Hidden symmetry of the three-dimensional Einstein-Maxwell equations

Abstract

It is shown how to generate three-dimensional Einstein-Maxwell fields from known ones in the presence of a hypersurface-orthogonal non-null Killing vector field. The continuous symmetry group is isomorphic to the Heisenberg group including the Harrison-type transformation. The symmetry of the Einstein-Maxwell-dilaton system is also studied and it is shown that there is the SL(2, R) transformation between the Maxwell and the dilaton fields. This SL(2, R) transformation is identified with the Geroch transformation of the four-dimensional vacuum Einstein equation in terms of the Kauza-Klein mechanism.

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