Killing Reduction of 5-Dimensional Spacetimes

Abstract

In a 5-dimensional spacetime (M,gab) with a Killing vector field a which is either everywhere timelike or everywhere spacelike, the collection of all trajectories of a gives a 4-dimensional space S. The reduction of (M,gab) is studied in the geometric language, which is a generalization of Geroch's method for the reduction of 4-dimensional spacetime. A 4-dimensional gravity coupled to a vector field and a scalar field on S is obtained by the reduction of vacuum Einstein's equations on M, which gives also an alternative description of the 5-dimensional Kaluza-Klein theory. Besides the symmetry-reduced action from the Hilbert action on M, an alternative action of the fields on S is also obtained, the variations of which lead to the same fields equations as those reduced from the vacuum Einstein equation on M.

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