint arXiv:gr-qc/9212016},
year = {2009}
}
Comments
26pages, Plain Tex