On the Smoothness of the Horizons of Multi-Black Hole Solutions
Abstract
In a recent paper it was suggested that some multi-black hole solutions in five or more dimensions have horizons that are not smooth. These black hole configurations are solutions to d-dimensional Einstein gravity (with no dilaton) and are extremally charged with a magnetic type (d-2)-form. In this work these solutions will be investigated further. It will be shown that although the curvature is bounded as the horizon of one of the black holes is approached, some derivatives of the curvature are not. This shows that the metric is not C∞ , but rather it is only Ck with k finite. These solutions are static so their lack of smoothness cannot be attributed to the presence of radiation.
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