The radial metric function does not identify null surfaces
Abstract
We investigate the conditions under which a hypersurface becomes null through the use of coordinate transformations. We demonstrate that, in static spacetimes, the correct criterion for a surface to be null is , rather than , in agreement with the results of Vollick. We further show that, if a Kruskal-like coordinate exists, the proxy condition is equivalent to if and both and vanish at the same rate near the horizon. Our method extends naturally to axisymmetric stationary spacetimes, for which we demonstrate that the condition for the induced metric on a null hypersurface is recovered. By contrast with the induced metric approach, our method provides a physical perspective that connects the general null condition with its underlying relationship to photon geodesics.
Keywords
Cite
@article{arxiv.2504.13255,
title = {The radial metric function does not identify null surfaces},
author = {Yi-Hsiung Hsu and Will Barker and Michael Hobson and Anthony Lasenby},
journal= {arXiv preprint arXiv:2504.13255},
year = {2025}
}
Comments
7 pages, 1 figure. Improved plots. Conclusions unaffected