Self-gravitating stringlike configurations from nonlinear electodynamics
Abstract
We consider static, cylindrically symmetric configurations in general relativity coupled to nonlinear electrodynamics (NED) with an arbitrary gauge-invariant Lagrangian of the form , . We study electric and magnetic fields with three possible orientations: radial (R), longitudinal (L) and azimuthal (A), and try to find solitonic stringlike solutions, having a regular axis and a flat metric at large , with a possible angular defect. Assuming the function to be regular at small , it is shown that a regular axis is impossible in R-fields if there is a nonzero effective electric charge and in A-fields if there is a nonzero effective electric current along the axis. Solitonic solutions are only possible for purely magnetic R-fields and purely electric A-fields, in cases when tends to a finite limit at large . For both R- and A-fields, the desired large asymptotic is only possible with a non- Maxwell behaviour of at small . For L-fields, solutions with a regular axis are easily obtained (and can be found by quadratures) whereas a desired large asymptotic is only possible in an exceptional solution; the latter gives rise to solitonic configurations in case . We give an explicit example of such a solution.
Cite
@article{arxiv.gr-qc/0308002,
title = {Self-gravitating stringlike configurations from nonlinear electodynamics},
author = {K. A. Bronnikov and G. N. Shikin and E. N. Sibileva},
journal= {arXiv preprint arXiv:gr-qc/0308002},
year = {2009}
}
Comments
7 pages, Latex-2e,gc.sty, to appear in Grav. & Cosmol