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On General Plane Fronted Waves. Geodesics

Authors:	A M Candela J L Flores M Sánchez

Institution:	(1) Dipartimento Interuniversitario di Matematica, Università degli Studi di Bari, Via E. Orabona 4, 70125 Bari, Italy;(2) Departamento de Geometría y Topología, Facultad de Ciencias, Universidad de Granada, Avenida Fuentenueva s/n, 18071 Granada, Spain

Abstract:	A general class of Lorentzian metrics, $\mathcal{M}_0 \times \mathbb{R}^2$ , $\langle \cdot , \cdot \rangle _z = \langle \cdot , \cdot \rangle _x + 2dudv + H(x,u)du^2$ , with $(\mathcal{M}_0 ,\langle \cdot , \cdot \rangle _x )$ 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) with x at infinity determines many properties of geodesics. Essentially, a subquadratic growth of H ensures geodesic completeness and connectedness, while the critical situation appears when H(x,u) behaves in some direction as $\|{\kern 1pt} x{\kern 1pt} \|^2$ , as in the classical model of exact gravitational waves.

Keywords:	Gravitational waves plane fronted waves geodesic connectedness completeness causal geodesics variational methods Ljusternik– Schnirelman theory
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