English

On General Plane Fronted Waves. Geodesics

General Relativity and Quantum Cosmology 2015-06-25 v2 Differential Geometry

Abstract

A general class of Lorentzian metrics, M0xR2M_0 x R^2, ds2=<.,.>+2dudv+H(x,u)du2ds^2 = <.,.> + 2 du dv + H(x,u) du^2, with (M0,<.,.>(M_0, <.,.> any Riemannian manifold, is introduced in order to generalize classical exact plane fronted waves. Here, we start a systematic study of their main geodesic properties: geodesic completeness, geodesic connectedness and multiplicity, causal character of connecting geodesics. These results are independent of the possibility of a full integration of geodesic equations. Variational and geometrical techniques are applied systematically. In particular, we prove that the asymptotic behavior of H(x,u)H(x,u) with xx at infinity determines many properties of geodesics. Essentially, a subquadratic growth of HH ensures geodesic completeness and connectedness, while the critical situation appears when H(x,u)H(x,u) behaves in some direction as x2|x|^2, as in the classical model of exact gravitational waves

Keywords

Cite

@article{arxiv.gr-qc/0211017,
  title  = {On General Plane Fronted Waves. Geodesics},
  author = {A. M. Candela and J. L. Flores and Miguel Sanchez},
  journal= {arXiv preprint arXiv:gr-qc/0211017},
  year   = {2015}
}

Comments

Final version with minor errata corrected. 19 pages, Latex. To appear in Gen. Relat. Gravit. (2003)