) admitting a special conformal Killing vector field ξ and static vacuum or non-vacuum spacetimes. Any such (Σ,) generates a vacuum spacetime (M,g) but it also generates a spacetime (M, g, Φ), where (g, Φ) satisfies the Einstein-Klein-Gordon massless minimally coupled gravity equations, or the Einstein-Conformal scalar field equations. The resulting spacetimes either admit four Killing vector fields or possess boost and rotational symmetry. We argue that this connection goes beyond the vacuum or Einstein-scalar field system and it should be viewed as a mechanism of generating solutions for the Einstein equations, admitting a hypersurface orthogonal Killing vector field.]]>
) de dimension tres que admiten un campo vectorial de Killing conforme ξ y espacios- tiempo estáticos asociados a sistemas en el vacío o no-vacío. Cualquiera de estas variedades (Σ,) generan un espacio-tiempo (M, g) e igual generan un espacio-tiempo (M, g,Φ), donde (g, Φ) satisfacen las ecuaciones para el campo escalar asociadas a los sistemas de Einstein-Klein-Gordon con acoplamiento mínimo o conforme. Los espacios-tiempo asociados resultantes admiten cuatro campos vectoriales de Killing o una simetría de "boost" y rotacional. Se argumenta como esta conexión va mas allá de los sistemas en el vacío o de los sistemas de campos escalares y esto puede ser visto como un mecanismo para generar soluciones de las ecuaciones de Einstein, que admitan un campo vectorial de Killing ortogonal a una hipersuperficie.]]>
From conformal Killing vector fields to boost–rotational symmetry
J. Estevez–Delgado* and T. Zannias**
* Facultad de Ciencias Físico–Matemáticas, Universidad Michoacana de San Nicolás de Hidalgo, Morelia, Mich, MÉXICO, e–mail: joaquin@fismat.umich.mx
** Instituto de Física y Matemáticas, Universidad Michoacana de San Nicolás de Hidalgo, Apartado Postal 82, 58040 Morelia, Mich, MÉXICO, e–mail: zannias@ginette.ifm.umich.mx
Recibido el 18 de julio de 2005 Aceptado el 14 de marzo de 2005
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Abstract
We discuss a connection between three–dimensional Riemannian manifolds (Σ,) admitting a special conformal Killing vector field ξ and static vacuum or non–vacuum spacetimes. Any such (Σ,) generates a vacuum spacetime (M,g) but it also generates a spacetime (M, g, Φ), where (g, Φ) satisfies the Einstein–Klein–Gordon massless minimally coupled gravity equations, or the Einstein–Conformal scalar field equations. The resulting spacetimes either admit four Killing vector fields or possess boost and rotational symmetry. We argue that this connection goes beyond the vacuum or Einstein–scalar field system and it should be viewed as a mechanism of generating solutions for the Einstein equations, admitting a hypersurface orthogonal Killing vector field.
Keywords: General relativity; conformal Killing vector field; Einstein equations.
Resumen
Se discute la conexión entre variedades Riemannianas (Σ,) de dimension tres que admiten un campo vectorial de Killing conforme ξ y espacios– tiempo estáticos asociados a sistemas en el vacío o no–vacío. Cualquiera de estas variedades (Σ,) generan un espacio–tiempo (M, g) e igual generan un espacio–tiempo (M, g,Φ), donde (g, Φ) satisfacen las ecuaciones para el campo escalar asociadas a los sistemas de Einstein–Klein–Gordon con acoplamiento mínimo o conforme. Los espacios–tiempo asociados resultantes admiten cuatro campos vectoriales de Killing o una simetría de "boost" y rotacional. Se argumenta como esta conexión va mas allá de los sistemas en el vacío o de los sistemas de campos escalares y esto puede ser visto como un mecanismo para generar soluciones de las ecuaciones de Einstein, que admitan un campo vectorial de Killing ortogonal a una hipersuperficie.
Descriptores: Relatividad general; campo vectorial de Killing conforme; ecuaciones de Einstein.
The present work was sparked after Prof. Alberto Garcia pointed out to us the relevance of Ref. 13 to a generalized family of C–metrics constructed in Ref. 3. Our thanks to him and also to U.Nucamendi for discussions regarding the issues raised in this work. The research of TZ was partially supported by grant of Coordinación Científica – UMSNH while JED would like to acknowledge financial support through PROMEP via a grant: PTC–74.
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) generates a vacuum spacetime (M,g) but it also generates a spacetime (M, g, Φ), where (g, Φ) satisfies the Einstein-Klein-Gordon massless minimally coupled gravity equations, or the Einstein-Conformal scalar field equations. The resulting spacetimes either admit four Killing vector fields or possess boost and rotational symmetry. We argue that this connection goes beyond the vacuum or Einstein-scalar field system and it should be viewed as a mechanism of generating solutions for the Einstein equations, admitting a hypersurface orthogonal Killing vector field.]]>
) admitting a special conformal Killing vector field ξ and static vacuum or non–vacuum spacetimes. Any such (Σ,